Auto Partner S.A. — Regulatory Filings 2021

Mar 31, 2021

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    • p (class="pt-Normalny", dir="ltr")
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    • p (class="pt-Nagwekspisutreci", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000004"): Spis treści
    • p (class="pt-Spistreci1", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549852")
      • span (class="pt-Hipercze"): Skonsolidowany rachunek zysków i strat oraz sprawozdanie z pozostałych całkowitych dochodów
    • p (class="pt-Spistreci1", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549853")
      • span (class="pt-Hipercze"): Skonsolidowane sprawozdanie z sytuacji finansowej
    • p (class="pt-Spistreci1", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549854")
      • span (class="pt-Hipercze"): Skonsolidowane sprawozdanie z przepływów pieniężnych
    • p (class="pt-Spistreci1", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549855")
      • span (class="pt-Hipercze"): Skonsolidowane sprawozdanie ze zmian w kapitale własnym
    • p (class="pt-Spistreci1", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549856")
      • span (class="pt-Hipercze"): Informacje objaśniające do skonsolidowanego sprawozdania finansowego
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549857")
      • span (class="pt-Hipercze"): 1. Informacje ogólne
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    • a (class="pt-000005", href="#_Toc67549858")
      • span (class="pt-Hipercze"): 2. Zmiany polityki rachunkowości i prezentacji
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    • a (class="pt-000005", href="#_Toc67549859")
      • span (class="pt-Hipercze"): 3. Stosowane zasady rachunkowości
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    • a (class="pt-000005", href="#_Toc67549860")
      • span (class="pt-Hipercze"): 4. Istotne wartości oparte na profesjonalnym osądzie i szacunkach Zarządu
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    • a (class="pt-000005", href="#_Toc67549861")
      • span (class="pt-Hipercze"): 5. Przychody ze sprzedaży
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    • a (class="pt-000005", href="#_Toc67549862")
      • span (class="pt-Hipercze"): 6. Koszty według rodzaju
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    • a (class="pt-000005", href="#_Toc67549863")
      • span (class="pt-Hipercze"): 7. Pozostałe zyski/straty netto
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    • a (class="pt-000005", href="#_Toc67549864")
      • span (class="pt-Hipercze"): 8. Przychody finansowe
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549865")
      • span (class="pt-Hipercze"): 9. Koszty finansowe
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    • a (class="pt-000005", href="#_Toc67549866")
      • span (class="pt-Hipercze"): 10. Podatek dochodowy
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549867")
      • span (class="pt-Hipercze"): 11. Zysk netto przypadający na jedną akcję
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549868")
      • span (class="pt-Hipercze"): 12. Rzeczowe aktywa trwałe
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549869")
      • span (class="pt-Hipercze"): 13. Wartości niematerialne
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549870")
      • span (class="pt-Hipercze"): 14. Inwestycje w jednostkach powiązanych oraz pozostałych
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549871")
      • span (class="pt-Hipercze"): 15. Pozostałe aktywa finansowe
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549872")
      • span (class="pt-Hipercze"): 16. Zapasy oraz aktywa z tytułu udzielonego prawa do zwrotu towaru
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549873")
      • span (class="pt-Hipercze"): 17. Należności handlowe oraz pozostałe należności
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549874")
      • span (class="pt-Hipercze"): 18. Kapitał akcyjny
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549875")
      • span (class="pt-Hipercze"): 19. Kapitał własny, zyski zatrzymane i podział zysku
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549876")
      • span (class="pt-Hipercze"): 20. Kredyty i pożyczki otrzymane
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549877")
      • span (class="pt-Hipercze"): 21. Rezerwy
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549878")
      • span (class="pt-Hipercze"): 22. Zobowiązania handlowe i inne zobowiązania
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549879")
      • span (class="pt-Hipercze"): 23. Zobowiązania finansowe z tytułu zawartych umów leasingu
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549880")
      • span (class="pt-Hipercze"): 24. Zobowiązania z tytułu faktoringu
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549881")
      • span (class="pt-Hipercze"): 25. Struktura środków pieniężnych do sprawozdania z przepływów pieniężnych
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549882")
      • span (class="pt-Hipercze"): 26. Zobowiązania i rezerwy z tytułu świadczeń pracowniczych oraz programy świadczeń dla pracowników
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549883")
      • span (class="pt-Hipercze"): 27. Instrumenty finansowe
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549884")
      • span (class="pt-Hipercze"): 28. Zarządzanie ryzykiem finansowym
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549885")
      • span (class="pt-Hipercze"): 29. Transakcje z jednostkami powiązanymi
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    • a (class="pt-000005", href="#_Toc67549886")
      • span (class="pt-Hipercze"): 30. Zobowiązania warunkowe, przyszłe zobowiązania umowne, udzielone i otrzymane poręczenia oraz aktywa warunkowe
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549887")
      • span (class="pt-Hipercze"): 31. Wynagrodzenie Biegłego Rewidenta
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    • a (class="pt-000005", href="#_Toc67549888")
      • span (class="pt-Hipercze"): 32. Stan zatrudnienia w Grupie
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549889")
      • span (class="pt-Hipercze"): 33. Zdarzenia po dniu bilansowym
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549890")
      • span (class="pt-Hipercze"): 34. Wpływ pandemii COVID-19 na działalność Grupy
    • p (class="pt-Spistreci2", dir="ltr")
    • a (class="pt-000005", href="#_Toc67549891")
      • span (class="pt-Hipercze"): 35. Zatwierdzenie rocznego skonsolidowanego sprawozdania finansowego przez Zarząd
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000002", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549852")
    • h1 (dir="ltr")
    • span: Skonsolidowany rachunek zysków i strat oraz sprawozdanie z pozostałych całkowitych dochodów
    • div
    • table (class="pt-000008", dir="ltr")
      • tbody
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        • td (class="pt-000010")
        • p (class="pt-Normalny-000011", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000012")
        • td (class="pt-000013")
        • p (class="pt-Normalny-000011", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000012")
        • td (class="pt-000014", colspan="2")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): okres zakończony
      • tr (class="pt-000017")
        • td (class="pt-000018")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
        • td (class="pt-000021")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Nota
        • td (class="pt-000022")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): 31/12/2020
        • td (class="pt-000022")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): 31/12/2019
      • tr (class="pt-000023")
        • td (class="pt-000024")
        • p (class="pt-Normalny-000019", dir="ltr")
        • td (class="pt-000026")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000027", dir="ltr")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Przychody ze sprzedaży
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 5
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Revenue", scale="3", unitRef="PLN"): 1 670 441
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Revenue", scale="3", unitRef="PLN"): 1 479 373
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Koszt własny sprzedaży
        • td (class="pt-000026")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 6
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CostOfSales", scale="3", unitRef="PLN"): 1 193 562
            )
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CostOfSales", scale="3", unitRef="PLN"): 1 092 473
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Zysk (strata) brutto na sprzedaży
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:GrossProfit", scale="3", unitRef="PLN"): 476 879
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:GrossProfit", scale="3", unitRef="PLN"): 386 900
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Koszty sprzedaży i marketingu
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 6
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:SellingExpense", scale="3", unitRef="PLN"): 185 339
            )
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:SellingExpense", scale="3", unitRef="PLN"): 172 587
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Koszty magazynowania (logistyki)
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 6
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DistributionCosts", scale="3", unitRef="PLN"): 110 223
            )
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DistributionCosts", scale="3", unitRef="PLN"): 101 429
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Koszty zarządu
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 6
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:GeneralAndAdministrativeExpense", scale="3", unitRef="PLN"): 29 313
            )
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:GeneralAndAdministrativeExpense", scale="3", unitRef="PLN"): 25 060
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Pozostałe zyski/straty netto
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 7
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherGainsLosses", scale="3", sign="-", unitRef="PLN"): 1 624
            )
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherGainsLosses", scale="3", sign="-", unitRef="PLN"): 3 636
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Pozostałe przychody operacyjne
        • td (class="pt-000042")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherIncome", scale="3", unitRef="PLN"): 624
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherIncome", scale="3", unitRef="PLN"): 337
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Pozostałe koszty operacyjne
        • td (class="pt-000026")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherExpenseByFunction", scale="3", unitRef="PLN"): 722
            )
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherExpenseByFunction", scale="3", unitRef="PLN"): 750
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Zysk (strata) na działalności operacyjnej
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossFromOperatingActivities", scale="3", unitRef="PLN"): 150 282
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossFromOperatingActivities", scale="3", unitRef="PLN"): 83 775
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Przychody finansowe
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 8
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:FinanceIncome", scale="3", unitRef="PLN"): 153
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:FinanceIncome", scale="3", unitRef="PLN"): 256
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Koszty finansowe
        • td (class="pt-000026")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 9
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:FinanceCosts", scale="3", unitRef="PLN"): 12 092
            )
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:FinanceCosts", scale="3", unitRef="PLN"): 9 795
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Zysk (strata) przed opodatkowaniem
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): 138 343
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): 74 236
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Podatek dochodowy
        • td (class="pt-000026")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 10.1
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IncomeTaxExpenseContinuingOperations", scale="3", unitRef="PLN"): 27 361
            )
        • td (class="pt-000029")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IncomeTaxExpenseContinuingOperations", scale="3", unitRef="PLN"): 15 522
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Zysk (strata) netto
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossFromContinuingOperations", scale="3", unitRef="PLN"): 110 982
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossFromContinuingOperations", scale="3", unitRef="PLN"): 58 714
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
        • td (class="pt-000026")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Różnice kursowe z przeliczenia jednostek zagranicznych
        • td (class="pt-000026")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncomeNetOfTaxExchangeDifferencesOnTranslation", scale="3", sign="-", unitRef="PLN"): 252
            )
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncomeNetOfTaxExchangeDifferencesOnTranslation", scale="3", sign="-", unitRef="PLN"): 18
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Pozostałe całkowite dochody podlegające przeklasyfikowaniu w wynik finansowy
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncomeThatWillBeReclassifiedToProfitOrLossNetOfTax", scale="3", sign="-", unitRef="PLN"): 252
            )
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncomeThatWillBeReclassifiedToProfitOrLossNetOfTax", scale="3", sign="-", unitRef="PLN"): 18
            )
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Pozostałe całkowite dochody netto
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 252
            )
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 18
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): SUMA CAŁKOWITYCH DOCHODÓW
        • td (class="pt-000045")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 110 730
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 58 696
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Zysk (strata) netto przypadający:
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Akcjonariuszom jednostki dominującej
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossAttributableToOwnersOfParent", scale="3", unitRef="PLN"): 110 982
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossAttributableToOwnersOfParent", scale="3", unitRef="PLN"): 58 714
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Udziałom niedającym kontroli
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossAttributableToNoncontrollingInterests", scale="3", unitRef="PLN"): 0
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossAttributableToNoncontrollingInterests", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Suma całkowitych dochodów przypadająca:
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Akcjonariuszom jednostki dominującej
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncomeAttributableToOwnersOfParent", scale="3", unitRef="PLN"): 110 730
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncomeAttributableToOwnersOfParent", scale="3", unitRef="PLN"): 58 696
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Udziałom niedającym kontroli
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncomeAttributableToNoncontrollingInterests", scale="3", unitRef="PLN"): 0
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncomeAttributableToNoncontrollingInterests", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000047")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Zysk (strata) na akcję
          • span (class="pt-Domylnaczcionkaakapitu-000033"): (w zł na jedną akcję)
        • td (class="pt-000048")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000049")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000049")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
      • tr (class="pt-000023")
        • td (class="pt-000024")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Z działalności kontynuowanej:
        • td (class="pt-000026")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000027", dir="ltr")
      • tr (class="pt-000023")
        • td (class="pt-000050")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Zwykły
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 11
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="2", format="ixt:num-comma-decimal", name="ifrs-full:BasicEarningsLossPerShareFromContinuingOperations", scale="0", unitRef="PLNPerShare"): 0,85
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
          • nonFraction (contextRef="C78", decimals="2", format="ixt:num-comma-decimal", name="ifrs-full:BasicEarningsLossPerShareFromContinuingOperations", scale="0", unitRef="PLNPerShare"): 0,45
      • tr (class="pt-000023")
        • td (class="pt-000052")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Rozwodniony
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 11
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="2", format="ixt:num-comma-decimal", name="ifrs-full:DilutedEarningsLossPerShareFromContinuingOperations", scale="0", unitRef="PLNPerShare"): 0,85
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="2", format="ixt:num-comma-decimal", name="ifrs-full:DilutedEarningsLossPerShareFromContinuingOperations", scale="0", unitRef="PLNPerShare"): 0,45
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549853")
    • h1 (dir="ltr")
    • span: Skonsolidowane sprawozdanie z sytuacji finansowej
    • div
    • table (class="pt-000008", dir="ltr")
      • tbody
      • tr (class="pt-000054")
        • td (class="pt-000055")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000056")
        • td (class="pt-000057")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Nota
        • td (class="pt-000058")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Na dzień 31/12/2020
        • td (class="pt-000058")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Na dzień 31/12/2019
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): AKTYWA
        • td (class="pt-000060")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Aktywa trwałe
        • td (class="pt-000060")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wartości niematerialne
        • td (class="pt-000062")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 13
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IntangibleAssetsOtherThanGoodwill", scale="3", unitRef="PLN"): 12 726
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IntangibleAssetsOtherThanGoodwill", scale="3", unitRef="PLN"): 7 897
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Rzeczowe aktywa trwałe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 12
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:PropertyPlantAndEquipment", scale="3", unitRef="PLN"): 132 257
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:PropertyPlantAndEquipment", scale="3", unitRef="PLN"): 125 953
      • tr (class="pt-000023")
        • td (class="pt-000052")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Inwestycje w jednostkach pozostałych
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 14
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentFinancialAssetsAtFairValueThroughProfitOrLoss", scale="3", unitRef="PLN"): 110
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentFinancialAssetsAtFairValueThroughProfitOrLoss", scale="3", unitRef="PLN"): 110
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Pozostałe należności długoterminowe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 17
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherNoncurrentReceivables", scale="3", unitRef="PLN"): 2 043
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherNoncurrentReceivables", scale="3", unitRef="PLN"): 1 896
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Pozostałe długoterminowe aktywa finansowe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 15
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentFinancialAssetsAtAmortisedCost", scale="3", unitRef="PLN"): 30
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentFinancialAssetsAtAmortisedCost", scale="3", unitRef="PLN"): 37
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Aktywa z tytułu podatku odroczonego
        • td (class="pt-000026")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DeferredTaxAssets", scale="3", unitRef="PLN"): 0
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DeferredTaxAssets", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Aktywa trwałe razem
        • td (class="pt-000062")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentAssets", scale="3", unitRef="PLN"): 147 166
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentAssets", scale="3", unitRef="PLN"): 135 893
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Aktywa obrotowe
        • td (class="pt-000060")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000050")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zapasy
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 16.1
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Inventories", scale="3", unitRef="PLN"): 481 441
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Inventories", scale="3", unitRef="PLN"): 460 584
      • tr (class="pt-000023")
        • td (class="pt-000052")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Aktywa z tytułu prawa do zwrotu towarów
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 16.2
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentAssetsForRightsToRecoverGoodsFromCustomers", scale="3", unitRef="PLN"): 10 211
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentAssetsForRightsToRecoverGoodsFromCustomers", scale="3", unitRef="PLN"): 7 528
      • tr (class="pt-000023")
        • td (class="pt-000052")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Należności handlowe oraz pozostałe należności
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 17
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:TradeAndOtherCurrentReceivables", scale="3", unitRef="PLN"): 129 751
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:TradeAndOtherCurrentReceivables", scale="3", unitRef="PLN"): 118 477
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Pozostałe aktywa finansowe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 15
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentFinancialAssetsAtAmortisedCost", scale="3", unitRef="PLN"): 7
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentFinancialAssetsAtAmortisedCost", scale="3", unitRef="PLN"): 30
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Bieżące aktywa podatkowe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 10.2
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentTaxAssetsCurrent", scale="3", unitRef="PLN"): 0
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentTaxAssetsCurrent", scale="3", unitRef="PLN"): 150
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Środki pieniężne i ich ekwiwalenty
        • td (class="pt-000026")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 25
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashAndCashEquivalents", scale="3", unitRef="PLN"): 21 377
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashAndCashEquivalents", scale="3", unitRef="PLN"): 25 947
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Aktywa obrotowe razem
        • td (class="pt-000062")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentAssets", scale="3", unitRef="PLN"): 642 787
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentAssets", scale="3", unitRef="PLN"): 612 716
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Aktywa razem
        • td (class="pt-000042")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Assets", scale="3", unitRef="PLN"): 789 953
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Assets", scale="3", unitRef="PLN"): 748 609
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000064")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000009")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): KAPITAŁ WŁASNY I ZOBOWIĄZANIA
        • td (class="pt-000064")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Kapitał własny
        • td (class="pt-000060")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wyemitowany kapitał akcyjny
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 18
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssuedCapital", scale="3", unitRef="PLN"): 13 062
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssuedCapital", scale="3", unitRef="PLN"): 13 062
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Kapitał zapasowy ze sprzedaży akcji powyżej wartości nominalnej
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 19
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:SharePremium", scale="3", unitRef="PLN"): 106 299
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:SharePremium", scale="3", unitRef="PLN"): 106 299
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Pozostały kapitał rezerwowy
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 19
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherReserves", scale="3", unitRef="PLN"): 1 811
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherReserves", scale="3", unitRef="PLN"): 2 063
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zyski zatrzymane
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 19
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:RetainedEarnings", scale="3", unitRef="PLN"): 361 755
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:RetainedEarnings", scale="3", unitRef="PLN"): 250 773
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Kapitał własny przypadający akcjonariuszom jednostki dominującej
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:EquityAttributableToOwnersOfParent", scale="3", unitRef="PLN"): 482 927
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:EquityAttributableToOwnersOfParent", scale="3", unitRef="PLN"): 372 197
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Kapitał własny przypadający udziałom niekontrolującym
        • td (class="pt-000026")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncontrollingInterests", scale="3", unitRef="PLN"): 0
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncontrollingInterests", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Kapitał własny razem
        • td (class="pt-000062")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 482 927
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 372 197
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Zobowiązania długoterminowe
        • td (class="pt-000060")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Długoterminowe pożyczki i kredyty bankowe
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 20
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentPortionOfNoncurrentLoansReceived", scale="3", unitRef="PLN"): 26 730
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentPortionOfNoncurrentLoansReceived", scale="3", unitRef="PLN"): 90 319
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania z tytułu leasingu
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 23
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentLeaseLiabilities", scale="3", unitRef="PLN"): 56 893
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentLeaseLiabilities", scale="3", unitRef="PLN"): 60 724
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania i rezerwy z tytułu świadczeń pracowniczych
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 26
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentProvisionsForEmployeeBenefits", scale="3", unitRef="PLN"): 2 298
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentProvisionsForEmployeeBenefits", scale="3", unitRef="PLN"): 1 196
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Rezerwy długoterminowe
        • td (class="pt-000026")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 21
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherLongtermProvisions", scale="3", unitRef="PLN"): 0
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherLongtermProvisions", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000065")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Rezerwa na podatek odroczony
        • td (class="pt-000048")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 10.5
        • td (class="pt-000066")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DeferredTaxLiabilities", scale="3", unitRef="PLN"): 5 005
        • td (class="pt-000066")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DeferredTaxLiabilities", scale="3", unitRef="PLN"): 4 174
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Zobowiązania długoterminowe razem
        • td (class="pt-000062")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentLiabilities", scale="3", unitRef="PLN"): 90 926
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:NoncurrentLiabilities", scale="3", unitRef="PLN"): 156 413
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Zobowiązania krótkoterminowe
        • td (class="pt-000060")
        • p (class="pt-Normalny-000059", dir="ltr")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
      • tr (class="pt-000023")
        • td (class="pt-000050")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania handlowe i pozostałe zobowiązania
        • td (class="pt-000034")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 22.1
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:TradeAndOtherCurrentPayables", scale="3", unitRef="PLN"): 90 689
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:TradeAndOtherCurrentPayables", scale="3", unitRef="PLN"): 82 844
      • tr (class="pt-000023")
        • td (class="pt-000067")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033"): Zobowiązania kontraktowe oraz z tytułu prawa do zwrotu towaru
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 22.2
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentRefundsProvisionAndContractLiabilities", scale="3", unitRef="PLN"): 13 215
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentRefundsProvisionAndContractLiabilities", scale="3", unitRef="PLN"): 9 778
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Krótkoterminowe pożyczki i kredyty bankowe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 20
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentLoansReceivedAndCurrentPortionOfNoncurrentLoansReceived", scale="3", unitRef="PLN"): 76 597
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentLoansReceivedAndCurrentPortionOfNoncurrentLoansReceived", scale="3", unitRef="PLN"): 83 582
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania z tytułu leasingu
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 23
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentLeaseLiabilities", scale="3", unitRef="PLN"): 26 706
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentLeaseLiabilities", scale="3", unitRef="PLN"): 21 818
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania z tytułu faktoringu na finansowanie dostaw
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 24.1
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentReverseFactoringLiabilities", scale="3", unitRef="PLN"): 0
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentReverseFactoringLiabilities", scale="3", unitRef="PLN"): 14 370
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania z tytułu faktoringu na finansowanie należności
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 24.2
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentFactoringLiabilities", scale="3", unitRef="PLN"): 0
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ext:CurrentFactoringLiabilities", scale="3", unitRef="PLN"): 3 550
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Bieżące zobowiązania podatkowe
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 10.2
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentTaxLiabilitiesCurrent", scale="3", unitRef="PLN"): 1 413
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentTaxLiabilitiesCurrent", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zobowiązania i rezerwy z tytułu świadczeń pracowniczych
        • td (class="pt-000040")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 26
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentProvisionsForEmployeeBenefits", scale="3", unitRef="PLN"): 6 785
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentProvisionsForEmployeeBenefits", scale="3", unitRef="PLN"): 3 499
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Rezerwy krótkoterminowe
        • td (class="pt-000026")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 21
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherShorttermProvisions", scale="3", unitRef="PLN"): 695
        • td (class="pt-000038")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherShorttermProvisions", scale="3", unitRef="PLN"): 558
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Zobowiązania krótkoterminowe razem
        • td (class="pt-000062")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentLiabilities", scale="3", unitRef="PLN"): 216 100
        • td (class="pt-000036")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CurrentLiabilities", scale="3", unitRef="PLN"): 219 999
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Zobowiązania razem
        • td (class="pt-000042")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Liabilities", scale="3", unitRef="PLN"): 307 026
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Liabilities", scale="3", unitRef="PLN"): 376 412
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Kapitał własny i zobowiązania razem
        • td (class="pt-000068")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:EquityAndLiabilities", scale="3", unitRef="PLN"): 789 953
        • td (class="pt-000041")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:EquityAndLiabilities", scale="3", unitRef="PLN"): 748 609
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549854")
    • h1 (dir="ltr")
    • span: Skonsolidowane sprawozdanie z przepływów pieniężnych
    • div
    • table (class="pt-000008", dir="ltr")
      • tbody
      • tr (class="pt-000069")
        • td (class="pt-000010")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000013")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000014", colspan="2")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): okres zakończony
      • tr (class="pt-000054")
        • td (class="pt-000018")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000056")
        • td (class="pt-000021")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): Nota
        • td (class="pt-000022")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): 31/12/2020
        • td (class="pt-000022")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000020"): 31/12/2019
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Przepływy pieniężne z działalności operacyjnej
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000015", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000027", dir="ltr")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Zysk przed opodatkowaniem
        • td (class="pt-000045")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossBeforeTax", scale="3", unitRef="PLN"): 138 343
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLossBeforeTax", scale="3", unitRef="PLN"): 74 236
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Korekty:
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000015", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000027", dir="ltr")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Amortyzacja
        • td (class="pt-000045")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForDepreciationAndAmortisationExpense", scale="3", unitRef="PLN"): 23 505
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForDepreciationAndAmortisationExpense", scale="3", unitRef="PLN"): 20 084
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zyski/straty z tytułu różnic kursowych
        • td (class="pt-000068")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForForeignExchangeLossesGains", scale="3", unitRef="PLN"): 3 208
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForForeignExchangeLossesGains", scale="3", sign="-", unitRef="PLN"): 94
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Korekty z tytułu zysków/strat z tytułu sprzedaży aktywów trwałych
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForGainLossOnDisposalsPropertyPlantAndEquipment", scale="3", sign="-", unitRef="PLN"): 87
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForGainLossOnDisposalsPropertyPlantAndEquipment", scale="3", sign="-", unitRef="PLN"): 235
      • tr (class="pt-000072")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Inne korekty, w przypadku których skutkami pieniężnymi są przepływy pieniężne z działalności finansowej lub inwestycyjnej
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherAdjustmentsForWhichCashEffectsAreInvestingOrFinancingCashFlow", scale="3", unitRef="PLN"): 420
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherAdjustmentsForWhichCashEffectsAreInvestingOrFinancingCashFlow", scale="3", sign="-", unitRef="PLN"): 19
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Koszty finansowe ujęte w wyniku
        • td (class="pt-000045")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForFinanceCosts", scale="3", unitRef="PLN"): 7 635
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForFinanceCosts", scale="3", unitRef="PLN"): 9 616
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Inne korekty
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherAdjustmentsToReconcileProfitLoss", scale="3", sign="-", unitRef="PLN"): 12
            )
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherAdjustmentsToReconcileProfitLoss", scale="3", sign="-", unitRef="PLN"): 12
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zmiana stanu zapasów
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForDecreaseIncreaseInInventories", scale="3", sign="-", unitRef="PLN"): 20 857
            )
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForDecreaseIncreaseInInventories", scale="3", sign="-", unitRef="PLN"): 26 104
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zmiana stanu aktywa z tytułu prawa do zwrotu towaru
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForDecreaseIncreaseCurrentAssetsForRightsToRecoverGoodsFromCustomers", scale="3", sign="-", unitRef="PLN"): 2 683
            )
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForDecreaseIncreaseCurrentAssetsForRightsToRecoverGoodsFromCustomers", scale="3", sign="-", unitRef="PLN"): 2 433
            )
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zmiana stanu należności handlowych oraz pozostałych należności
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForDecreaseIncreaseInTradeAndOtherReceivables", scale="3", sign="-", unitRef="PLN"): 11 391
            )
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForDecreaseIncreaseInTradeAndOtherReceivables", scale="3", sign="-", unitRef="PLN"): 25 841
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zmiana stanu zobowiązań handlowych oraz pozostałych zobowiązań
        • td (class="pt-000045")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForIncreaseDecreaseInTradeAndOtherPayables", scale="3", unitRef="PLN"): 6 652
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:AdjustmentsForIncreaseDecreaseInTradeAndOtherPayables", scale="3", sign="-", unitRef="PLN"): 25 912
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zmiana stanu zobowiązań kontraktowych oraz z tytułu prawa do zwrotu towaru
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForIncreaseDecreaseCurrentRefundsProvisionAndContractLiabilities", scale="3", unitRef="PLN"): 3 437
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForIncreaseDecreaseCurrentRefundsProvisionAndContractLiabilities", scale="3", unitRef="PLN"): 2 985
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zmiana stanu zobowiązań z tyt. świadczeń pracowniczych oraz rezerw
        • td (class="pt-000044")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForIncreaseDecreaseInEmployeeBenefitLiabilitiesAndProvisions", scale="3", unitRef="PLN"): 4 524
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:AdjustmentsForIncreaseDecreaseInEmployeeBenefitLiabilitiesAndProvisions", scale="3", unitRef="PLN"): 3 149
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Środki pieniężne z działalności operacyjnej
        • td (class="pt-000045")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInOperations", scale="3", unitRef="PLN"): 152 868
        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInOperations", scale="3", unitRef="PLN"): 29 890
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zapłacony podatek dochodowy
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IncomeTaxesPaidRefundClassifiedAsOperatingActivities", scale="3", unitRef="PLN"): 24 966
            )
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IncomeTaxesPaidRefundClassifiedAsOperatingActivities", scale="3", unitRef="PLN"): 14 553
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Środki pieniężne netto z działalności operacyjnej
        • td (class="pt-000046")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInOperatingActivities", scale="3", unitRef="PLN"): 127 902
        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInOperatingActivities", scale="3", unitRef="PLN"): 15 337
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Przepływy pieniężne z działalności inwestycyjnej
        • td (class="pt-000064")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000015", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000027", dir="ltr")
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Nabycie rzeczowych aktywów trwałych i wartości niematerialnych
        • td (class="pt-000074")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:PurchaseOfPropertyPlantAndEquipmentIntangibleAssetsOtherThanGoodwillInvestmentPropertyAndOtherNoncurrentAssets", scale="3", unitRef="PLN"): 9 987
            )
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:PurchaseOfPropertyPlantAndEquipmentIntangibleAssetsOtherThanGoodwillInvestmentPropertyAndOtherNoncurrentAssets", scale="3", unitRef="PLN"): 13 359
            )
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zbycie rzeczowych aktywów trwałych i wartości niematerialnych
        • td (class="pt-000068")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProceedsFromDisposalsOfPropertyPlantAndEquipmentIntangibleAssetsOtherThanGoodwillInvestmentPropertyAndOtherNoncurrentAssets", scale="3", unitRef="PLN"): 97
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProceedsFromDisposalsOfPropertyPlantAndEquipmentIntangibleAssetsOtherThanGoodwillInvestmentPropertyAndOtherNoncurrentAssets", scale="3", unitRef="PLN"): 105
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Udzielone pożyczki
        • td (class="pt-000068")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashAdvancesAndLoansMadeToOtherPartiesClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 0
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashAdvancesAndLoansMadeToOtherPartiesClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 115
            )
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Spłata udzielonych pożyczek
        • td (class="pt-000064")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashReceiptsFromRepaymentOfAdvancesAndLoansMadeToOtherPartiesClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 30
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashReceiptsFromRepaymentOfAdvancesAndLoansMadeToOtherPartiesClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 59
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wpływy z tytułu udzielonego leasingu finansowego
        • td (class="pt-000074")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:CashReceiptsFromFinanceLeaseClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 9
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:CashReceiptsFromFinanceLeaseClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 199
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Odsetki otrzymane
        • td (class="pt-000064")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
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        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:InterestReceivedClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 21
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        • td (class="pt-000031")
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          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wpływy z tytułu kontraktów terminowych
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashReceiptsFromFutureContractsForwardContractsOptionContractsAndSwapContractsClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 0
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        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wydatki z tytułu kontraktów terminowych
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashPaymentsForFutureContractsForwardContractsOptionContractsAndSwapContractsClassifiedAsInvestingActivities", scale="3", unitRef="PLN"): 0
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        • td (class="pt-000031")
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          • span (class="pt-Domylnaczcionkaakapitu-000016"): Środki pieniężne netto z działalności inwestycyjnej
        • td (class="pt-000074")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInInvestingActivities", scale="3", sign="-", unitRef="PLN"): 10 271
            )
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInInvestingActivities", scale="3", sign="-", unitRef="PLN"): 13 090
            )
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000059", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Przepływy pieniężne z działalności finansowej
        • td (class="pt-000064")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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        • p (class="pt-Normalny-000015", dir="ltr")
        • td (class="pt-000029")
        • p (class="pt-Normalny-000027", dir="ltr")
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        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wpływy z emisji akcji
        • td (class="pt-000074")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProceedsFromIssueOfOrdinaryShares", scale="3", unitRef="PLN"): 0
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProceedsFromIssueOfOrdinaryShares", scale="3", unitRef="PLN"): 980
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wydatki dotyczące emisji akcji
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:PaymentsForShareIssueCosts", scale="3", unitRef="PLN"): 0
        • td (class="pt-000073")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:PaymentsForShareIssueCosts", scale="3", unitRef="PLN"): 38
            )
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wypłata dywidendy
        • td (class="pt-000074")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsPaidToEquityHoldersOfParentClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 0
        • td (class="pt-000070")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsPaidToEquityHoldersOfParentClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 2 603
            )
      • tr (class="pt-000023")
        • td (class="pt-000037")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Otrzymane kredyty i pożyczki
        • td (class="pt-000064")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000073")
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProceedsFromBorrowingsClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 15 024
      • tr (class="pt-000023")
        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Spłaty kredytów i pożyczek
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000070")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:RepaymentsOfBorrowingsClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 0
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        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wpływ finansowania - faktoring odwrotny
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:ProceedsFromReverseFactoringClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 0
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:ProceedsFromReverseFactoringClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 14 375
      • tr (class="pt-000023")
        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wpływ finansowania - faktoring na należności
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ext:ProceedsFromFactoringClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 0
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ext:ProceedsFromFactoringClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 3 574
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          • span (class="pt-Domylnaczcionkaakapitu-000035"): Spłata finansowania - faktoring odwrotny
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
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        • td (class="pt-000039")
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          • span (class="pt-Domylnaczcionkaakapitu-000035"): Spłata finansowania - faktoring na należności
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
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        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Odsetki i prowizje zapłacone
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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            )
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:InterestPaidClassifiedAsFinancingActivities", scale="3", unitRef="PLN"): 9 469
            )
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        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Środki pieniężne netto z działalności finansowej
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
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            )
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        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashFlowsFromUsedInFinancingActivities", scale="3", unitRef="PLN"): 1 853
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        • td (class="pt-000039")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Przepływy pieniężne netto razem
        • td (class="pt-000068")
        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IncreaseDecreaseInCashAndCashEquivalentsBeforeEffectOfExchangeRateChanges", scale="3", sign="-", unitRef="PLN"): 4 741
            )
        • td (class="pt-000071")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
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        • td (class="pt-000039")
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          • span (class="pt-Domylnaczcionkaakapitu-000035"): Środki pieniężne i ich ekwiwalenty na początek okresu sprawozdawczego
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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        • td (class="pt-000053")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wpływ zmian kursów walut na saldo środków pieniężnych w walutach obcych
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
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          • span (class="pt-Domylnaczcionkaakapitu-000035")
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        • td (class="pt-000029")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
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        • td (class="pt-000031")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Środki pieniężne i ich ekwiwalenty na koniec okresu sprawozdawczego
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        • p (class="pt-Normalny-000015", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): 25
        • td (class="pt-000051")
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          • span (class="pt-Domylnaczcionkaakapitu-000016")
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        • td (class="pt-000051")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:CashAndCashEquivalentsIfDifferentFromStatementOfFinancialPosition", scale="3", unitRef="PLN"): 26 013
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000075", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000076"): (sporządzone metodą pośrednią)
    • p (class="pt-Normalny-000075", dir="ltr")
    • p (class="pt-Normalny-000075", dir="ltr")
    • p (class="pt-000006", id="_Toc67549855")
    • h1 (dir="ltr")
    • span: Skonsolidowane sprawozdanie ze zmian w kapitale własnym
    • div
    • table (class="pt-000008", dir="ltr")
      • tbody
      • tr (class="pt-000078")
        • td (class="pt-000079")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000033")
        • td (class="pt-000080")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000082"): Wyemitowany kapitał akcyjny
        • td (class="pt-000083")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000082"): Kapitał z emisji warrantów
        • td (class="pt-000084")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000082"): Kapitał ze sprzedaży akcji powyżej wartości nominalnej
        • td (class="pt-000085")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000082"): Zyski zatrzymane - pozostałe
        • td (class="pt-000084")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000082"): Różnice kursowe z przeliczenia jednostek zagranicznych
        • td (class="pt-000086")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000087"): Przypadające akcjonariuszom jednostki dominującej
        • td (class="pt-000088")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000087"): Przypadające udziałom niedającym kontroli
        • td (class="pt-000085")
        • p (class="pt-Normalny-000081", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000082"): Razem
      • tr (class="pt-000023")
        • td (class="pt-000089")
        • p (class="pt-Normalny-000081", dir="ltr")
        • td (class="pt-000091")
        • p (class="pt-Normalny-000092", dir="ltr")
        • td (class="pt-000093")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000095")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000096")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000097")
        • p (class="pt-Normalny-000030", dir="ltr")
        • td (class="pt-000095")
        • p (class="pt-Normalny-000030", dir="ltr")
      • tr (class="pt-000023")
        • td (class="pt-000098")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Stan na 31 grudnia 2018 roku
        • td (class="pt-000099")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79_ifrs-full_IssuedCapitalMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 13 012
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79_ifrs-full_ReserveOfSharebasedPaymentsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 2 103
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79_ifrs-full_SharePremiumMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 105 407
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 194 662
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C79_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", sign="-", unitRef="PLN"): 22
            )
        • td (class="pt-000103")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 315 162
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 0
        • td (class="pt-000105")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C79", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 315 162
      • tr (class="pt-000023")
        • td (class="pt-000106")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zysk netto w okresie
        • td (class="pt-000107")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000093")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000095")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 58 714
        • td (class="pt-000094")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000096")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 58 714
        • td (class="pt-000097")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 0
        • td (class="pt-000108")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 58 714
      • tr (class="pt-000072")
        • td (class="pt-000098")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Pozostałe całkowite dochody w okresie (netto)
        • td (class="pt-000099")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 18
            )
        • td (class="pt-000103")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C78_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 18
            )
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000105")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 18
            )
      • tr (class="pt-000023")
        • td (class="pt-000109")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Suma całkowitych dochodów
        • td (class="pt-000110")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_IssuedCapitalMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000111")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_ReserveOfSharebasedPaymentsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000112")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_SharePremiumMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000113")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 58 714
        • td (class="pt-000112")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C78_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 18
            )
        • td (class="pt-000114")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 58 696
        • td (class="pt-000115")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000113")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 58 696
      • tr (class="pt-000023")
        • td (class="pt-000089")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wypłata dywidendy
        • td (class="pt-000091")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000093")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000116")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C78_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 2 603
            )
        • td (class="pt-000117")
        • p (class="pt-Normalny-000019", dir="ltr")
        • td (class="pt-000118")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C78_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 2 603
            )
        • td (class="pt-000119")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 0
        • td (class="pt-000095")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 2 603
            )
      • tr (class="pt-000023")
        • td (class="pt-000120")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Emisja akcji zwykłych
        • td (class="pt-000121")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_IssuedCapitalMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 50
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_SharePremiumMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 892
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000122")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 942
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C78_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 0
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C78", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 942
      • tr (class="pt-000023")
        • td (class="pt-000120")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Stan na 31 grudnia 2019 roku
        • td (class="pt-000121")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77_ifrs-full_IssuedCapitalMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 13 062
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77_ifrs-full_ReserveOfSharebasedPaymentsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 2 103
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77_ifrs-full_SharePremiumMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 106 299
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 250 773
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C77_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 40
            )
        • td (class="pt-000103")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 372 197
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 0
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C77", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 372 197
      • tr (class="pt-000023")
        • td (class="pt-000109")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Zysk netto w okresie
        • td (class="pt-000110")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000111")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000112")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000113")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 110 982
        • td (class="pt-000112")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000096")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 110 982
        • td (class="pt-000115")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 0
        • td (class="pt-000113")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ProfitLoss", scale="3", unitRef="PLN"): 110 982
      • tr (class="pt-000054")
        • td (class="pt-000089")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Pozostałe całkowite dochody w okresie (netto)
        • td (class="pt-000091")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000093")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000095")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
            (
          • nonFraction (contextRef="C76_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 252
            )
        • td (class="pt-000123")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C76_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 252
            )
        • td (class="pt-000097")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000095")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:OtherComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 252
            )
      • tr (class="pt-000023")
        • td (class="pt-000120")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Suma całkowitych dochodów
        • td (class="pt-000121")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_IssuedCapitalMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_ReserveOfSharebasedPaymentsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_SharePremiumMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 110 982
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C76_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", sign="-", unitRef="PLN"): 252
            )
        • td (class="pt-000103")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 110 730
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 0
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:ComprehensiveIncome", scale="3", unitRef="PLN"): 110 730
      • tr (class="pt-000023")
        • td (class="pt-000089")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Wypłata dywidendy
        • td (class="pt-000091")
        • p (class="pt-Normalny-000032", dir="ltr")
        • td (class="pt-000093")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000094")
        • p (class="pt-Normalny-000027", dir="ltr")
        • td (class="pt-000116")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 0
        • td (class="pt-000117")
        • p (class="pt-Normalny-000019", dir="ltr")
        • td (class="pt-000118")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 0
        • td (class="pt-000119")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 0
        • td (class="pt-000095")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:DividendsRecognisedAsDistributionsToOwnersOfParentRelatingToPriorYears", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000120")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035"): Emisja akcji zwykłych
        • td (class="pt-000121")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
        • td (class="pt-000103")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 0
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000035")
          • nonFraction (contextRef="C76_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 0
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C76", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:IssueOfEquity", scale="3", unitRef="PLN"): 0
      • tr (class="pt-000023")
        • td (class="pt-000120")
        • p (class="pt-Normalny-000032", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016"): Stan na 31 grudnia 2020 roku
        • td (class="pt-000121")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75_ifrs-full_IssuedCapitalMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 13 062
        • td (class="pt-000100")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75_ifrs-full_ReserveOfSharebasedPaymentsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 2 103
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75_ifrs-full_SharePremiumMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 106 299
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75_ifrs-full_RetainedEarningsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 361 755
        • td (class="pt-000101")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
            (
          • nonFraction (contextRef="C75_ifrs-full_ReserveOfExchangeDifferencesOnTranslationMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", sign="-", unitRef="PLN"): 292
            )
        • td (class="pt-000103")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75_ifrs-full_EquityAttributableToOwnersOfParentMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 482 927
        • td (class="pt-000104")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75_ifrs-full_NoncontrollingInterestsMember", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 0
        • td (class="pt-000102")
        • p (class="pt-Normalny-000019", dir="ltr")
          • span (class="pt-Domylnaczcionkaakapitu-000016")
          • nonFraction (contextRef="C75", decimals="-3", format="ixt:num-dot-decimal", name="ifrs-full:Equity", scale="3", unitRef="PLN"): 482 927
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-000006", id="_Toc67549856")
    • h1 (dir="ltr")
    • span: Informacje objaśniające do skonsolidowanego sprawozdania finansowego
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549857")
    • h2 (dir="ltr")
    • span: 1. Informacje ogólne
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000127", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Jednostka dominująca
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Auto Partner S.A. z siedzibą 43-150 Bieruń ul. Ekonomiczna 20, Polska, Spółka jest zarejestrowana w Krajowym Rejestrze Sądowym w Sądzie Rejonowym Katowice-Wschód, Wydział VIII Gospodarczy Krajowego Rejestru Sądowego pod numerem KRS 0000291327.
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Nazwa jednostki sprawozdawczej lub inne dane identyfikacyjne:
      • nonNumeric (contextRef="C76", name="ifrs-full:NameOfReportingEntityOrOtherMeansOfIdentification"): Auto Partner S.A.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Wyjaśnienie zmian w nazwie jednostki sprawozdawczej lub innych danych identyfikacyjnych, które to zmiany nastąpiły od zakończenia poprzedniego okresu sprawozdawczego:
      • nonNumeric (contextRef="C76", name="ifrs-full:ExplanationOfChangeInNameOfReportingEntityOrOtherMeansOfIdentificationFromEndOfPrecedingReportingPeriod"): nie dotyczy
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Siedziba jednostki: 43-150
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      • nonNumeric (contextRef="C76", name="ifrs-full:DomicileOfEntity"): Bieruń ul. Ekonomiczna 20, Polska
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Forma prawna jednostki:
      • nonNumeric (contextRef="C76", name="ifrs-full:LegalFormOfEntity"): Spółka Akcyjna
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Państwo rejestracji:
      • nonNumeric (contextRef="C76", name="ifrs-full:CountryOfIncorporation"): Polska
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Adres zarejestrowanego biura jednostki: 43-100
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      • nonNumeric (contextRef="C76", name="ifrs-full:AddressOfRegisteredOfficeOfEntity"): Bieruń ul. Ekonomiczna 20, Polska
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Podstawowe miejsce prowadzenia działalności gospodarczej:
      • nonNumeric (contextRef="C76", name="ifrs-full:PrincipalPlaceOfBusiness"): Polska
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • nonNumeric (contextRef="C76", name="ifrs-full:DescriptionOfNatureOfEntitysOperationsAndPrincipalActivities")
      • span (class="pt-Domylnaczcionkaakapitu-000130"): Opis charakteru oraz podstawowego zakresu działalności jednostki: p
      • span (class="pt-Domylnaczcionkaakapitu-000130"): odstawowym obszarem działalności Spółki jest organizacja dystrybucji części zamiennych do samochodów bezpośrednio od producentów do odbiorców końcowych. Spółka jest importerem i dystrybutorem części do samochodów osobowych i dostawczych w obszarze rynku części zamiennych klasyfikowanych zgodnie z regulacjami prawnymi i dyrektywami Unii Europejskiej GVO.
    • p (class="pt-000006", id="_Hlk67480018")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Nazwa jednostki dominującej:
      • nonNumeric (contextRef="C76", name="ifrs-full:NameOfParentEntity"): nie występuje podmiot kontrolujący Spółkę Auto Partner S.A.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130")
      Nazwa jednostki dominującej najwyższego szczebla grupy:
      • nonNumeric (contextRef="C76", name="ifrs-full:NameOfUltimateParentOfGroup"): nie występuje
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Czas trwania działalności Spółki
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Czas trwania działalności Spółki nie jest ograniczony.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Rok obrotowy
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rokiem obrotowym Spółki jest rok kalendarzowy.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Zarząd wg stanu na dzień zatwierdzenia sprawozdania finansowego do publikacji
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Aleksander Górecki – Prezes Zarządu
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Andrzej Manowski – Wiceprezes Zarządu
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Piotr Janta – Wiceprezes Zarządu
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Rada Nadzorcza wg stanu na dzień zatwierdzenia sprawozdania finansowego do publikacji
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Jarosław Plisz – Przewodniczący Rady
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Bogumił Woźny – Wiceprzewodniczący Rady
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Andrzej Urban – Członek Rady
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Bogumił Kamiński – Członek Rady
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Mateusz Melich – Członek Rady
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Prokurenci
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grzegorz Lenda – Prokura łączna
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Biegły Rewident
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Deloitte Audyt Spółka z ograniczoną odpowiedzialnością Spółka komandytowa
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): al. Jana Pawła II 22, 00-133 Warszawa
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Notowania na giełdach
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Akcje Auto Partner S.A. są notowane na Giełdzie Papierów Wartościowych w Warszawie S.A. w systemie notowań ciągłych.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Struktura kapitału akcyjnego
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Według stanu na dzień 31 grudnia 2020 roku struktura kapitału akcyjnego Spółki jest następująca:
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000127", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Grupa kapitałowa
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Na dzień bilansowy w skład Grupy Kapitałowej Auto Partner wchodzą Auto Partner S.A. jako podmiot dominujący oraz 4 jednostki zależne konsolidowanych metodą pełną. Dodatkowe informacje na temat jednostek objętych skonsolidowanym sprawozdaniem finansowym zostały zamieszczone w nocie 14.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Czas trwania działalności poszczególnych jednostek wchodzących w skład Grupy Kapitałowej nie jest ograniczony. Sprawozdania finansowe wszystkich jednostek zależnych sporządzone zostały za ten sam okres sprawozdawczy co sprawozdanie finansowe jednostki dominującej, przy zastosowaniu spójnych zasad rachunkowości.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rokiem obrotowym Spółki dominującej oraz Spółek wchodzących w skład Grupy jest rok kalendarzowy.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Podstawowym obszarem działalności Grupy jest organizacja dystrybucji części zamiennych do samochodów bezpośrednio od producentów do odbiorców końcowych. Grupa jest importerem i dystrybutorem części do samochodów osobowych i dostawczych w obszarze rynku części zamiennych klasyfikowanych zgodnie z regulacjami prawnymi i dyrektywami Unii Europejskiej GVO.
    • p (class="pt-Normalny-000134", dir="ltr")
    • p (class="pt-000006", id="_Toc67549858")
    • h2 (dir="ltr")
    • span: 2. Zmiany polityki rachunkowości i prezentacji
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000135", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 2.1. Zmiana polityki rachunkowości
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-000006", id="_Hlk65572895")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa nie dokonała zmian polityki rachunkowości.
    • p (class="pt-Normalny-000137", dir="ltr")
    • p (class="pt-Normalny-000135", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 2.2. Zmiana prezentacji
    • p (class="pt-Normalny-000138", dir="ltr")
    • p (class="pt-000006", id="_Hlk67045814")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zarząd Grupy w celu wiarygodnego i wiernego przedstawienia sytuacji finansowej Grupy, dokonał zmiany prezentacji, polegającej na:
    • p (class="pt-000140", dir="ltr")
    • span (class="pt-000141"): 1)
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zmianie prezentacji doszacowanej wartości rabatów obrotowych należnych od dostawców. Przed zmianą wartość doszacowana rabatów obrotowych od dostawcy prezentowana była w sprawozdaniu z sytuacji finansowej w pozycji zobowiązania handlowe i pozostałe zobowiązania jako zmniejszenie zobowiązania z tytułu zobowiązań z tytułu dostaw i usług. Po zmianie wartość doszacowana rabatów obrotowych od dostawcy prezentowana jest w sprawozdaniu z sytuacji finansowej w pozycji zobowiązania handlowe i pozostałe zobowiązania jako zmniejszenie zobowiązania z tytułu zobowiązań z tytułu dostaw i usług do wysokości salda zobowiązania wobec dostawcy na dzień bilansowy, natomiast nadwyżka jest prezentowana w pozycji należności handlowe oraz pozostałe należności jako zwiększenie należności handlowych z tytułu dostaw i usług. Poniżej przedstawiono wpływ zmiany prezentacji w sprawozdaniu z sytuacji finansowej na 31 grudnia 2019 oraz w sprawozdaniu z przepływów pieniężnych za okres zakończony 31 grudnia 2019.
    • p (class="pt-Akapitzlist", dir="ltr")
    • p (class="pt-000140", dir="ltr")
    • span (class="pt-000141"): 2)
    • span (class="pt-eop"): Zmianie prezentacji rezerwy na zobowiązania z tytułu Programu Motywacyjnego w sprawozdaniu z sytuacji finansowej. Przed zmianą rezerwa była prezentowana w pozycji rezerwy długoterminowe i krótkoterminowe razem z innymi rezerwami. Po zmianie rezerwa na zobowiązania z tytułu Programu Motywacyjnego w sprawozdaniu z sytuacji finansowej prezentowana jest w pozycji długoterminowych i krótkoterminowych zobowiązań i rezerw z tytułu świadczeń pracowniczych.
    • p (class="pt-000140", dir="ltr", style="text-align: justify;"): W ocenie Zarządu zmiana prezentacji nie jest istotna w odniesieniu do całości sprawozdań finansowych w związku z tym Grupa nie dokonała prezentacji skorygowanego bilansu otwarcia dla roku 2019.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
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")
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-000006", id="_Toc67549859")
    • h2 (dir="ltr")
    • span: 3. Stosowane zasady rachunkowości
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-Normalny-000135", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 3.1. Oświadczenie o zgodności
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Prezentowane roczne skonsolidowane sprawozdanie finansowe (sprawozdanie finansowe, sprawozdanie) Grupy za okres od 1 stycznia 2020 roku do 31 grudnia 2020 roku oraz za analogiczny okres roku ubiegłego zostało sporządzone zgodnie z Międzynarodowymi Standardami Sprawozdawczości Finansowej (MSSF), zatwierdzonymi przez Unię Europejską, opublikowanymi i obowiązującymi na dzień 31.12.2020. Zasady rachunkowości przyjęte przy sporządzaniu niniejszego skonsolidowanego sprawozdania finansowego są zgodne z zasadami przyjętymi przy sporządzaniu rocznego skonsolidowanego sprawozdania finansowego za rok obrotowy zakończony 31 grudnia 2019 roku.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Skonsolidowane sprawozdanie finansowe zostało sporządzone przy założeniu kontynuacji działalności w dającej się przewidzieć przyszłości. Na dzień zatwierdzenia niniejszego sprawozdania finansowego nie istnieją żadne okoliczności wskazujące na zagrożenie kontynuacji.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 3.2. Zmiany standardów i interpretacji w 2020 roku
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Następujące zmiany do istniejących standardów wydane przez Radę Międzynarodowych Standardów Rachunkowości (RMSR) oraz zatwierdzone do stosowania w UE wchodzą w życie po raz pierwszy za 2020 rok:
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSR 1 „Prezentacja sprawozdań finansowych” i MSR 8 „Zasady (polityka) rachunkowości, zmiany wartości szacunkowych i korygowanie błędów”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – Definicja istotności - zatwierdzone w UE w dniu 29 listopada 2019 roku (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2020 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSSF 3 „Połączenia przedsięwzięć”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – definicja przedsięwzięcia - zatwierdzone w UE w dniu 21 kwietnia 2020 roku (obowiązujące w odniesieniu do połączeń, w przypadku których data przejęcia przypada na początek pierwszego okresu rocznego rozpoczynającego się 1 stycznia 2020 r. lub później oraz w odniesieniu do nabycia aktywów, które nastąpiło w dniu rozpoczęcia w/w okresu rocznego lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSSF 9 „Instrumenty finansowe”, MSR 39 „Instrumenty finansowe: ujmowanie i wycena” oraz MSSF 7 „Instrumenty finansowe: ujawnianie informacji”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): - Reforma Referencyjnej Stopy Procentowej - zatwierdzone w UE w dniu 15 stycznia 2020 roku (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2020 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSSF 16 „Leasing”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): - ulgi w spłatach czynszu w związku z Covid-19 (zatwierdzone w UE w dniu 9 października 2020 roku i obowiązujące najpóźniej od dnia 1 czerwca 2020 r. w odniesieniu do roku obrotowego rozpoczynającego się dnia 1 stycznia 2020 r. lub później).
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany odniesień do założeń koncepcyjnych zawartych w MSSF
    • span (class="pt-Domylnaczcionkaakapitu-000147"): - zatwierdzone w UE w dniu 29 listopada 2019 roku (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2020 roku lub później).
    • p (class="pt-Akapitzlist-000148", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wyżej wymienione zmiany do istniejących standardów nie miały istotnego wpływu na sprawozdanie finansowe.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Nowe standardy oraz zmiany do istniejących standardów, jakie zostały już wydane przez RMSR i zatwierdzone przez UE, ale jeszcze nie weszły w życie: Zatwierdzając niniejsze sprawozdanie finansowe następujące zmiany do istniejących standardów zostały wydane przez RMSR i zatwierdzone do stosowania w UE, a które wchodzą w życie w późniejszym terminie:
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000150"): 
    • span (class="pt-Domylnaczcionkaakapitu-000151"): Zmiany do MSSF 4 „Umowy ubezpieczeniowe”
    • span (class="pt-Domylnaczcionkaakapitu-000130"): pt. „Przedłużenie tymczasowego zwolnienia ze stosowania MSSF 9” zatwierdzone w UE w dniu 16 grudnia 2020 r. (data wygaśnięcia tymczasowego zwolnienia z MSSF 9 została przedłużona z 1 stycznia 2021 roku na okresy roczne rozpoczynające się 1 stycznia 2023 roku i później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000152"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSSF 9 „Instrumenty finansowe”, MSR 39 „Instrumenty finansowe: ujmowanie i wycena”, MSSF 7 „Instrumenty finansowe: ujawnianie informacji”, MSSF 4 „Umowy ubezpieczeniowe” oraz MSSF 16 „Leasing”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): - Reforma Referencyjnej Stopy Procentowej - Etap 2
    • span (class="pt-Domylnaczcionkaakapitu-000130"): zatwierdzone w UE w dniu 13 stycznia 2021 r.
    • span (class="pt-Domylnaczcionkaakapitu-000147"): (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2021 roku lub później).
    • h2 (dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Nowe standardy oraz zmiany do istniejących standardów wydane przez RMSR, ale jeszcze niezatwierdzone do stosowania w UE: MSSF w kształcie zatwierdzonym przez UE nie różnią się obecnie w znaczący sposób od regulacji wydanych przez Radę Międzynarodowych Standardów Rachunkowości (RMSR), z wyjątkiem poniższych nowych standardów oraz zmian do standardów, które według stanu na dzień publikacji sprawozdania finansowego nie zostały jeszcze zatwierdzone do stosowania w UE (poniższe daty wejścia w życie odnoszą się do standardów w wersji pełnej):
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): MSSF 14 „Odroczone salda z regulowanej działalności”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): (obowiązujący w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2016 roku lub później) – Komisja Europejska postanowiła nie rozpoczynać procesu zatwierdzania tego tymczasowego standardu do stosowania na terenie UE do czasu wydania ostatecznej wersji MSSF 14,
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): MSSF 17 „Umowy ubezpieczeniowe”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): z późniejszymi zmianami do MSSF 17 (obowiązujący w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2023 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSR 1 „Prezentacja sprawozdań finansowych”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – Ujawnienia na temat stosowanej polityki rachunkowej (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2023 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSR 8 „Zasady (polityka) rachunkowości, zmiany wartości szacunkowych i korygowanie błędów”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – Ujawnienia na temat stosowanej polityki rachunkowej (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2023 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSR 16 „Rzeczowe aktywa trwałe”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – przychody uzyskiwane przed przyjęciem składnika aktywów trwałych do użytkowania (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2022 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSR 37 „Rezerwy, zobowiązania warunkowe i aktywa warunkowe”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – umowy rodzące obciążenia – koszt wypełnienia umowy (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2022 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSSF 3 „Połączenia przedsięwzięć”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – zmiany odniesień do założeń koncepcyjnych wraz ze zmianami do MSSF 3 (obowiązujące w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2022 roku lub później),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do MSSF 10 „Skonsolidowane sprawozdania finansowe” oraz MSR 28 „Inwestycje w jednostkach stowarzyszonych i wspólnych przedsięwzięciach”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – Sprzedaż lub wniesienie aktywów pomiędzy inwestorem a jego jednostką stowarzyszoną lub wspólnym przedsięwzięciem oraz późniejsze zmiany (data wejścia w życie zmian została odroczona do momentu zakończenia prac badawczych nad metodą praw własności),
    • p (class="pt-000144", dir="ltr")
    • span (class="pt-000145"): 
    • span (class="pt-Domylnaczcionkaakapitu-000146"): Zmiany do różnych standardów „Poprawki do MSSF (cykl 2018 - 2020)”
    • span (class="pt-Domylnaczcionkaakapitu-000147"): – dokonane zmiany w ramach procedury wprowadzania dorocznych poprawek do MSSF (MSSF 1, MSSF 9, MSSF 16 oraz MSR 41) ukierunkowane głównie na rozwiązywanie niezgodności i uściślenie słownictwa (zmiany do MSSF 1, MSSF 9 oraz MSR 41 obowiązują w odniesieniu do okresów rocznych rozpoczynających się 1 stycznia 2022 roku lub później.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Według szacunków Grupy, wyżej wymienione nowe standardy oraz zmiany do istniejących standardów nie miałyby istotnego wpływu na sprawozdanie finansowe, jeżeli zostałyby zastosowane na dzień bilansowy.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 3.3. Istotne oceny i oszacowania
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Sporządzenie sprawozdania finansowego zgodnego z MSSF wymaga od Zarządu Grupy użycia ocen i szacunków, które mają wpływ na zastosowane zasady rachunkowości oraz wykazywane aktywa, pasywa, przychody oraz koszty. Oceny i szacunki są weryfikowane na bieżąco. Zmiany szacunków są uwzględniane w wyniku okresu, w którym nastąpiła zmiana. W okresie sprawozdawczym nie wystąpiły istotne zmiany ocen lub wartości szacunkowych.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 3.4. Sezonowość
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Sprzedaż części zamiennych oraz akcesoriów do pojazdów samochodowych, stanowiąca podstawową działalność Grupy wykazuje wahania sezonowe w trakcie roku. Wyższa sprzedaż występuje w trakcie II i III kwartału roku, podczas gdy w trakcie IV oraz I kwartału sprzedaż ulega obniżeniu. Wyższa sprzedaż powoduje większe zapotrzebowanie na zatowarowanie punktów sprzedaży co skutkuje sezonowym wzrostem zobowiązań w kwartale II i III.
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 3.5. Waluta funkcjonalna i waluta sprawozdawcza
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Niniejsze skonsolidowane sprawozdanie finansowe zostało sporządzone w polskich złotych (PLN). Polski złoty jest walutą funkcjonalną i sprawozdawczą Grupy. Dane w sprawozdaniu finansowym zostały wykazane w tysiącach złotych, chyba że w konkretnych sytuacjach zostały podane z większą dokładnością.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Dla celów konsolidacji sprawozdań finansowych zagranicznych jednostek zależnych przyjęte zostały następujące zasady przeliczania danych finansowych.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Dla pozycji sprawozdania z sytuacji finansowej przyjęto kurs średni walut obcych NBP na koniec okresu sprawozdawczego:
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Dla pozycji rachunku zysków i strat oraz całkowitych dochodów przyjęto średnią kursów walut obcych NBP, obowiązujących na ostatni dzień każdego miesiąca w okresie sprawozdawczym.:
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Pozostałe z przeliczenia różnice kursowe odnosi się na kapitale rezerwowym z przeliczenia jednostek zależnych.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne-000155"): 3.6. Opis ważniejszych stosowanych zasad rachunkowości
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Zasady konsolidacji
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Skonsolidowane sprawozdanie finansowe obejmuje sprawozdanie finansowe Spółki dominującej oraz jednostek zależnych. Spółka dominująca posiada kontrolę, jeżeli: posiada władzę nad danym podmiotem, podlega ekspozycji na zmienne zwroty lub posiada prawa do zmiennych zwrotów z tytułu swojego zaangażowania w danej jednostce, ma możliwość wykorzystania władzy w celu kształtowania poziomu generowanych zwrotów. Spółka dominująca weryfikuje swoją kontrolę nad innymi jednostkami, jeżeli wystąpiła sytuacja wskazująca na zmianę jednego lub kilku z wyżej wymienionych warunków sprawowania kontroli. Jeżeli Spółka dominująca posiada mniej niż większość praw głosu w danej jednostce, ale posiadane prawa głosu wystarczają do umożliwienia jej jednostronnego kierowania istotnymi działaniami tej jednostki, znaczy to, że sprawuje nad nią władzę. Przy ocenie czy prawa głosu w danej jednostce wystarczają dla zapewnienia władzy Spółka analizuje wszystkie istotne okoliczności, w tym: wielkość posiadanego pakietu praw głosu w porównaniu do rozmiaru udziałów i stopnia rozproszenia praw głosu posiadanych przez innych udziałowców; potencjalne prawa głosu posiadane przez Spółkę innych udziałowców lub inne strony; prawa wynikające z innych ustaleń umownych; dodatkowe okoliczności, które mogą dowodzić, że Spółka posiada lub nie posiada możliwości kierowania istotnymi działaniami w momencie podejmowania decyzji, w tym wzorce głosowania zaobserwowane na poprzednich zgromadzeniach udziałowców. Konsolidacja Spółki zależnej rozpoczyna się w momencie uzyskania nad nią kontroli przez Spółkę dominującą a kończy się w chwili utraty tej kontroli. Dochody i koszty jednostki zależnej nabytej lub zbytej w ciągu roku ujmuje się w skonsolidowanym sprawozdaniu z zysków i strat oraz innych całkowitych dochodów w okresie od daty przejęcia przez Spółkę kontroli do daty utraty kontroli nad tą jednostką zależną. Wynik finansowy i wszystkie składniki pozostałych całkowitych dochodów przypisuje się właścicielom Spółki i udziałom niesprawującym kontroli. Całkowite dochody Spółek zależnych przypisuje się właścicielom Spółki i udziałom niesprawującym kontroli nawet jeżeli powoduje to powstanie deficytu po stronie udziałów niesprawujących kontroli. W razie konieczności sprawozdanie finansowe Spółek zależnych koryguje się w taki sposób, aby dopasować stosowane przez nie zasady rachunkowości do polityki rachunkowości Spółki dominującej. Podczas konsolidacji wszystkie wewnątrzgrupowe aktywa, zobowiązania, kapitał własny, dochody, koszty i przepływy pieniężne dotyczące transakcji dokonanych między członkami Grupy Kapitałowej podlegają eliminacji.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Rzeczowe aktywa trwałe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W skład rzeczowych aktywów trwałych jednostki wchodzą środki trwałe własne, inwestycje w obcych środkach trwałych, środki trwałe w budowie, środki trwałe obce, tj.: użytkowane na podstawie umów najmu, dzierżawy i leasingu, gdy warunki umowy przenoszą zasadniczo korzyści i ryzyko z ich posiadania, wykorzystywane w działalności Grupy a ich okres użytkowania przekracza jeden rok. Rzeczowe aktywa trwałe wycenia się według cen nabycia lub kosztów wytworzenia, pomniejszonych o skumulowane odpisy amortyzacyjne a także odpisy z tytułu trwałej utraty wartości. Cena nabycia lub koszt wytworzenia obejmuje koszty, które są bezpośrednio związane z nabyciem lub wytworzeniem rzeczowych aktywów trwałych, w tym skapitalizowane koszty finansowania zewnętrznego, które naliczone zostały do momentu przyjęcia środka trwałego do użytkowania.
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Na cenę nabycia lub koszt wytworzenia rzeczowych aktywów trwałych składa się cena zakupu, w przypadku
    • span (class="pt-Domylnaczcionkaakapitu-000147"): importu powiększona o obciążenia o charakterze publicznoprawnym, uwzględniająca udzielone rabaty oraz wszystkie koszty, które można bezpośrednio przyporządkować, poniesione w celu doprowadzenia składnika aktywów do stanu nadającego się do jego użytkowania. Wartość początkowa rzeczowych aktywów trwałych podlega podwyższeniu o wartość nakładów poniesionych na ich ulepszenie.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Koszty bieżącego utrzymania rzeczowych aktywów trwałych uwzględniane są w zysku lub stracie bieżącego okresu.
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wartość rzeczowych aktywów trwałych zmniejszają odpisy amortyzacyjne dokonywane w celu uwzględnienia utraty ich wartości na skutek używania lub upływu czasu. Grupa dokonuje odpisów amortyzacyjnych środków trwałych w równych ratach, co miesiąc, metodą liniową. Rozpoczęcie amortyzacji środków trwałych następuje od pierwszego miesiąca następującego po miesiącu, w którym środek trwały przyjęto do używania i wprowadzono do ewidencji, do końca miesiąca, w którym następuje zrównanie sumy odpisów amortyzacyjnych z wartością początkową lub w którym postawiono je w stan likwidacji, zbyto lub stwierdzono ich niedobór. Odpisów amortyzacyjnych lub umorzeniowych dokonuje się w drodze systematycznego, planowanego rozłożenia na raty ich wartości początkowej na ustalony okres amortyzacji. Okres lub stawkę i metodę amortyzacji ustala się na dzień przyjęcia środka trwałego do używania. Ustalone okresy użytkowania, metody amortyzacji i wartości końcowe są przez jednostkę weryfikowane corocznie. Odpisy przy zastosowaniu nowej stawki, ustalonej w wyniku weryfikacji, następują od początku następnego roku obrotowego roku, w którym dokonano weryfikacji (prospektywnie). Grupa dokonuje odpisów z uwzględnieniem okresu użyteczności rzeczowych aktywów trwałych, odzwierciedlającą faktyczne ich zużycie, metodą liniową wg następujących stawek:
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - grunty - nie podlegają amortyzacji,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - budynki i lokale oraz spółdzielcze prawo do lokalu użytkowego i spółdzielcze własnościowe prawo do lokalu mieszkalnego - 2,5% - 10%,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - obiekty inżynierii lądowej i wodnej - 2,5% - 10%,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - kotły i maszyny energetyczne - 2,5% - 10%,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - maszyny, urządzenia i aparaty ogólnego zastosowania - 10% - 25%,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - urządzenia techniczne - 10% - 30%,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - środki transportu - 10% - 40%,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - narzędzia, przyrządy, ruchomości i wyposażenie, gdzie indziej niesklasyfikowane - 5% - 30%
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Aktywa utrzymywane na podstawie umowy leasingu amortyzuje się przez okres ich przewidywanego użytkowania ekonomicznego na takich samych zasadach jak aktywa własne. W sytuacji, gdy nie ma wystarczającej pewności, że własność zostanie przeniesiona na koniec okresu leasingu, aktywa są amortyzowane przez okres nieodwołalny umowy.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Wartości niematerialne
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Nabyte aktywa niematerialne, możliwe do zidentyfikowania o określonym okresie ekonomicznej użyteczności, przeznaczone na potrzeby jednostki, nad którymi Grupa sprawuje kontrolę i z których prawdopodobnie osiągnie przyszłe korzyści ekonomiczne. W szczególności są to: programy komputerowe, autorskie prawa majątkowe, prawa pokrewne, licencje, koncesje. Wartości niematerialne są wyceniane według cen nabycia lub kosztów wytworzenia, pomniejszonych o skumulowane odpisy amortyzacyjne a także o odpisy z tytułu trwałej utraty wartości. Odpisów amortyzacyjnych wartości niematerialnych dokonuje się drogą systematycznego, planowanego rozłożenia ich wartości początkowej na ustalony okres amortyzacji. Odpisy amortyzacyjne są dokonywane od pierwszego miesiąca następującego po miesiącu, w którym wartość niematerialna została przyjęta do użytkowania oraz wprowadzona do ewidencji. Grupa stosuje w tym zakresie uproszczenie w stosunku do wytycznych MSR 38 par. 97, które wg osądu Zarządu Grupy nie wywiera istotnego wpływu na sprawozdanie finansowe. Stawkę i metodę amortyzacji ustala się na dzień przyjęcia do używania wartości niematerialnych i prawnych.
    • p (class="pt-000006", id="_Hlk27722685")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Weryfikacja okresu użytkowania, metody amortyzacji oraz wartości końcowej odbywa się na koniec roku obrotowego. Skutki zmian szacunków rozlicza się prospektywnie. W przypadku wystąpienia przesłanki utraty wartości Zarząd podejmuje procedury ustalenia wysokości odpisu aktualizującego wartość aktywów.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Odpisów amortyzacyjnych wartości niematerialnych dokonuje się w równych ratach co miesiąc przy pomocy metody liniowej. Koszty związane z utrzymaniem programów komputerowych, są ujmowane w kosztach okresu, w którym są ponoszone, chyba że dotyczą dłuższego okresu, wówczas rozliczane są proporcjonalnie poprzez rozliczenie międzyokresowe kosztów.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Grupa jako leasingobiorca
    • p (class="pt-000006", id="_Hlk66093593")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zgodnie z MSSF 16 umowa stanowi leasing lub zawiera element leasingu, jeżeli przenosi wszystkie prawa do kontroli wykorzystania zidentyfikowanego składnika aktywów w danym okresie, w zamian za zapłatę. Uznaje się, że kontrola występuje, jeżeli klient ma:
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - prawo do zasadniczo wszystkich korzyści ekonomicznych wynikających z użytkowania zidentyfikowanego składnika aktywów;
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - prawo decydowania o wykorzystaniu tego składnika aktywów.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Standard wprowadza jeden model ujęcia leasingu w księgach rachunkowych leasingobiorcy. Standard nie rozróżnia między leasingiem finansowym a operacyjnym w księgach leasingobiorcy i wymaga ujmowania prawa do użytkowania składnika aktywów i zobowiązania z tytułu leasingu w odniesieniu do wszystkich umów, zawartych przez leasingobiorcę, z wyjątkiem leasingu krótkoterminowego i aktywów o niskiej wartości, które są zwolnione z tego wymogu. Jako leasing krótkoterminowy
    • p (class="pt-000006", id="_Hlk66093581")
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa traktuje umowy zawarte na czas nieokreślony z krótkim terminem wypowiedzenia, tj. do 12 miesięcy, bez istotnych kar dla jednej ze stron umowy. Część umów najmu lokali jest refakturowana na współpracujące filie.
    • p (class="pt-Normalny-000131", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa w sprawozdaniu z sytuacji finansowej prezentuje aktywa z tytułu prawa do użytkowania w ramach tej samej pozycji, w ramach której uwzględnia aktywa będące jej własnością oraz ujawnia w informacji dodatkowej do sprawozdania finansowego które pozycje w sprawozdaniu z sytuacji finansowej obejmują aktywa z tytułu prawa do użytkowania. Zobowiązania z tytułu leasingu są prezentowane w sprawozdaniu finansowym oddzielnie od innych zobowiązań.
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Płatności leasingowe dzielone są na część odsetkową i zmniejszenie zobowiązania z tytułu leasingu. Koszty finansowe odnosi się bezpośrednio do rachunku zysków i strat.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000157"): Grupa jako leasingodawca
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa klasyfikuje leasing jako leasing operacyjny lub leasing finansowy. To czy dany leasing jest finansowy czy operacyjny zależy od treści transakcji a nie od formy umowy. W przypadku leasingu finansowego w dacie rozpoczęcia Grupa ujmuje aktywa oddane w leasing finansowy w sprawozdaniu z sytuacji finansowej i prezentuje jej jako należności w kwocie równej inwestycji leasingowej netto. Ujmowanie dochodów finansowych w okresie leasingu przebiega w sposób odzwierciedlający stałą okresową stopę zwrotu z inwestycji leasingowej netto dokonanej przez Grupę w ramach leasingu finansowego. Grupa ujmuje dochody finansowe przez okres leasingu w systematyczny i racjonalny sposób. Opłaty leasingowe dotyczące danego okresu zmniejszają inwestycję leasingową brutto obniżając zarówno należność główną jak i kwotę niezrealizowanych dochodów. W przypadku leasingu operacyjnego Grupa ujmuje opłaty leasingowe z leasingów operacyjnych jako dochód metodą liniową. W kosztach ujmuje koszty, łącznie z amortyzacją, poniesione w celu uzyskania dochodów z tytułu leasingu.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000158"): Aktywa finansowe
    • p (class="pt-srodtytul-4", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Klasyfikacja i wycena
    • p (class="pt-srodtytul-4-000159", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa klasyfikuje aktywa finansowe w oparciu o model biznesowy, którym kieruje się w zakresie zarządzania grupami aktywów finansowych, aby zrealizować określony cel biznesowy, oraz biorąc pod uwagę charakterystykę wynikających z umowy przepływów środków pieniężnych z tytułu danego składnika aktywów finansowych. W ramach podstawowego modelu biznesowego Grupy aktywa finansowe są utrzymywane w celu uzyskiwania przepływów pieniężnych wynikających z umowy.
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa klasyfikuje aktywa finansowe wg trzech kategorii:
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - wyceniane w wysokości zamortyzowanego kosztu,
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - wyceniane w wartości godziwej przez pozostałe dochody całkowite,
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - wyceniane w wartości godziwej przez wynik finansowy.
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa klasyfikuje do aktywów finansowych:
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): 1) wycenianych w wysokości zamortyzowanego kosztu:
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - należności handlowe i pozostałe należności finansowe;
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - pożyczki udzielone;
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - środki pieniężne;
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): 2) wycenianych w wysokości wartości godziwej przez wynik finansowy:
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - instrumenty pochodne niewyznaczone dla celów rachunkowości zabezpieczeń, dla których zmiany wartości godziwej wynikają ze zmian warunków rynkowych, tj. zmiany kursu walut.
    • p (class="pt-srodtytul-4-000161", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa przeprowadzając proces pomiaru utraty wartości dla aktywów finansowych wycenianych wg zamortyzowanego kosztu określa portfele pod kątem ryzyka kredytowego a następnie lokuje je do odpowiedniego koszyka ekspozycji, który określa ich ryzyko kredytowe. Na każdy dzień kończący okres sprawozdawczy Grupa dokonuje analizy wystąpienia przesłanek skutkujących zaklasyfikowaniem aktywów finansowych do poszczególnych koszyków wyznaczania odpisu z tytułu utraty wartości. Ze względu na dużą liczbę kontrahentów i pojedynczych faktur, dla należności handlowych Grupa stosuje podejście portfelowe natomiast dla pozostałych aktywów finansowych, ze względu na ich ograniczoną ilość w ramach danej kategorii Grupa stosuje podejście indywidualne. W zakresie oceny utraty wartości środków pieniężnych, Grupa lokuje środki w bankach tylko o wysokiej wiarygodności kredytowej, którą weryfikuje na podstawie opublikowanych ratingów. W zakresie utraty wartości należności handlowych Grupa korzysta z uproszczonego podejścia i wycenia odpis na oczekiwane straty kredytowe w kwocie równej oczekiwanym stratom kredytowym w całym okresie życia należności. Należności handlowe Grupy nie zawierają istotnego elementu finansowania w rozumieniu MSSF15.
    • p (class="pt-srodtytul-4-000161", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Kalkulacja oczekiwanych strat kredytowych na należności z tytułu dostaw i usług dokonywana jest w horyzoncie czasu do upływu terminu zapadalności należności. Dla celów oszacowania oczekiwanej straty kredytowej Grupa wykorzystuje matrycę rezerw oszacowaną na podstawie historycznych poziomów spłacalności oraz odzyskanych należności od kontrahentów jak również stosuje podejście indywidualne. Matryca przewiduje podział należności na grupy: należności terminowe, należności przeterminowane 1-30 dni, należności przeterminowane 31-90 dni, należności przeterminowane 91-120 dni, należności przeterminowane 121-180 dni, należności przeterminowane 181-360 dni oraz należności przeterminowane powyżej 360 dni. Oczekiwana strata kredytowa jest kalkulowana w momencie ujęcia należności w sprawozdaniu w sytuacji finansowej oraz jest aktualizowana na każdy kolejny dzień kończący okres sprawozdawczy, w zależności od ilości dni przeterminowania danej należności. Dla należności handlowych Grupa stosuje również indywidualną ocenę oczekiwanych strat kredytowych, tj.: w stosunku do należności od podmiotów powiązanych oraz należności w faktoringu i należności ubezpieczonych. Indywidualne podejście stosuje się również dla zidentyfikowanych należności handlowych, których ryzyko nieściągalności jest znaczne według indywidualnej oceny Zarządu, np. ze względu na likwidację lub upadłość dłużnika.
    • p (class="pt-000006", id="_Hlk34938434")
    • p (class="pt-srodtytul-4-000161", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Aktywa finansowe są spisywane, kiedy Grupa stwierdzi, że wszystkie działania w zakresie ściągnięcia należności zostały wyczerpane i nie można oczekiwać odzyskania należności. Dotyczy to głównie należności przeterminowanych powyżej 360 dni (w przypadku należności od podmiotów niepowiązanych) i ściągalność należności została oceniona jako wątpliwa.
    • p (class="pt-srodtytul-4-000161", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Czynne rozliczenia międzyokresowe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Podstawowym celem czynnych rozliczeń międzyokresowych jest
    • span (class="pt-Pogrubienie"): zachowanie współmierności przychodów i kosztów
    • span (class="pt-Domylnaczcionkaakapitu-000130"): . Grupa dokonuje czynnych rozliczeń międzyokresowych w stosunku do ponoszonych z góry wydatków i kosztów dotyczących przyszłych okresów. Odpisy czynnych rozliczeń międzyokresowych kosztów następują stosownie do upływu czasu. Odpisów czynnych rozliczeń międzyokresowych kosztów dokonuje się w koszty działalności operacyjnej lub w koszty finansowe, w zależności od charakteru aktywowanych kosztów. W sprawozdaniu z sytuacji finansowej rozliczenia międzyokresowe czynne są prezentowane w podziale na długoterminowe i krótkoterminowe (należności i pozostałe należności niefinansowe).
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000158"): Zapasy i aktywo z tytułu prawa do zwrotu towaru
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zapasy wyceniane są według niższej z wartości: kosztu lub wartości możliwej do uzyskania. Koszty zapasów ustalane są metodą FIFO. Wartość netto możliwą do uzyskania stanowi szacunkowa cena sprzedaży zapasów w toku zwykłej działalności gospodarczej pomniejszona o szacowane koszty przygotowania sprzedaży i szacunkowe koszty niezbędne do doprowadzenia sprzedaży do skutku.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wartość skont, rabatów i opustów i innych płatności uzależnionych od wielkości zakupów (z wyjątkiem rabatów marketingowych, gwarancyjnych oraz reklamacyjnych) uwzględniana jest jako zmniejszenie ceny zakupu niezależnie od daty faktycznego ich otrzymania.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wartość zmniejszenia kosztu własnego, oszacowanego tytułem przekazanego wraz ze sprzedażą prawa do zwrotu towaru, Grupa prezentuje w sprawozdaniu z sytuacji finansowej jako osobną pozycję składnika aktywów z tytułu prawa Grupy do odzyskania produktów od klientów po wywiązaniu się ze zobowiązania do zwrotu zapłaty klientowi.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wartość zapasów pomniejszają odpisy aktualizujące (rozwiązanie odpisów odpowiednio powiększa), tworzone w przypadku, gdy możliwa do uzyskania cena sprzedaży jest niższa od ceny zakupu jak również w przypadku, gdy stwierdzono, że towary są niepełnowartościowe lub uszkodzone.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Koszty transportu zakupionych towarów ze względu na niską istotność nie powiększają wartości zapasów, są ujmowane na bieżąco w koszt własny sprzedanych towarów, obciążając wynik finansowy.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Środki pieniężne
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Środki pieniężne i ekwiwalenty obejmują środki pieniężne w kasie, na rachunkach bankowych, środki pieniężne w drodze, depozyty. Wykazana w sprawozdaniu z przepływów środków pieniężnych pozycja Środki pieniężne i ich ekwiwalenty składa się z gotówki w kasie i na rachunkach bankowych, dodatkowe informacje w nocie 25.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Rezerwy, zobowiązania warunkowe i aktywa warunkowe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rezerwy tworzone są w przypadku, kiedy na Grupie ciąży istniejący obowiązek, prawny lub zwyczajowo oczekiwany, wynikający ze zdarzeń przeszłych i gdy prawdopodobne jest, że wypełnienie tego obowiązku spowoduje konieczność wypływu środków uosabiających korzyści ekonomiczne oraz można dokonać wiarygodnego szacunku kwoty tego zobowiązania. Ujmowana kwota rezerwy odzwierciedla możliwie najdokładniejszy szacunek kwoty wymaganej do rozliczenia bieżącego zobowiązania na dzień bilansowy, z uwzględnieniem ryzyka i niepewności związanej z tym zobowiązaniem. W przypadku wyceny rezerwy metodą szacunkowych przepływów pieniężnych koniecznych do rozliczenia bieżącego zobowiązania, jej wartość bilansowa odpowiada wartości bieżącej tych przepływów (w przypadku gdy wpływ pieniądza w czasie jest istotny).
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Jeśli zachodzi prawdopodobieństwo, że część lub całość korzyści ekonomicznych wymaganych do rozliczenia rezerwy będzie można odzyskać od strony trzeciej, należność tę ujmuje się jako składnik aktywów, jeśli prawdopodobieństwo odzyskania tej kwoty jest odpowiednio wysokie i da się ją wiarygodnie wycenić.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Gwarancje
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rezerwy na oczekiwane koszty napraw gwarancyjnych ujmowane są w momencie sprzedaży produktów, zgodnie z najlepszym szacunkiem zarządu co do przyszłych kosztów koniecznych do poniesienia przez Grupę w okresie gwarancji.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Zobowiązania warunkowe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zgodnie z MSR 37 nie ujmuje zobowiązań warunkowych. Informację o zobowiązaniu warunkowym ujawnia się w sprawozdaniu finansowym.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Aktywa warunkowe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zgodnie z MSR 37 nie ujmuje aktywów warunkowych. Informację o aktywach warunkowych ujawnia się w sprawozdaniu finansowym.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000158"): Zobowiązania finansowe
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa klasyfikuje zobowiązania finansowe wg kategorii:
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - wyceniane w wysokości zamortyzowanego kosztu,
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - wyceniane w wartości godziwej przez wynik finansowy.
    • p (class="pt-srodtytul-4-000161", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa jako zobowiązania finansowe wyceniane w zamortyzowanym koszcie klasyfikuje zobowiązania z tytułu dostaw i usług, kredyty oraz pożyczki.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa jako zobowiązania wyceniane w wartości godziwej przez wynik finansowy klasyfikuje instrumenty pochodne niewyznaczone dla celów rachunkowości zabezpieczeń, dla których zmiany wartości godziwej wynikają ze zmian warunków rynkowych tj. kursów wymiany walut.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Zobowiązania kontraktowe oraz z tytułu prawa do zwrotu towaru
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Jako zobowiązania z tytułu prawa do zwrotu towaru Grupa prezentuje wartość zmniejszenia przychodów ze sprzedaży, tytułem oszacowanego, przekazanego wraz ze sprzedażą prawa do zwrotu towaru. Mniej istotną wartość stanowią zobowiązania kontraktowe, wynikające z umów lojalnościowych z klientami.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000158"): Pochodne instrumenty finansowe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa zawiera różnorodne umowy instrumentów pochodnych, za pomocą których zarządza ryzykiem kursowym. Obejmują one kontrakty forward oraz opcje walutowe. Instrumenty pochodne ujmuje się początkowo w wartości nabycia na dzień podpisania stosownych umów, a następnie wycenia do wartości godziwej na koniec każdego okresu sprawozdawczego. Wynikowe zyski lub straty ujmuje się bezpośrednio w wynik.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000158"): Rachunkowość zabezpieczeń
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa nie stosuje rachunkowości zabezpieczeń.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000158"): Inwestycje w instrumenty kapitałowe
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Inwestycje w jednostkach zależnych, jednostkach stowarzyszonych lub we wspólnych przedsięwzięciach są wyłączone z zakresu MSSF 9. Akcje i udziały w jednostkach zależnych i stowarzyszonych wycenia się według ceny nabycia pomniejszonej o odpisy z tytułu trwałej utraty wartości.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W przypadku udziału w zyskach w jednostce zależnej Sp. z o.o. Spółce komandytowej, udziały w zyskach są klasyfikowane zgodnie z uchwałą Walnego Zgromadzenia Wspólników jako należności od jednostek powiązanych z tytułu udziału w zysku lub jako zwiększenie inwestycji w jednostkach powiązanych.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Udziały w jednostkach pozostałych, które nie są notowane na płynnym rynku oraz ze względu na niską istotność Grupa wycenia w cenie nabycia, która w ocenie Zarządu nie odbiega od wartości godziwej.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Zobowiązania z tytułu świadczeń pracowniczych
    • p (class="pt-Normalny-000162", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa ujmuje w sprawozdaniu z sytuacji finansowej zobowiązanie z tytułu wypłaty świadczeń emerytalnych i rentowych w wysokości wartości bieżącej zobowiązania na dzień bilansowy, z uwzględnieniem zysków i strat aktuarialnych.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Do wyznaczania zobowiązań wykorzystuje się metodę wymaganą przez Międzynarodowe Standardy Rachunkowości nr 19, tzw. metodę prognozowanych świadczeń jednostkowych (
    • span (class="pt-Domylnaczcionkaakapitu-000163"): ang. Projected Unit Method
    • span (class="pt-Domylnaczcionkaakapitu-000130"): ), zwaną
    • p (class="pt-000006", id="_Hlk28595287")
    • p (class="pt-Normalny-000162", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): także metodą świadczeń narosłych
    • span (class="pt-Domylnaczcionkaakapitu-000130"): w stosunku do stażu pracy. Istota tej metody polega na postrzeganiu każdego okresu zatrudnienia jako powodującego powstanie dodatkowej jednostki uprawnienia do świadczenia pozapłacowego. W świetle powyższej definicji wartość przyszłych zobowiązań obliczana jest jako nagromadzona część przyszłych świadczeń z uwzględnieniem prognozowanego wzrostu wynagrodzenia stanowiącego podstawę wymiaru przyszłych świadczeń. Przy wyznaczaniu zobowiązań uwzględnia się również prawdopodobieństwa osiągnięcia uprawnień do jednorazowej odprawy emerytalnej lub rentowej. Przez prawdopodobieństwo osiągnięcia uprawnień do jednorazowej odprawy emerytalnej rozumie się prawdopodobieństwo dożycia przez pracownika wieku emerytalnego, pod warunkiem pozostania w stosunku pracy z obecnym pracodawcą. Przez prawdopodobieństwo osiągnięcia uprawnień do jednorazowej odprawy rentowej rozumie się prawdopodobieństwo inwalidztwa pracownika przed osiągnięciem wieku emerytalnego, pod warunkiem pozostania w stosunku pracy z obecnym pracodawcą. Wysokość zobowiązania z tytułu niewykorzystanych urlopów, wyliczana jest jako należne za niewykorzystany urlop wynagrodzenie.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zobowiązania z tytułu świadczeń dla pracowników z tytułu wynagrodzeń, urlopów wypoczynkowych i zwolnień lekarskich są ujmowane w okresie, w którym dane usługi zostały wykonane w wartości niezdyskontowanych spodziewanych świadczeń, jakie mają być wypłacone w zamian za tę pracę.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Ujęte zobowiązania z tytułu innych długoterminowych świadczeń pracowniczych wyceniane są w wartości szacowanych przyszłych wypływów środków pieniężnych, które mają być wykonane przez Grupę w odniesieniu do usług świadczonych przez pracowników do dnia sprawozdawczego.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Kapitał własny
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Kapitał Grupy stanowią:
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - kapitał zakładowy, wyemitowany kapitał akcyjny w wysokości określonej w statucie i zarejestrowanej w Krajowym Rejestrze Sądowym,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - kapitał zapasowy z podziału zysku, tworzony zgodnie z Kodeksem Spółek Handlowych,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - kapitał ze sprzedaży akcji, stanowiący nadwyżkę nad wartością nominalną akcji pomniejszoną o koszty emisji.
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - kapitały powstałe w wyniku wyceny opcji managerskich,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - zyski zatrzymane w skład których wchodzą zyski zatrzymane z lat ubiegłych (jeszcze niepodzielone) oraz bieżący zysk lub strata,
    • p (class="pt-Normalny-000131", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - różnice kursowe z przeliczenia sprawozdań jednostek zależnych.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Podatek dochodowy
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Podatek dochodowy jednostki obejmuje podatek bieżący oraz podatek odroczony.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Bieżące obciążenie podatkowe jest obliczane na podstawie wyniku podatkowego (podstawy opodatkowania) danego okresu sprawozdawczego. Zysk (strata) podatkowa różni się od księgowego zysku (straty) netto w związku z wyłączeniem przychodów przejściowo niepodlegających opodatkowaniu i kosztów przejściowo niestanowiących kosztów uzyskania przychodów oraz pozycji kosztów i przychodów, które nigdy nie będą podlegały rozliczeniu podatkowemu. Obciążenia podatkowe są wyliczane w oparciu o stawki podatkowe obowiązujące w danym roku obrotowym. Wartość składników aktywów z tytułu podatku odroczonego podlega analizie na każdy dzień bilansowy, a w przypadku, gdy spodziewane przyszłe zyski podatkowe nie będą wystarczające dla realizacji składnika aktywów lub jego części, następuje jego odpis. Wycena rezerw z tytułu odroczonego podatku dochodowego i aktywów z tytułu odroczonego podatku dochodowego odzwierciedla skutki podatkowe, które nastąpią odpowiednio do przewidywanego przez Grupę sposobu realizacji lub rozliczenia na dzień bilansowy wartości bilansowych aktywów i zobowiązań. Podatek bieżący i odroczony ujmuje się w wynik, z wyjątkiem przypadków dotyczących pozycji ujmowanych w pozostałych całkowitych dochodach lub bezpośrednio w kapitale własnym. W takiej sytuacji podatek bieżący i odroczony ujmuje się również odpowiednio w pozostałych całkowitych dochodach lub w kapitale własnym. Jeżeli podatek bieżący lub odroczony wynika z początkowego rozliczenia połączenia jednostek gospodarczych, efekt podatkowy uwzględnia się w dalszych rozliczeniach tego połączenia.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Aktywa i zobowiązania z tytułu podatku odroczonego kalkuluje się i ujmuje w księgach oddzielnie, natomiast w sprawozdaniu z sytuacji finansowej dokonuje się ich kompensaty i prezentuje per saldem.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Transakcje w walutach obcych
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Transakcje przeprowadzane w walucie innej niż waluta funkcjonalna wykazuje się po kursie waluty obowiązującym z dnia poprzedzającego dzień transakcji, przy czym kurs ten nie odbiega istotnie od kursu na dzień transakcji. Na koniec okresu sprawozdawczego pozycje pieniężne są przeliczane według średniego kursu danej waluty ogłaszanego przez NBP na ten dzień.
    • p (class="pt-000006", id="_Hlk28598075")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Różnice kursowe powstające na skutek rozliczenia tych transakcji oraz wyceny na dzień sprawozdawczy, po kursie średnim NBP na ten dzień, pieniężnych aktywów i zobowiązań, ujmowane są w zysku lub stracie bieżącego okresu. Różnice kursowe powstające na skutek rozliczenia jak również wyceny: należności handlowych, zobowiązań handlowych oraz z własnych środków pieniężnych są prezentowane w rachunku zysków i strat w pozycji pozostałe zyski i straty netto, pozostałe (z tyt. kredytów, pożyczek, leasingów) w przychodach finansowych oraz kosztach finansowych.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000128"): Przychody ze sprzedaży
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zgodnie z MSSF 15 przychody ujmuje w momencie spełnienia obowiązku świadczenia, tj. w momencie przekazania kontroli nad towarem lub usługą (przekazania możliwości kierowania wykorzystaniem i uzyskiwania praktycznie wszystkich korzyści z tego towaru lub usługi).
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Do przychodów ze sprzedaży Grupa klasyfikuje:
    • p (class="pt-srodtytul-3", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Przychody ze sprzedaży towarów:
    • span (class="pt-Domylnaczcionkaakapitu-000130"): wynikające z podstawowej działalności Grupy,
    • span (class="pt-Domylnaczcionkaakapitu-000147"): ujmowane są w momencie, kiedy towary zostały wydane z magazynu, a wszelkie prawa do tego towaru zostały przekazane.
    • p (class="pt-srodtytul-3", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Umowy zawierane z klientami nie posiadają istotnych składników finansowania a okres ich spłaty najczęściej nie przekracza trzech miesięcy. Grupa udziela klientom dodatkowych rabatów, szacowany koszt tych rabatów uwzględnia jako zmniejszenie wartości przychodów. Grupa udziela klientom prawa do zwrotu towarów co uwzględnia w wysokości wynagrodzenia, które Grupa spodziewa się uzyskać. Grupa na sprzedawane towary udziela klientom gwarancji wymaganej przez prawo, gwarancja nie stanowi oddzielnego obowiązku świadczenia i jest ujmowana jako rezerwa.
    • p (class="pt-srodtytul-3", dir="ltr")
    • p (class="pt-srodtytul-3", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000157"): Przychody ze sprzedaży usług:
    • span (class="pt-Domylnaczcionkaakapitu-000147"): ujmowane są w momencie wykonania usługi. Klient jednocześnie otrzymuje i czerpie korzyści płynące ze świadczenia, w miarę wykonywania przez Grupę tego świadczenia. Obowiązek świadczenia spełniany jest w trakcie wykonania usługi, gdyż usługi są krótkotrwałe.
    • p (class="pt-srodtytul-3", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000157"): Ujawnianie przychodów w podziale na kategorie – segmenty operacyjne
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zarząd Grupy nie wydziela oddzielnych segmentów operacyjnych, gdyż cała działalność Grupy skupia się wokół sprzedaży części zamiennych i akcesoriów do pojazdów samochodowych. Grupa prezentuje przychody z tytułu umów z klientami w podziale na kategorie ze względu na region geograficzny, tj. sprzedaż na rynku krajowym, rynkach UE oraz poza UE.
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Działalność zaniechana
    • span (class="pt-Domylnaczcionkaakapitu-000130"): :
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Nie wystąpiła działalność zaniechana w bieżącym oraz poprzednim okresie sprawozdawczym.
    • p (class="pt-Normalny-000165", dir="ltr")
    • p (class="pt-000006", id="_Toc67549860")
    • h2 (dir="ltr")
    • span: 4. Istotne wartości oparte na profesjonalnym osądzie i szacunkach Zarządu
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Zarząd Grupy zobowiązany jest do dokonywania szacunków, osądów i założeń dotyczących kwot wyceny poszczególnych składników aktywów i zobowiązań. Główne założenia oraz źródła niepewności dotyczące szacunków wymagają od Zarządu Grupy najtrudniejszych, subiektywnych lub złożonych ocen. Wzrost liczby zmiennych i założeń wpływających na prawdopodobny przyszły wynik szacunków dotyczących niepewności powoduje, że oceny te są bardziej subiektywne i złożone, co powoduje równocześnie wzrost ryzyka wystąpienia istotnej korekty dotyczącej wartości bilansowej aktywów i zobowiązań. Szacunki i związane z nimi założenia opierają się o doświadczenia historyczne i inne czynniki uznane za istotne. Rzeczywiste wyniki mogą odbiegać od przyjętych wartości szacunkowych. Szacunki i związane z nimi założenia podlegają bieżącej weryfikacji. Zmiana szacunków księgowych jest rozpoznawana w okresie, w którym zostały one zmienione, jeśli dotyczy to wyłącznie tego okresu, lub w okresie bieżącym i przyszłym, jeśli zmiany dotyczą zarówno okresu bieżącego jak i przyszłego. Przyjmując założenia, dokonując szacunków i osądów Zarząd Grupy może kierować się własnym doświadczeniem i wiedzą, a także opiniami, analizami i rekomendacjami niezależnych ekspertów.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000157"): Podatek odroczony
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa identyfikuje składnik aktywów tytułem podatku odroczonego przy założeniu, że w przyszłości zostanie osiągnięty zysk podatkowy, który pozwoli na jego wykorzystanie. Zarząd Grupy weryfikuje przyjęte szacunki dotyczące prawdopodobieństwa podatkowego odzyskania aktywów z tytułu odroczonego podatku dochodowego w oparciu o zmianę czynników wziętych pod uwagę przy tworzeniu aktywa, nowe okoliczności oraz doświadczenia z przeszłości. Informacje dotyczące aktywów z tytułu podatku odroczonego przedstawione zostały informacjach objaśniających.
    • p (class="pt-Normalny-000166", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000157"): Amortyzacja
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000167"): Wysokość stawek amortyzacyjnych ustalana jest na podstawie przewidywanego okresu ekonomicznej użyteczności składników rzeczowego majątku trwałego oraz aktywów niematerialnych. Grupa corocznie dokonuje weryfikacji przyjętych okresów ich ekonomicznej użyteczności.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Wycena w wartości godziwej i procedury związane z wyceną
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Niektóre aktywa i pasywa Grupy wyceniane są w wartości godziwej dla celów sprawozdawczości finansowej. Zarząd dokonuje ustalenia odpowiednich technik wyceny i stosowania danych wsadowych do wyceny wartości godziwej. W wycenie wartości godziwej aktywów lub zobowiązań, Grupa wykorzystuje dane rynkowe obserwowalne w zakresie w jakim jest to możliwe.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Szacunek oczekiwanych kosztów napraw gwarancyjnych
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Zgodnie z obowiązującymi przepisami Grupa udziela gwarancji na sprzedawane towary na okres 2 lat. W przypadku wykrycia wad w sprzedanych towarach w tym okresie na Grupie ciąży obowiązek wymiany towaru na nowy bądź zwrot gotówki wraz z pokryciem dodatkowych kosztów powstałych na skutek użytkowania wadliwego towaru. Równocześnie część dostawców udziela Grupie gwarancji jakości na nabywane towary co powoduje, że ewentualne koszty dotyczące reklamacji tych towarów przenoszone są na dostawcę. W celu przyporządkowania kosztu napraw gwarancyjnych do okresu, w którym nastąpiła sprzedaż Grupa dokonuje szacunku przyszłych kosztów z tyt. napraw gwarancyjnych w oparciu o wielkość sprzedaży w danym okresie oraz wskaźnik wadliwości sprzedawanych towarów. Wskaźnik wadliwości sprzedawanych towarów ustalany jest przez Grupę w oparciu o przeprowadzoną analizę wadliwości sprzedawanych towarów na podstawie posiadanych danych o uznanych reklamacjach w trakcie ostatnich 3 lat oraz poniesionych rzeczywistych kosztów napraw gwarancyjnych w tym okresie, przy uwzględnieniu otrzymanych gwarancji od dostawców.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Szacunek wartości dokonanych zwrotów przez klientów zgodnie z udzielonym prawem do zwrotu
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Klienci Grupy otrzymują prawo do dobrowolnego dokonania zwrotu nabytego towaru pod warunkiem, że towar ten nie nosi śladów użytkowania, klient w tym przypadku może dokonać zwrotu towaru do 14 dni od daty zakupu. W zakresie zwrotów towaru tytułem reklamacji Grupa zobowiązana jest do stosowania przepisów Kodeksu Cywilnego, który reguluje te kwestie.
    • span (class="pt-Domylnaczcionkaakapitu-000147"): W ocenie Zarządu Grupy zdecydowana większość zwrotów realizowana jest w trakcie 3 miesięcy od daty sprzedaży. Grupa szacuje wartość przyszłych korekt sprzedaży z tyt. zwrotów towarów przez klientów na podstawie danych historycznych w zakresie realizacji zwrotów oraz zrealizowanego w bieżącym okresie obrotu.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Szacunek wartości otrzymanych rabatów z tytułu obrotu od dostawców
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa otrzymuje rabaty na wartość nabytych towarów, których wielkość uzależniona jest od rocznego obrotu z danym dostawcą (w tym również z tytułu udziału w grupie zakupowej).
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Wysokość rabatu ustalana jest już po zakończeniu okresu sprawozdawczego w związku z powyższym Grupa dokonuje bieżącej kalkulacji wartości narzutu poprzez indywidualne odniesienie dla każdego kontrahenta wartości otrzymanych bonusów obrotowych do zrealizowanego w okresie obrotu oraz posiadanego zapasu od danego kontrahenta uwzględniając przy tym wiekowanie tego zapasu. Tak oszacowane rabaty rozkładane są proporcjonalnie na wartość sprzedanych towarów oraz na wartość zapasu.
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Szacunek wartości przychodów i rabatów z tytułu działań marketingowych
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa otrzymuje należności oraz rabaty z tyt. działań marketingowych, których wielkość uzależniona jest od rocznego obrotu z danym dostawcą oraz innych umownych ustaleń z dostawcą.
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Wysokość należności oraz rabatu ustalana jest już po zakończeniu okresu sprawozdawczego w związku z powyższym Grupa szacuje wysokość otrzymanych należności i rabatów w oparciu o wysokość obrotu z danym dostawcą oraz zawarte w umowie wielkości należnych rabatów. Tak oszacowane wartości pomniejszają wartość kosztów sprzedaży i marketingu.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Szacunek wartości odzyskiwalnej posiadanych towarów
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa udziela swoim klientom rabaty od cen sprzedaży uzależnione od wielkości obrotu i innych czynników marketingowych. Powoduje to znaczące zróżnicowanie w wielkości udzielonych rabatów poszczególnym klientom oraz możliwość wystąpienia sprzedaży poniżej ceny zakupu. W związku z powyższym Grupa na koniec każdego okresu sprawozdawczego szacuje wartość ujemnych marż, jakie zostaną poniesione w przyszłości i tworzy odpis aktualizujący na zapas, co zapewnia wycenę zapasu w wartości możliwej do odzyskania. Wartość tworzonego odpisu ustalana jest w oparciu o średnią wartość ujemnych marż uzyskaną ze sprzedaży w trakcie poprzednich 36 miesięcy od dnia bilansowego.
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Prawdopodobieństwo osiągnięcia umownego obrotu zgodnie z zawartymi umowami z klientami
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): Grupa zawiera umowy wsparcia, umowy rabatowe z wybranymi klientami. W ramach zawartych umów Grupa zobowiązuje się do udzielenia określonego wsparcia lub rabatu w przypadku zrealizowania przez kontrahenta ustalonego obrotu. Grupa ujmuje w wyniku wartość wsparcia lub udzielonego rabatu zgodnie z zrealizowanym przez kontrahenta obrotem oraz prawdopodobieństwem osiągnięcia obrotu umownego. Prawdopodobieństwo to szacowane jest w oparciu o dane historyczne w zakresie skuteczności zawieranych umów wsparcia. Tak oszacowane wartości pomniejszają wartość przychodów ze sprzedaży.
    • p (class="pt-Normalny-000164", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Szacunek wysokości odpisu aktualizującego należności
    • p (class="pt-srodtytul-4-000160", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Kalkulacja oczekiwanych strat kredytowych na należności z tytułu dostaw i usług dokonywana jest w horyzoncie czasu do upływu terminu zapadalności należności. Dla celów oszacowania oczekiwanej straty kredytowej Grupa wykorzystuje matrycę rezerw oszacowaną na podstawie historycznych poziomów spłacalności oraz odzyskanych należności od kontrahentów jak również stosuje podejście indywidualne. Matryca przewiduje podział należności na grupy: należności terminowe, należności przeterminowane 1-30 dni, należności przeterminowane 31-90 dni, należności przeterminowane 91-120 dni, należności przeterminowane 121-180 dni, należności przeterminowane 181-360 dni oraz należności przeterminowane powyżej 360 dni. Oczekiwana strata kredytowa jest kalkulowana w momencie ujęcia należności w sprawozdaniu w sytuacji finansowej oraz jest aktualizowana na każdy kolejny dzień kończący okres sprawozdawczy, w zależności od ilości dni przeterminowania danej należności. Dla należności handlowych Grupa stosuje również indywidualną ocenę oczekiwanych strat kredytowych. Dotyczy to zidentyfikowanych należności handlowych, których ryzyko nieściągalności jest znaczne według indywidualnej oceny Zarządu, np. ze względu na likwidację lub upadłość dłużnika.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-000006", id="_Toc67549861")
    • h2 (dir="ltr")
    • span: 5. Przychody ze sprzedaży
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Podstawowym przedmiotem działalności Grupy jest sprzedaż części zamiennych i akcesoriów do pojazdów samochodowych, w związku z powyższym Zarząd dla celów zarządzania działalnością Grupy nie wydziela oddzielnych segmentów sprawozdawczych.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa nie posiada kluczowych odbiorców, sprzedaż do żadnego z klientów Grupy nie przekracza 10% całości sprzedaży.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-000006", id="_Toc67549862")
    • h2 (dir="ltr")
    • span: 6. Koszty według rodzaju
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549863")
    • h2 (dir="ltr")
    • span: 7. Pozostałe zyski/straty netto
    • p (class="pt-Normalny", dir="ltr")
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    • span: 8. Przychody finansowe
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")
    • p (class="pt-Normalny-000168", dir="ltr")
    • p (class="pt-000006", id="_Toc67549865")
    • h2 (dir="ltr")
    • span: 9. Koszty finansowe
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-000006", id="_Toc67549866")
    • h2 (dir="ltr")
    • span: 10. Podatek dochodowy
    • p (class="pt-Normalny-000124", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa podlega przepisom ogólnym w zakresie podatku dochodowego. Grupa nie jest częścią podatkowej grupy kapitałowej, jak również nie prowadzi działalności w specjalnej strefie ekonomicznej, co różnicowałoby zasady określania obciążeń podatkowych w stosunku do przepisów ogólnych. Rok podatkowy oraz bilansowy Grupy pokrywają się z rokiem kalendarzowym. Część bieżąca oraz odroczona podatku dochodowego ustalona została według stawki równej 19% dla podstawy opodatkowania podatkiem dochodowym od osób prawnych.
    • p (class="pt-Normalny-000169", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 10.1. Podatek dochodowy odniesiony na wynik finansowy
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne-000170")
      • img (alt="image", 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1OUEc87SbDcHjlBjgwKLapM8JTC5MmmpFKpiOfFTlRJ1UkfFvtcYA7IEmaq6W6dhuGpuUD342wNa5LdLc/bGawtTu9K0cq2V9vAlIkStcctY5UzuzVltKF3Nf0QnokDpsD2y2WqkTqvcwwA4Hj0HcW9/ah7jLrFEO8uk6ppazn3PMW7I6ob10SZ07qD9gYSDCysaSeU3h81Qby/OtugtbCcbOf45rbbWDhcFfVyNwEAOIvs7e4U0Z10Y3bPe9w4GROZHYlPcPjfV19o/AdZ5rnxUNXFefUtuf0TBQCAc6i6urRz2l/y5v3bqfGbxOxIxgSxPgYAACge1scAAADFQzwGAAAoHuIxAABA8RCPAQAAiod4DAAAUDzEYwAAgOINj8eD1sLFTUAwaDWO+ZrKyZr28QHAxUCBYrxxIiNdfzHGPjuSMUE3Hqs8B4xPT6Pg135HXpEy5vHReXN0dxoXZQh+4+qifbUHjTHrH8iQQ+NFV8CeiJNurkZfPTLG8dxWV1P1PykAOC38An+Z9IbuUUFuJ7qL2Kiiqhj6nm4qycZFpT+OGT47RYzfBii/ZmTKGRP018fm5ZochIelnvLRWE4pVJ5ez6NUt7xPIrSb9Q61IYfGq7SyZ08USc+pjHE8I7oq7rcDANPCBKxYDv8gOT/dxsSueK2zyl1nK+kbzvQE5KGzUzhJUN0eSdeMTTk+wazn1RTRZQp9ivE2uvsfDbh8odX1ku1LdIR4bZyPCKqe+USkUzGaAtXGjMG968uT0uF0hyY40IZpTxs2aNitAFcVA+YK6Z7tPnXnHFS9UYk9gRK2ExWcE5lSU9Lo+g3C5nrFaY5Ez0tHVbntQdY0F4A27Ml5IzyXYLsSTC11Gue3Y4dgBrvb7snUYhmdA8A5wC8WlomKYjn8s5Pzdzd0etpuKo0ei6brL8DQ2Ukyg96i2iOZNe2UMybox2OdrLjRpYgu80/srfRNDv+OE9FNnvyql2zfWuIMl/R5QJ6UX9ep1t4qASH/DlS36oMErcYE3caMwfTsJOcPOpRJhEW/XlZ/Xc4BYmgmYTFgOlPQs/h0Qx9sKpvy3dQqK0dH9WvYGYkB237c60b8K2NKtqreiTKbi38h8kTyuqTOa+S+RNlD9fjn9X876d/doHWY1Cvif2T5OgeAM2nog9RIcn6JlpQ6CFPM1pHHfmYPs+UWY/RjYr7B5XrXtjNlEp1g/Hm1e1t3LpZeyJKRefLVHNRJqRNnUqpE7VlqkWUT9ac4Jw07VNEmzOqvopAXjvVyzln96e4iPRO+5qlMEem0035D3o1cN6IqOb8Ot5k+UWZzEQnXDviQHH3qvEZkIhmXaMi5XKnz+lK/u9LKivq8mLNzADh/Ysn5GX+419l66FaoI4+7Sjkbuo31uXw5hNwpZ8l6Xm05F8s83BdrxOF58tWTCbobc9Jl6kQ/qrAlOhwpsUT9PuekYYci2kSz+ldXN/d3G94jEb2c89aTUqxn/npDptAewmnIaDdy3Yh/ZXz2RJnNBTF+9aAhdV4jNpH4JRp+Lpd7XteQ313+zgHg7MnO4U/of/76MaK70uQHt+4d1YkFdhER3h8LMHR2pLq1nSyr1UZ7WERMT5lEJqhulEw/NyZ8B1VPI717rCkQG3yAN1QFeZBRAREtdKntRN+dTQlVNd0pqTrqJKaW2hdVbWU5A1PJFqd3Q7pzId2zt29r6i2vxNRzd51LQ2WpK2ObOw24g7B5py46NgfkadIFtkO/Pyl+iWxNO1Riu2KmUuq8XMXpQB9Vo83sHADOAxMpnAhi/6du/+fvFtk7ErN1TLnptGjDZ2c5A47UDKYcn+Dp5FscFJVMOgONZznZnobF2e1cmemZBQCAdgo5/KcohJzC7Eh8gqOfV58DeR7cTzv69ZWbZ34WAHDujD+Hf+6/kZqA8c+OZEzwdNbHAAAAcBwXYn0MAAAw5RCPAQAAiod4DAAAUDzEYwAAgOIhHgMAABQP8RgAAKB4iMcAAADFc+OxSSBv0vEd08BPzzd+NLAcJzj2MPJ1S47Xc+5uJ2Dsv5qww2P8qzH/0gAAQImsj0Vu6LG8HmySAWmagt8ZM6ZLV91CuggAgBNLx+N+a2F9rq/fqkmLIJEoj8g7NhXo5PnuUX+1w+ULre6IfPWS6dAeCU5qG+uEfeneqIlzLkUOQ+T1t/04x8Nuh51aF/BJ3P2Ro01XMIOgDTN6sWFrhldCz0Tt6XMxr5kdr+ojLV2BWuf7NdnZ6XPvr6sTm57UEW9EfoEo6u62e03xBrqgJgDAReXH416z5uaE4nds6mwbNsdemLffzTN/2FooH6zRSqk6NF+9y8/PH57U5tvXeTPSvfm58ZkZRvaCLex22Kl1zyolR0dm9h892qCCSsfM9Spy9P0D8V7q4Hrya7dFV/3NSp1+K+G5BJq8Sh+yvVIadp2F4ZduZHOP/4szRkzkytXDpF4RyS+DmgAAF5YfjyubfSer8SCamV8X0dFInvl2s9mzaf8dauWl89U7VIclmRA5PCmVqD0ruzcpcxhW2G301E6JS6XZHjnaw/AayoA8OEyW1pY4klFg5nBMDVPXs3RlKREl5eY8zSU8l8WBTSbFHnVlRlQY2dyhRqN+ccaoiZRWVhZFcaQmAIC6DbmPAc+XrAkG3x9XtzrzzWURkelGGyS0t+J55mmh5UR0Y0i++lR+/vCk6fv98N6kjGG4wm6jpx6ai3r0aGcj15AC8v7uxk4yW6U4dbAhwzE3TF1PWlbOy9W4WLuG59L4G3/5VGPklRleYfSFdanRpAYzeiJGWBMAQD+n824X50nmBGWx4CWQF89l7W3ZHlEPbIlz05aF+qhuryo4m8zeggmVp/LzO1V1TVNCVc0JlFQddS5Tyzu3bq6E5aYkcmouoD3Vgdka1kR0G1bgK61mywdNsa2pLoVToE/v7ipeabqJRuXxPm0RH89qbg84vwIiy0zPcsPtJX5S71+aotoCAFxQRedbHExP2umpY/Ng01VaTrbP7Ary3EwEAOD0RP57J5gS1cV59e1qWX87fDadm4kAAJyeotfHAAAAgPUxAADANJhRPwEAAKAI8kE1nlcDAAAUD8+rAQAAiod4DAAAUDzEYwAAgOIhHgMAQG7dE+bHz4/zvhX17urTnx3JmqATj/UrrtnpD2gEHu/xB8FTyP415u9zeD8pJxsqAMAZ1N1tV5aulPi+p8h7pVNAnFtiUNPGGlNL1tE33dKVpUrbprCbJDU72vKH5E3PDQ5heTjfoCRrgqn1sXytcKfeUyklpo6YmHs1AABgUihgidRu/UTkSuV38cvIIhK/MvFWeicXXX92TRdzTbqH19rqdfXy1blUUt5JzKvsCcerXhEpWPXswiEx/ZL99Aue/fLgykRKMiY49Hm1s2KmzzE2xvOHGueYDI9OwczCgq7qhE63QqSNKDHnMAn/vDF0W8tc3q7Jz1XBGBTRS+qTF7FJBIPzOiW6J07R7xTkGGpQh/dFXd4Q41GNbJdyCwDgLOCAJVLZVldELFWZZx3djWZP5jdXqlUZpg7oRjk/m1zd8Q/LSL63Nq/2hNLsfCqn7ESY2UWGlFt4ZSLXKmOCIqwLHLy1MLmPKuFKtGlLeEt8OlBH1KcjLjIbkqngdqKOByW8JSsrqsBpY6vwlijjbup1cx7BttANnD6c8zpN7FCHNxnVrRxPR/ywBYyrqYMAAGdF6rYl7mjubUzcBvle5xBlzNwnDds01bG+rU6WPwhvzx13MGHFLQ+uTKokOsHI82puJQO3XgI6i9Vau7K5vVLijzoylbyXud48oxAJcfkTQIqsoD4mcCcqc25YogVjMDLG0G63/YclQZ/x86aZLvhaxJuM6lb83D/sHu5XNjfrvZ2rLf701aEL3N7tmk9iAABnULcxwwGh7zy+HdDqN6nLbOyGepLN34OWG1epQMYhjkjD88tPE/04nkdN929VmlEeXpnItYqIPK+urqqO+bmDiObqE4CJxjLQyGvKhp/CJcYrfmUU7rgTFfiDEh0h02NwZIyh3qGq7Zp5EBz2Oey8yWAQ+/cxrEl2t/JLgmat2ZufvTJX6e3s7HMIri5SQK7VEI4B4KyilZIIMF721OBZdWjWPKjVd84oPsj30KmTNWpbHl6Z2LWKT1CFM8LrYhXf1KZYXyu8wlObYs3tHJONuMBEzlSR4PdmzqOoerqEc92LSulWKi6nj/knFJXMmYM+3Yap88oC3Y/TUXaTYd2q4fKe3dIVdR0AgLOB72POjViRN0BRJjcdbk1x0Baoul5f8rbIRUFPp8+cNhiSW+DeucNyr6noLSxxzuSZ4PurecGedI6xmD6/6ONSuTmPawEAZwzfvHaW/GXx+BUVLSYzOxKf4NC/r4bTIZ5n42E1AJw5pZU1/luYU/3ad9Bab4947H1KJjE7kjVB5HcCAAAoHtbHAAAAxZtRPwEAAKAI8kE1nlcDAAAUD8+rAQAAiod4DAAAUDzEYwAAgOIhHgMAABQvbzy+ceOln3nPz7x044baBwAAgPGx8fjjjy4/+fSh3Gh/6gnaeOJTbblx69bNj9Yf/tjvf+yVd91FdUzNw6efXH704y88d+2N99wjkjDNfPDDH5bbVE4VKIr/5Ft/+NpzL9A2AAAAZLHx+F2L7//E7hMUQQ++dPQnj3/25q1bL/zlXz30ttfToTvuuPTh9mOPvPuRF69ff/ubZ2VNKn9i9xPvX3wXbTz8862jo6Pr11/87v/3XU89/zxtfHvvGVpM33nnK/7zU7/3wL2X+QQAAACQwcbjy6UHKYhee7b/gz/6vtckzz4zOPjyX91173ferQ47ZM0vv/DlZ3rf/mApEmsvXXrZ9/7Aq9UOAAAAjGLjMa1lF2qXd37jP73mvgfe9tCbPrPbedVbHrx0xx3qsINqPvyBN/3mr//mmz7w8CvuvFOVAgAAwEl5f8/1lne+87d/+zla8r7+bQ99evvT8mG1REvel99zKL8/pt2wQhS+PwYAAMjjhO/LfOG5a7/40Z1f3fyX0QU0AAAAHIu3Ps7vC599/E0PvQ3BGAAAYCyQTwIAAKB4J1wfAwAAwBghHgMAABQP8RgAAKB4iMcAAADFQzwGAAAoHuIxAABA8RCPAQAAiod4DAAAUDwnHncbMocxW2gNkmTQWlBbMeJoo6v2ThOfKXMYmXg62cPL3+fwflJONlQAALjwUuvjymb/6Ki/Wek1N7pJaWXv6GhvpaSOpYijW1W1V4TJfSIAAAA4XVnPqytzZXdp6KydRYEIhQKtBp2DYm1o9xtdJ2a6C02nSeQUqXOUmz2u4FVZaHVby1zerqVPak4iiF7MkjXsMzyvU6J7opO4BTmG6tdp0I6oyKViMNxiodFIXRzRjz4pAABcJEdGp66KWL2jSniDFsxy5Sy2xCHGh2WxJKt1TGVJd6J/mkJZSW1xW3U4KLGnV1SB08ZW4S1RJs5XN+cRbAvdwOnDOa/TxA51eJPh3VbkLm/L3nhLFXA1/ZPayVYAAHCxxJ5Xc1Ro18yaMkn6B72k1yzTSs+u/2hFV2tXNrdXSmZ1KA8eUmVXdbGetHe73d12Ul90H2/Pz/KT8PIchSp5CrEmj5Vo/olc0RHSurbd1ucRwj7j500zXfQO+hlNhnc7P19J9g+7h/uVzc16b+dqS12N9MUprewV+hUAAAAUJPvvq50wxiFFRmomAoaNxkl3o9kTizqxKExmqTKHLTIYcEgXMadWS4djjkNU5epOj0/Fp5CtwhIdIVMnckVGyOod8dHCPAEO+xx2XjX+tGFNsrpdXF2q9Jq1Zm9+9spcpbezs6+uRuri0CcOPK4GALiQVAgj8mGqIuKeforqHRNhz9mvd/QOP5XVz2Il9exVFqgdwWmv46jXpVdJ9xu0UnE5fUx2yAXckahkzh306TZMnVcW6H6cjrKbZHcrx8qbdkuQFeWuP1YAALg4xpj/mNZ25YO12J9c85HmfMc51G3M1BK34OIKLw4AAFw82c+rj42f1XpfO2vikW3qYTUouDgAAEDGuD4GAACAExrj+hgAAABOCPEYAACgeIjHAAAAxUM8BgAAKB7iMQAAQPEQjwEAAIqHeAwAALlN4K2+3UbkRRaTMZl3FmdM0I3HTorAwi5GbjmvWliNZjlkdsOPAgBcbIOrO/OLVb61htHCxJDwLioOiZuxbSnvzXafibLq4vzO1ULuw2p2vMXDSs/DzsKRqhm9MsRtmzFBf30sX71M1g7K4QVVqNf0eM6S6tbRHqfBiBt+FADgQtMBq7SyJ2JFfzNpbsiA0G3wW5CF9F100FpPOPstby3vLIk409/cX+coo3sSL/BX7yosKiCbcNxtLCfbThYCwc7CEdSMXBmSahufYMbz6urqZiJrO59dOArTbq0t8vPTno3Makt8ABBoz/uUYI/IOO/VDPoRqD2RNdLDMLice6SfkS6E/XXVVJ7Z1rR9miN2f+iAw7ZOgSxy9v3hAACcVRSwEi+3LFGpZbu7+5ur0Tf/Ugw+WNtaVHs6d2Bpdl5l0lO6G021NuUUeSoCTZSdXXUrWJilZqFFakr9g555E3LYNjrBrO+P9aXqbqjPMkdHnYQ+zFDop08CnIJoS2TvFUkT6RfR5hPz70NVpqPiUwJ94BFpGWndKdBHBh6EXzPdj7W0LWukhyGPHsoMFqMWtKITfWbL9tmRn1TyDzhsy79HUYE/4a2tlOIDBgA4yyjIqHAqUQxNlq5wweBwX+agZ2qZIvHd0ARqCi28nmO0tHPQAtKJ50Gwnoj07FzeLIaTq7eanU6kbXSCWfGYri1/6KEfzvCC5iqQqjDqVxZ4GCJJsl5flpucIDhd0+/H0pXiw2g3m/bzRzbVMj196lP/63H+WeQbcNi2dGUpESVl8QkvPmAAgPNj0FqoJR21IKI7rP7C01v8dBvrc/KeKumlDi1V6mplzXhJIwP7VErPYig1Rf21b/62GfFYf+ihS7x/KK8rhRjn4inV1c393YZ6TOFUlvjrBFor0hY/O7cZfsOaXj+h+DBold5JYgmlfKplevzOvx7zbUfeAYdt+WsH9c0Jr5/jAwYAONPKcxV9a+s20gl2nZWHXY9Ut7aTZbV28RIA0vrL1uJn1fLeaxRw33Rml5I5iyGoN/Ezq21kgjKGCM5X0jbayHjklqkSlTaf90xtU5lLvJZ6p0K4tldTNzX9CFRiU/N7nakCcZQP8IapQCewzbiYyCOyWDd0mqhDdn/0gNNt3QK/fmpWAABnl/q+0g0X4U0wetNTLU1DpxK1TDXRp5kwc1p3et5AgoEFNZ2C1BTctkE/zI3HJxJeyGGyax+vn4nJO6xOXVeb0okAAIyBvdedIrqNhtFqEiYyOxKfYNb3x3kd86F//6DXay5H1vrT+uVB5oBTqovz6gvlsv4CGgDg3KmuLu3Y/4zndBzjb6fGbBKzIxkTnKGYrDYBAACgILe7PgYAAIDbh3gMAABQPMRjAACA4iEeAwAAFA/xGAAAoHiIxwAAAMVDPAYAgNM3yJ3qPyNd/3TJP51QxgTdeGxTCvrZOc49mnjGdaUj0UuR9Zu4nd8QAMD5xS/552Q76Vy1kZKi0h8fh5oOb/H4vUCRKrET1IUZE/TXx+ZNYToxRUx29Dp/qlsjsznmc5EuGgBAmo5fYbr+SAL/6Q/IJhx3G8vJtvsS60iJfZO1jifxCWY8r66u6oRZTmTngEK7IkeF2LNBRm3RD4X2bEsK7faIjPNezaAfgdoTWUl9OEgNJlbHlDS63gD84XBbOwaVM9Ht3vZvR6aoAp3D0w7YZavT2agXe9EAAC4cfiWyl8/ITdcvuSXRdP1TxE6nupVes4UlEdEJZn1/XFLZgvk1m2rNLPLq0ycZlZdiq0ohXqQtploycbGftD9/ev90P9bSNlfR2TTTg4nVMSVbVW8Atm1HfS6xY3A+yahPMR01IMMfMMuqKXnzTdyLBgBw4Tip/uVqxUnXHynREWhaOdMZjSaj1296NRifYFY8Vll76cewvPoqkKow6lcWOArK7ApqwRhN75/qx1KV1Mjjg/HrOCWCHgC17amED2o1TCXiZ5ROXKlFpqaka2refAEAQEql64+WnC96fUarQf1EPiojHnc3miLdEkW5oXn1q6ub+7sNWjvyxxqnspQ3vX+qH0tVUqeOD8av47MDoLY2jZZ4mEAl4ceTLMGAR0jNFwDgQgtT/YdrGb8kvKFPkXA6efhhKjJBEaAk57GtjV02oOgyVaKe1/KeqW0qc4nXUu9kpPdP9SNQCZG1nJNJqmpYh0pU5VRtuxf0Rl2IIttWb3klqrIafqqmZPZMdduAt52qAAAXh/rOLvr1oNp37pC69tQyA3RGn1GSjgZCdIK3nW9x0FpYTrbz/hFydu3wCJVszO4N/8Y1Tx0AAChat7FwuJozVJyBO/txphOKTzDr++O8+K/M+MF2Tpnp/Y/ZDwAAnCXHSPXPf/cTSdc/VY4xnVDGBG97fQwAAAC37XbXxwAAAHD7sD4GADjbZmZm1BacTTIQIx4DAAAUD8+rAQAAiod4DAAAUDzEYwAAgOIhHgMAQG6D08/ynpGufxImMDuSMUHEYwAAyEsl/qW4JVLmOCmLOMyEZU5NURxraNqpUFhc+mM1O97icaajphioF6+j14F4NW2l4RNEPAYAgJx0wBLpbEl/M9Epizh/j3olc+o9kvpNzVwcNrTtOklNBqyiArIJx93GcrLtvoiacZ6geqosch2IV3PQWlbZfvub+ypRcHyCiMcAAJAPv9k4nZZI5SniJPHHeMll/6An0+sODvd1nl2bNSmarv/U2dlVt4JXU1NYPVjbWlR7ESZfU1gzTAscnSDiMQAA5JPOw69T84qwqnPM+89uKQj52fjl0+majt7UJf/wHSsf7tikZ+ca/k5tex3Cms4FUNn3SXSCiMcAAHACg9ZCLemohSQFGJ1NsL/prf3S2fjV/tpBWcTnMA/yFOo21ue2s5I5edchUtNcgKNOfWhWZ8RjAADIx8nD322UD9aO3JSBzoIvtsz0s/GbOMzLx135zau3Ph0auU6HM7uU6tZ2sqxWuO2a96dbqeswpGbS3W07FyYyQRW2AQAARtB59L2/dZJ/r2Xz7tu0+26pLHYa6j/zslVMiv5ouv7TZ07rTs8bSHpgbsWsmqaOc13S/Qh4fzUAAOR1e3n4cxpE0/VPwERmR+ITxPNqAADI67by8Oc0/G+nTtMkZkcyJoj1MQAAQPGwPgYAACge1scAAGfbzMyM2oKzSQZixGMAAIDi4Xk1AABA8RCPAQAAiod4DAAAUDzEYwAAgOL58dhkhSb+ezf5dSJBbuZpdLJx8sS9JNOe/H0O78d1Vq4nAABMhBOPKULU2vr9mp16r1nOF1nOBo5/OUMlAADApNl4PLi600vqa+rFndXVzUrS3u2KMMbKTZWjkpaACwtcyMHNXVDLYGdLaN+0FkvBoLJbYKrbbuRWWC1VJEqi49QWWt3WMpe3a3JN6hzTJxFEL2bVGvYZntcp0T3pTJfRoebok/dFU94Qg+FGC41G6uKIrvRJAQDgjBOrYcYpNpzsEyLjRn1T/H/OQmEOi1QVMjGFrCM2uZQOpzoRnEN+ZfPT75zr6J+Cqaa34ueVJcEIVIHTxlbhLVEmzlc35xFsC93A6cM5r9PEDjWjiTCiTzmYjqqfKuCa+ic1lQ0BAODM878/dtJXSgcHvViSxvqieBN23x5VqSy5xNdt8EPw7ZVSWFkw2SDFuauLdV6Vd3fb+hyKrOacJTxvapx6JWoXohpX7jXL6WPtdtvL2hn2GT9vmjejsMnIPsXP/cPu4X5lc7Pe27naUlcjfXFKK0XkPwEAgNNg43HpylIlaa+rh7XdDQpV9cVVCg0ySMciDwcOeVQ87KZAZEuSwUA8GFbROFaZa6WJmFOrpcMxx6HYWcISPU6egFg9igWohyuLRaxgQlq9Q1XbNfMEOOxz2HnlfAOpJpXK6D7Fb6LXrDV787NX5iq9nZ19dTVSF4c+ceBxNQDAeaGikuCFLhWx5FNT2qVIIor001JBHyWqzJZQgX84qGy6ch7aqlpqR3DapUdFvGapcWpcoCaXPiY75ALuyB1IpE+3Yeq8skD343SUapKnTzVW3rNbgqwrd/2xAgDAmTZ976+mVV+5Od+x61b+86Va4hZcXOHFAQCAc8H//ngKiKe2qYfVoODiAACcV8jvBAAAULypWx8DAABcQIjHAAAAxUM8BgAAKB7iMQAAQPEQjwEAAIqHeAwAAFA8xGMAAIAMp/Fi4m4jmv3ejcdO4r9o3amS8xqF1WiWQ2Y3/CgAAOTzwnPXfvFX/6vaOY7Dp59sf+oJtVO0wdWdefkOJoomYWwUhW7UtAVMhJ+gTlJdnN+5GgYaf30sX6hM1g7KmWGJQtZZTmNQ3TraU0meI4YfBQCAfL7w2cff+c633Lp18+fe924ZjijKUpB+4z330PY997zx2nMvyJqy0MTgy6UHv/q5z9+8dUvuFsqE425jOdl2sg0opZU9ETP7m0lzgwOjLhApBuTbFIM6WQE543l1dXUzkbWdYM9RmHZrbZFyn/ZsZFZb9EOhPe8zgT0i47xXM+hHoPZE1kgPw+By7pF+RroQ9tdVU3lmW9P2aY7Y/aEDDts6BbLI2feHAwBw7lEY/vznvvpg6fKX/+yp52cfpmh0/fqLFGX//ne+5k+/9jXa3dn64L/9td+lmjduvPQf//1///Xf+03ZkNx55yvu+67rz33l62q/QBSOE5kPt7o1aqnmp9LlHINqYa31D3rmdcflORViXVnfH5dm50UWwO7GzpJaM3eS9daAAj19QuCsQlsiIa/Ig5h0d9t8mu7uvl5g01HxmYA+IYh8i7TuFOgDAg/Cr5nux1raljXSw5BHD1sL5YO1kQta0Yk+s2X77MhPKvkHHLbl35qowB+J1lZK8QEDAFwIX//Kc1+8/i0vu3Tpzld99193ey/duPG5T++86i0PXrrjDlnh8Jm99y++izYo+v78L698x7e9TJZLl7/nux7/7BfUToEohGbkBvZR8E2WrjgVB631/c1VHc3keq7mlOgQ68mKx4PDfQ729MMZTNBcBVIVRv3KAoclkf1Yry/LTU77m67p92PpSvFhtJtN+2kjm2qZnj712WuWxaBoxa/lG3DYtnRlKRElZfGRKD5gAICL4cZXn//bV72Sou/lex9o/86j73jd6z762JeWf/iH6NDHH12mW+Vjh9/91u+7T1YO3Xv/6/eeOVQ7027QWqglHW9hyCs0Jz6r9d2wL4JZRjzWwZ6C2P6hbE4hJrUcJ9XVzf3dBq0dOeo7laVuo5bQWpG26LNCYpP2hjW9fkLxYdAqvZPUhk6PqZbp8VOf5utyvcTOO+CwLX/JoFIR8/o5PmAAgAvm8Okn/9nqJ556/vn/svH+h3/o/bRQ/sBH+JHlf/hQ7cryo9PxJXG28lzFj1WhboMf0/J93+Jn1TKUeKg3tcUigUHGEMH5qtpGGxmP3DJVojLh856pbSpziddS71QI1/Zq6qamH4FKbLZ9rzNVII7yAd4wFegEthkXc+Z/QRbrhk4Tdcjujx5wuq1b4NdPzQoA4Px7/tnBI4989Js3bz7+2NYf/vEXqeTmzW9+9JFHBs8+n6ogd7/4x3+49djjcpukdoujvp/14qMqEby/8LKhxbvtO3VMS9Ovy43HJ5I+83DZtY/Xz8TkHVanrqtN6UQAACbn+vUXH3n3Iy9ev05x9w133y2j0U/+wsco0MptIuM01Xzv/ffLkvvvfy81ocKP/cJPyqOFs/f2caI4EYbjo6zvj/NKPSUfpX/Q6zWXI0+Yj9nPxGQOOKW6OK++UC7rL6ABAC6qO+98xULt8te/8TeX731A/kE12f7IB2bf/Ha5Td7+5llZ83evXZMl16797ivuvPPWrZs3b84+WLosuypWdXVpR/1HSuPDf6gU+XJ2hi6B2gQAABiTF5679on/9r/+zb/4J2o/t8Onn/yDP/8/9R/jv76+UBCPAQAAine7z6sBAADg9iEeAwAAFA/xGAAAoHiIxwAAAMVDPAYAACge4jEAAEDx3HicTjE4FFU+UR7BgUl3mNNJTzRVaBI5rinLXzO/Y1/z/MPoNsY+2uMyQz3BNAEApoa/PlbvBesv7eR4JVWmcxFBx6u6NTIrpJK/5qmyw5j63+aUXDEAgNsz/Hl1mFSf7s6SzlFoCuwihQ61a1l5+xUud0pynIiqECrgCkPqc4F/1qCyUyBLbMyxW84ZiZmcHkPWKdSkUqegXdVtdk1ZIVbTHlL7w4YdnMDgI1xmL5WuQUfCmXKH9MP5bYYNu7vtXpPfJafqc5EXv/mcmiwOOxFMM9owQ6AN253cCju0p5a4htc1AMBZ4MdjldS3rFJFhUn1bVp+nbFC5XU80un+Syt7KnFFNG+/cNha4ARVdlWT50RsidN0Ub/D6vNxGoRK7LC9UgorE/Uq747Iu6zzL3M3qQzM4oxmcqZkq5pxCmea/imUoCa/uFuO3M/XFZkjyTFsb2CyiDnXPP0rk8KZEv+3mW44aB0m9UpGjkwjdR3iZzdzoV9kRR7oH/AbzSNzjF5YJfinBQBwRkSfV6vYECbVpxK1Z6n1jszbn0L1Izn/281mz4t6+U6UJLpStL5TInA844gUVnbodJTqrh+EY9WyNDuvG7qncU4RmabiZbwMa1LEWzvgEm+NF5ujY9Sw9cAs75rHfmXhTCNSDUsrK4tiIw9zHTL+wci5DA6TpbUlDsgUmEWCkaw5plKJSsE/LQA4c9Q9In1TPD+yJjjseXWYVD+8W6fy9qdQfZuqyqxZaH3TSWrOI8U8J3JF6/tJo7uNWiLTQYeVY6qrm/u7DVpk+4s91TLa0DtFZJox0ZpixWjXwNJtDNsOzHKuefxXNmymyvDfdU7ZnVDg3d/d2Elmq1eWkoMNFY4zfzVRwT8tADhz9EO01DPD8yNrgkO/P+ZEU3Ixp5MI8r2xJkrW98XttHRlSRY4yx1auOhvHG0P/keB6lafDpiSHCfyxOrrEr4Z001ffuvJe2HlGJ5IW4cAa2dZNFQP8B0Zpxj1kS6oqb8PraXPfdJhewNTZYK+5rFfGcmaqf1tZjQUzLHo78sxpJPq4ny7PU+r29SkUrsjpP5pAQCcEcjvpFFgXE623dUtlWzM7k35R7Rw2Ccw5TMdyxwBAKbb8L+vvkD476ryLsGmyBkd9rFchDkCAGB9DAAAUDysjwEAAIqH9TEAwNk2MzOjtuBskoEY8RgAAKB4eF4NAABQPMRjAACA4iEeAwAAFA/xGAAATsEglXsttynIq26deBZDZEwQ8RgAAMZvcHWH33/LAY1fkUs4CPl7iii0+9VFJx9gwfQsgkFKwXRsAfPeimxbZ0wQ8RgAAMZOB7LuRnNe5UjlICQywpL+ZiJyp5NuYznZdjPrTlFANuE4HKQQTEcXiJw5MttcZMrxCSIeAwDAuPF7bkWuOE5Jw6nKB611Ny1M/8DkRq1uBW+nL895+dELY2YRG2RKKjUefw5RE1ScKccniHgMAADjRsFHZlWn1WF/bt1JVCez/9aGplAtDU25OzlmFiNQ8PXfss+fPuwEwylHJ4h4DAAAp4Zi0XKyfXR0tJ0si+9TVfbftYNy+svYM2rQWqglHW/5zOtqJz7nnDLiMQAAjFt5rrJ/SLFncLhfl0nVS1eWZJFEFdRWXOrxbzH0LIboNsoHa0d+ulp+Vp3OmU/8KUcmKKI2AADAGHXqSZ3/jqu/aYMQFTh/EiUOy5qGKtONC2cGEhkkc4t1Oc24stkXm4JTx7SMThDvrwYAgPHrNhYOV0f9EVTcoLWwMbvnrzkLchuzGCI+QTyvBgCA8auuLu2o/7znmLobO0tD/throk4+iyEyJoj1MQAAQPGwPgYAACge1scAAGfbzMyM2oKzSQZixGMAAIDi4Xk1AABA8RCPAQAAiod4DAAAeR0+/eS73/dzN2/dUvun4IlPtZcf/bjamawJzI5kTRDxGAAA8npi9xNLD7/nr7/y7BvvuYeTJMzMPPn0IZd/qi13yT33vPHacy/I+i88dy1Vk2Ke3DWRT9YxIer1b3voLz75SdPDJMnZXbrjjtSQ3Fm4oTQsD+cblmRNEPEYAAByuXHjpe5v/NHr77/31t/83e/8yeevX3/xvfff/5Ff+XUKq+/6sfqR8PhjWy9/+X13v/w7VJv/+/f+x5e+dPPmN3/2Jx6imteuff7H3/Ojf/jHX6Sav/9bvyQj3/se+uevnL9b1U+Su7/z3n/4/d/6+Ge/oPYnxcwuHBL5nvtrL16/TsPe/sgHVJGQKg+vTFiSNUHEYwAAyOWFwef3k/kHS5df+w/mH7j38qVLL5t76+vUMYFCWutD/+5f/8rKK+68U5Zcvu8+2r558+8OnvrSq2df+xd/8j9f9Z6ffuv33SePksv3PvAHX/yDn3jHD6r9JLnjjkuvnX313jO8lJwkM7twSPmFVyYsyZog4jEAAJzEl//sqV/+5OOPfuinaJkrSz736Z29b3zHQ297vdwlt27d/Ln3vfuuu15J5b/w0z9CJY9/8pe/7dKlmZmZBx74kZdu3JDVUmbfsPC/D//itL/HPZa//PPOK++6i4ad+uo3Wh5emVRJdIKIxwAAcGyHTz/5vd//j7Yee/ztb56VJRR6P/PYzpUPPkLLQVlCaC34S7/1+0dHR+sffNM/fscH/vzFrzz0Ez/7zZs3n3928Jpv/cbXv/E3qt50oxXzn37ta/Jp/B/9Rtd8jIiWh1cmLIlCPAYAgON54blrP/6eH6UAU/+xd6kisQT8tc98VS6Cs5RK81966uDvbt688dXn97/+oioNHD6z9+rZ15rF5fSggaktnykPr0z0WsUnSIEdAABgJFrUvmP2HYNnn6floAohSXL33W+gEvkXW3Ltq2oLbk2KSbKa2aUK1Ocb7lZ/OXX//e998fp1WUcenSQzu3BI7izkH6NJYXl4ZbKuVThBvC8TAAByuXXr5qPLV1738Ifdpd7Y3bjx0j990w/8q8e6w5/ujt1kZkeyJojn1QAAkMsdd1z6qQ89uvPYZ071L60+9+mdv33rkvs32JMxmdmRrAlifQwAAFA8xGMAgLNtBvkWzzgZiBGPAQAAiofvjwEAAIqWJP8fyRQ1uXPL7yAAAAAASUVORK5CYII=")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 10.2. Bieżące aktywa i zobowiązania podatkowe
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 10.3. Podatek dochodowy odniesiony bezpośrednio w kapitał własny
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W okresie sprawozdawczym nie nastąpiło ujęcie podatku dochodowego bezpośrednio w kapitale własnym.
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 10.4. Podatek dochodowy odniesiony w pozostałe całkowite dochody
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W okresie sprawozdawczym nie nastąpiło ujęcie podatku dochodowego w pozostałych całkowitych dochodach.
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 10.5. Podatek odroczony
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Aktywa i rezerwa z tytułu podatku odroczonego:
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poniżej przedstawiono specyfikację istotnych różnic przejściowych dotyczących aktywów i zobowiązań z tytułu podatku odroczonego:
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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PPoxtj95mWPNG1QX7PzkgdWoaxaYQHltV05rhpDrxsjxYGRx6sr9IHLzR1r55GOQqJXVxj22xmMGwB1Ht51+I/bdyrbUoaQ/g6WWZs/Okm/hxWy2Jo0+aZl91+HOJGRMfi3T988eSSYfOV1JSpy4ImreHL72Lzgn0IihZfjtjsRd9DLEXu8jh6qW3zTVan1s7On8hl9weU1bPnK3yxd9QpOa/ftxvwl90H+uIm799XiAPPOmh3fSY1nFl2EEJ2enjhtdJu+Q8GJ41ojtuxRYFMicfyjL1U5qVq2ROKEMT8ZISl2i4rheWNP2rLjQP2BHVtOwmgZrQBlm9pbzF/6B6SHtMc1veLeGx589gv75jCMkdO9B/dMnTV/4uhvd9TsOvBJJjrHqy0gS1QcuOZRV6UffOoBdr952SP5DfInXJCXVoPK1TZL99p1ULyGXsfI4+OCGriOdYVhv53BvlXC2E/6G9gzyQR6xtn/PLe4SL0mAfOWrMFKC4vb64t+jtUV7tirF6yuqgNVqxdcLStIsG1D+fh5xV37U1QP4OW47U7EHfRyxHW8rlm8QhbQqx64pHzDNp/RF1xew06aOVuW2zmjxmze4dwE1Ts2jxmVgyD0yKq3yu74lSR6oRcEBz6oGlm8CDZhIX/9FYVOqpYNW+PdfzuopwBpEQdfNX7ccORLHGB1UDxv/PNPP/+P88dhtIxWdNvgtryMXrH4GpyGtMc1vfiO5esrbikuXSZ/D+JlDE4nzhhe/uwzWadkFUyZsuyOJUMLxiLAeLWl459H+sE1jzLG7jcveySPjWzvZo87Tm4R3WvXQbFRxnjh5aY+cB3uCt1+O4NxAxDiitxF4MN3/rqyotLeZNjLeqy3fph/qqwgZddVMr0glTdOuDpuuxN9B71G0B6vjKHZJx06LLO6TCyBo+8SLFHdOUXjK7fuxoL9vLS3EWnB22nnXTAhH0FoxYpFxycS2Ld+0vi5U8BCL4gYjl3Oawvn4Dg7u/DvdZ84mdLSTv9RYXZ1BdLHj5+dc+FpSLFbhDFDhv4jb0S2TOJjzinasGbD4jmXGpnRim7b98dMuG7a+Uj/845GO6eXPV7pKL6oeGTpvU/5GAMQk158sRa7MQzD4V2H5Z2nV506rnnUj2rSD3Ye3Ri735DB1R5X1K+Gcxa+pp4E5bVr5QZGz7ji1RX6wKWfMsLOs7n8d7iqWrfrMey3Mxg3QKpWQsKCfYncPInE8fIH5wXTS+QeAxXV2bNnTkI27Lpk6Syl4o7tTnwdtMdreE5ucVGWPrE4Wb2JmUQXdiF3Lyt/+JGbfTZJimPHmlYsfmj2Hdd30+i2yxjSMdjJhJAoEPDXsFEDu5DxReeEnDebmr7e9NJTNzzUXf/LYLuMIYQQEl8o/kwIIYQEELOdJSGEENLzMFgSQgghATBYEkIIIQEwWBJCCCEBMFgSQgghATBYEkIIIQEEB8tjlBT2hp1DCCH9gdZgebRF5wjoukUH+rH4cyBG57SL5LdpNI1l1Xsd7sZ20TOtEBI7nrxrtojBOectyAypPuioPrKo5kNRJom4MHJnMKT6IkvIEQRGTntMddrsLCn+3F6MzukS2tWNHe6f7hgsQmINnqbbZ134vfzp+UMynaQWcEmXBcaeYVnFfpkts6sr3kyp5J5y7rzm5uYtGx+bu+BRe6aOO3DQ0E92LkSJ8CNo57THVNIVAa9hjaWEodPb98Sfr732PrnLn3v4btwNSFE+Xr7wHhF+UisRw1RlHg5k8YLet9ehxpJHxkxf7OjdaKx0dHvs/rH98rGfO0tCDNLTE/e98Polk891zjUMWeDafbvvWvjLRErFYlpxSVIULyf3sovPw6WModmTC8/qe1/B9NG7jg7hR9DOaY+pc6GFNsGyn4s/uyLKw42Nh79d+/SMhU+gSNGQI7WfNtim+ust6+bpD5LSWHbONRDqNn90UtLo5ubpgw9JD/uoLrv65WV/qgVCSDDyJOoPafWOzc5RSgDOOUohs5Nz0ofI8NC7jgX2CNr4jKng8hq234o/u1I466LBGRmwcOoVv0KjylnbVDHPR29Z7zrBS1la0LW8r7ppcd2hZPDzUS129cvLfkJISHZbssB45J1rqanAOUq9Cjpu3Owwek+xA9OXq951LLBH0Lmg4TWmCpfXsP1W/FmBqPPRnoA38rapMM9Hb9m16wxlaRul5Q28nkDVP4F+EUI6gC0LjMd/yQNP47HFXLGxolxmqifvml2Tlue/fYkvanuABbfSu44LgcLOwHVMdVyCJfqin4o/5+SOG/p/5UW0+g3VC9tUJProLevm6S9+UY9oLDvnGnoTXn9ip/ePl1+EkDDIu5nsEXl4VE/NLnB94gQ8m8X5dXicE4njsULF44+N1/ylf8CuxedpjTWuetdRI/wI2jntMXWytkDxZ0IIISSAgL+GjRrYn0VH/JkQQkg/geLPhBBCSAAx21kSQgghPQ+DJSGEEBIAgyUhhBASAIMlIYQQEgCDJSGEEBIAgyUhhBASQHCwPEZ9407A3iOEkD5Aa7AUYUz5mpEuXEXx587QGXXoQHz6LXAs6jU9MkEV6fA4EtInwcOixO/UN7hVov5xuyc9ZIdjgW28BAVx2bUT4oI4IsYrHw0BREF32aDNzpLiz53EttbovR6jA2PRHcNHSB9Aid/VHax59f5nZEE5b/J0UWv47LP3sBrGs3+7h+xw9HE1Hom6WrLdCZIeF04dddHhxkbY//oL9yXS07Hrs6WeDZcNAl7DYq2hx15dwbjviT/rNdyz8HJpCwVllYHOxQHKitdS0Mda+ypOXevEAVA1I79a+xg1KCRd9ZteVnKqscAlQ9E6WT5FfX1VYXY2ikhz+vAJdke5NiSnan0d0muVjjoxmnrNts42IRFhxE/GnJBIfHmk4SfXLdW/tZ3uLTscfVyNN9SSdaQTnJN4Uusm9ezjMmgTLPu5+LNeQ8msG72UnEVOGdtrf2vtq/7q0EBqRv7i/LqqDw7YNUg25Y7qN+A1Fj58+3HGX/bvV805qRquHWU0VF+z85IHViGPrK/De22MJg6oU00iiywBJ02+adn912GG1bVmDR2hvgEWr7ZastEJTmpM+Hjfn7GNgf2yiLelnl1d1nF5DdufxZ9VDT5KzmpV5W+tfdWnTkHVLPm96lfuqH4DPqLQXhjNSaKOa0cZDeVPuCAvrUbdguG9NkYT+alTTSLLvCVrsP7DIvn6op/LYlRpza564JLyDdskW59ht5tast0JcSEjY/Are/fCeCzB5aUrZifnWmrWwr+uLuu4vIbtt+LPeg1oy0fJWfC31r4apk5B8rvWD1S66rcwIPJ5KVrrleuEVJOWHfnsccfh9grvtTGaUoSQKKOWpxlDs086dFh+I/B6fGKNj1qyvkaPI5lD8rOHJsOHIfXs47LgEiyxou+f4s96DV8cPeqj5Cz4W2tfRRH/OjeX/w6tq/yuNQC733wY7q1orX6z1CvX8eooHfVD75yFr5VML2iX1/poEhJZqt99U27pROJ4+eN2PFbFRVn60yqvYcLIDkeQMMbbneBciAPqXaMyHjOVv9SzDcWfo0K7XOsb9EOXCSExJeCvYaMGNn8Uf+4ztGs0CSGkF6H4MyGEEBJAzHaWhBBCSM/DYEkIIYQEwGBJCCGEBMBgSQghhATAYEkIIYQEwGBJCCGEBMBgSQgh/Yv62r0vr3/bOWknyW+JpESf+httgiV6QUkyGZ+RPdYJnWGDTva1ai5ku+01jxDSn3nSQwNZJkb9kpFTRDl0LejIsuml58eOPV2ODS9UFFCOGClZw3IyPzkQ5RnVHkGv0CYjq1Js33VagyWK3fqzG/+4fWdzc3Nj4+G37n845JBndE40GGG4Y/LOIdvtpHkh6bAXhJCIIJ9IdRVwNqSD7ZyYZ085dx4ybNn42NwFj+ozddTAVL95XX3WoIG2F7hkiFrbKenpibEFQ3fWRHFB4DWCSm1QV65GZl3q2fZU0hWtwbK+ZueAiy+RHAgw/+PWmZVbk8IlslxSn+HGPWFoFKMNtdUzdIAlvwrpouIkiFcI6bpgMjIbSsVexYFq15CkNmpAQxLG1IeAXRWhcYx/kYgW1cZXd1Za97KnY7LPdm2qRZy6mkQI6SYQBkIKONs5MR1fdvF5OMgYmj258Kwof8TxyyMNaaNHnJCAjaYXtqi1nQJyRo1xFfXrdcKMoJImNKSeXT3VaQ2WSiVRQHfgX8zpb1s6w4ZGsSQCQwdYEl0FhAGiy4yFT5RePlUXTJZLOl7FdXTR5hMTJzqpFvkTLkA24KoIbWsRC4bWsZc9HZN9dq1NiUt7mUQI6WEM6WAfYvG0Dh99mms4t0WtvWSulRJfXJANjFKuxg7EkHoOFPRuDZYSHRWih+mqM+wlGoxopOsAC7KDRKIuIFxx7w0PPvuFSP7641rcBvFJSVJ7obZxrorQthaxYGgdh7EHNYcUQHatTXWvl0mEkJ4kw5IOdi5YbFpbdty42WH0niKLLWrdN2SuDeXq3W5Sz/6etgbLjKHZzy9aKq9PsQd65v5XsfVRWr6uOsO26qmuAywprgLCxXcsX19xS3HpMnlfqgSTFYgiolQcRn8YUdCWpFY1KNA7PorQeB7CaBH72NMB2Wd/70KaRAjpMUQ62DlpC/YuNWl5/kv2iFC/5yOZew0QBQxRazsllTFN32nECLXrs6WevTxVtAbL4Tm5Zf92d96IpBpwZuaQOSt/l5sz3FVn2NAolkRg6ABLopeAMLahi4pHlt77FDZtSjAZNhhKxWH0h3XR5hMGDfPSOh5zTpGPIrRkCNQi9rJH90Kv2V8AOdA7yiMT0mPImx5bA1m9lEq0SAfbOavffXP+0j9gj4JsEf+D2IGDstL2HPy6CXHB9AIzsCFqbaeghtp9u+1YEgW8RhCjA/uBGkFJ13H1tA0SXcNTd7Bm/vxl8oNcLMCmTX5NdD3ViaBrsettQkj0efb3S2sO1jkn7cRnCu3btO4s+yRHj35xxZgz30lkqdeYPorQEdQipjwyIaTLKZgyRf5nhw7Q8Glt4w9O74c/DFH8mRBCCAmgj+8sCSGEkM7DYEkIIYQEwGBJCCGEBMBgSQghhATAYEkIIYQEwGBJCCGEBMBgGWM2rS3z+UwlIYSQrqJNsFRfdQLq467CMYo/dxp/S6rffTNQ0EAHtdU0nOzyTaYouUxI7HjSkg4G6lueSkrPnipF1wK060GOEXFxMMwICpgqKf7cSifN6zHyJ1ywZsk85yQE8Ku09GfOSVvi4jIhkUK+LGpLB2Mhu6xi/zdNwFEdGW6JCWOePTR4OlKQR+T8nMJ9hVg4GH4EkYjMFH/uBfHn8DkFY5ljuGBUBYw1nd3Vui+qZ1JFCSGh8JIOrt23+66Fv0ykg8S04hJD91g09QYOyqpftxkPXVPT199lnpEzLMu53FeIhYPtGkGKP/eO+DMInxNxdPNHJ6Vabp4++BAyGy4YVcFUQ03a6GrDF6cZQkhXUL1js3Ok6f7K8lSJCWOD8dunb548Eky+8rqSvvc951g7aI+gTMJ60KH4cytqq9dN4s/hc+qjctVNi+sOJUdFd8GoCqYaatJGVxu+EEK6EDx0zlHLxAgMMWE8v1cvWF1VB6pWL7haXlP1JWLtoD2CFH9uRdWg6G7xZwP/nGpUAPaCri4odFNVn+tdbfhCCOlC8HwteeBpTFaYVTZWlOuTntpFqBUt1rg/zD/VeFXbB4i1g/YIUvy518SfbXxy6k3Lj466C580fu7ka0HPL31udLXtCyGkvcjbIFs6GM9XcX4dHs9E4nisgPEAYpsljxtSREy4YHqJPO+gojp79sxJUrbPEAsHw4+gpOsg+viLP7dbogt7oLuXlT/8yM1xeWeN7lux+KHZd1wv+0XjVCd2rhFCCOkZWneWfZKjMRd/JoQQEgUo/kwIIYQE0Md3loQQQkjnYbAkhBBCAmCwJIQQQgJgsCSEEEICYLAkhBBCAmCwJIQQQgKIa7DcRN1jQgghPUVrsFSqT0D/EnoEgaleuseKMDJVx7wVrdtFmLZ6iyjbRkiMkBlSffXaS2UPuEoHRxlxTYxXssmGLKCARFtXOfrIZ/DEHTWCtoOuLiva7CwLr7he5DEjLl6a4a17rECeHhNA7sm22kuUbSMkLmC21YWCqy0xYfVh7rqDNSUlV8ZOz/LUURcdbmyE/a+/cF8iPb3eknqWeGPrKseCt15dU5dfLO40VFbAHdtBO8Up3ELAa1iv1ZMsLoyraExUi3GKEC2vSXEgkRy3Fw6Qp5PiyWoRJMs3r4bUjsq1HllB6B9blxSA2kK6qVL82wJ6EalTpSCbj4VAeSenkgGnXt3rZZteSaCPhBAdQyi41lsOevfWyllzLo/7VzNtqWd46qqrHBdExFB0O+oOHbUdDFS3bhMsq156VPQ6Shb9NjdnOGZeH43izz89aFxFDaILvWbJPNFSxky9a3/z9sqtmI63vfFG0TljOi+ebOgeezUkmYFdD+KKSCUrRWuVAi6YkB/opmFqqp0kPt7Zitmqr3wsBCJxYIg/+3jtZVt7fSSECDIT6nK5tpiwgEey4sntYZR6o8bH+/48JDNTLZcz+paWtS6ZInrGtoOBLru8hi1f+Zulq17Bqb9GsetVpQstWsp7D+6ZOmv+xNHf7qjZdeCTTMRq9e64w+LJ+W11j70akszArgerQkPRWqUo/N00TFX4eGcrZqsUHwsFpSSHYynu47WXbe31kRAiYLNoCAW7ykGDbRvKx88rjt2vHogTr+zdi7UyFtnyVhmTQ1/SslYOgmd/vzR7aIbtYKDLLq9hJ82crTYl/hrFxlVJFGDcxBnDy599JuuUrIIpU5bdsWRowVhM910iniy7ItE99mrIyepWj5JKVorWhnhyeDcNwnhny4r6WCjop1I80GubrvKRkP6G+j1SCQXjabLloGVbqaR8Y0rmkHzEErVAx7K7L2lZIyI+XfUVthO2g4EuuwRLZD2naHzl1t26pLCtUTwsb7xx1SnfAibxF1+sHZs3PGNo9uFdh+UlYefFk9Wva0pi2rUhhV2PrWhtiCe3y00dH++8FLOBXcqwRz9Vxf29tukqHwkheJpsMWFsK/9x/rg4/jEdls7yZxNwx0vLWl6A2brKsQAxUny5uPihirJFiIi2g4Hq1pTo6glwL1JWmhBC4kvAX8MSQgghhDtLQgghJADuLAkhhJAAGCwJIYSQABgsCSGEkAAYLAkhhJAAGCwJIYSQABgsCSGEkABag+XR+OhZdhJ4SolHQkh41Ddu1CeuXIV6ZBYVIaAYobwDuvFPtlWvtDshLqjvb+sOigqT7ou/+FKbnWVc9CwDQdcsv+1ehkNCSOdBCJw3efpjG7c0t4gdVVt6lsiGaUfXvIwRSvio7mDNq/c/g5lToouuXml3gqTHAlc9y1POnYeULRsfm7vgUSwIXMdUJ+A1rBFp1WmH9SxVOjLf/fBzOJBjQ+4RiRL2VeVG08ZVtS2WZcJT95beeP+dQzIz0aJaDanM4ON9fy4uXWa7QAghBl8eafjJdUv1TzrXuulZGpqXMUXUkOCXoV5pd0K8MPQssT647OLzkJIxNHty4Vlw2HVMddoEyx7Qs5R05Hxl1dIpU1o/z2/IPSKymgqOWtP/+cFW46ohcvmrO8oeufWew42NpZdPtdUin3vohvfTzqooW0QdR0JIILqGXW7upUnFWUvPUmZLTDiSGDtk+zFp8k3L7r/O9RPWdic4F+KArWepUJHIHlMDl9ew3apnKekH6g/s2HKSLpFqyD0qtRSVggPVtH01v63IpY56W63UIn9xy/KLRp2KA+o4EkLCoDTsVj1wSfmGbbaepa15KVfjwrwla+AddjrXF/3ca9tgdIKTGgdsPUtJ37S27Lhxs2W7bI+pgctr2G7Vs0R68bzxzz/9vJeWjeg12gqOetP2VRzoIpc4/arx44YjX+LAX2OSOo6EEH8yhmafdOiw/DykJihDz9LWvJSy8ULp4dvYnSDp8QI7LtGzxDE20zVpeWqk7DGVdIVLsOxWPUsw5pyiDWs2LJ5zqZwKhtyjreDo1bRcVT89isilvJjOG5GNwOmjMWk76FwghJAWhufkFhdlGROUrWcZXxBCZBpUepbyQk5Xr7Q7wSkcB5SDSs8SKfOX/mFucRESZfIPHNNeUB3BHtEQd7RTCCGEkOgQ8New3QH2iOOLzmFcJIQQEheoZ0kIIYQE0As7S0IIISReMFgSQgghATBYEkIIIQEwWBJCCCEBMFgSQgghATBYEkIIIQEEB8tjx5ruu/Zaft2GEEJIv6U1WCqVK6B/jvzAB1XyASQ5rX73TS81K9TQMVHliMRjJfsFLpx1+6GG/3fvbcvlW4jKQvkKlGSQS8BwXO9JyeaaIpVzLUJIxLGf33o3teS+pPdnO6imPpUSI+wRRKLyUT53F+hgm52lq/hz/oQL9I8C43TNknnOSVsyMgY/sfEJ18+jdxg40GMyzvLdfSBCYMenH+9c0Hjr1TXyWfYnFs6o+uCAJNqOnzrqosONjcgmimOuKcJT95ZOmnNjvJRUCelvqOf39RfuS6Sn22rJ2EX4SwfHC9tBWz/ZyRoTjBFE+DS0rAMdDHgN66PAvHfvTqXYLFfRvNpgqYJJsUk3+WVBsmVnF1bVO5YZLeoyzrhkCEfrrei2vfP2BjlWumsh7QG46UUIzDlvS86oMfcvXI46sWhQX9rVHW8Xr730uBKIIYTEEZEXDJQOji/iIA4M/eTUxbjiqmXt72CbYGmIPyNs+Cgwn5g48YO1W37/l7eMnShAwbfTzkNOAGts+WUj2/79f8n4+FtJMVrUZZwN4WijFd22s8+bLukLrhq8s6Y+pD0AYe+RhS8sv+UXzrkFYuT6ilsQvNVe3pWP9/0ZeRCM1ef57RT0dukNzygxFkJIZFHPr1pey/pbqSVXB0kHxw7DQR/95FhgjKCtZR3ooMtrWCX+7K/AjOMziy7KGZaFOHza6DZvEVFQQrSg3gUr+WVBZVMiaq4tKgzhaKMVoGxTe0fxOaQ94LmHbpj1wI3+b5IRLxFoFxWPXPPqW06Shdryq1fWdgp6e8OrD85d8KhP0CWE9DpKOhjLa/WK1VBLDpQOjh2Gg6oTgK6fHAtcR9DQsg500OU1rBJ/tjWWEYR08Wcv9ILAS35ZZWtq+nr33w7qKUBaxIGScYYzunC00Ypu2+6tlfIyesXia3Aa0h7ZgMq2DyCEf/mfr8rviw2f1m7525dZgwY+9/Dd9rvsDvOj/zIFQbf03qecc0JItMkckq9Po2qhj0nGXzo4pthy0JgnlX5yHJER9NGy9nLQJVhip2iLP0sU0RWYP2n83ClgoRdEDPeSXz79R4UI8kgfP352zoWnIcVuUV4fi4wzMujC0UYrum3fHzPhumnnI/3POxrtnF72bHp59R+WzpdsqOSrpmPXP7hS6hk7/meP/PF+ROipV/z8Z+PHIkVUpp2SnQBLkz7w5wCE9GHUmyqljYz5NDlNaCmYZPq2HLRKUfrJTtY4YI+grWUd6GDMJLrgc3iZaCzxVix+aPYd13ftH+gSQgjpbwT8NWzUaJdwdFPT15teeuqGh5J/N0sIIYR0GIo/E0IIIQHEbGdJCCGE9DwMloQQQkgADJaEEEJIAAyWhBBCSAAMloQQQkgADJaEEEJIAAyW/Zqu/XofIYT0VVqDpRLAkmOlfrlpbZn9MbYOi1L5003VCtXestU9SX3t3muvva/DH0/vwi5Ch/zjtIm5mpRm8gNJKe2zLkQZbFt+rKPC1x3uhE52PunziNSGqAE7SZo0IdAvIbOuPiRlQRTmmfbiajwetEtzc3UlZMPlqKE+awd0s8URSRf77RQlsAH0sorWYKkEsFDL+mffki+Po/zWyu099oH5jG6Qj1bke8tW90/QIV6ynd1BFw5ut94npN+CqfaUc+c1Nzdv2fiYLgck8n+g7mBNScmVOcOyZGL9Xv70/CGZkgdlDw1OKgM2WZKF0cfVePj42K2LSpbeLnlslyOIrVntXLDEn+2Udog/iwAWav/ySMN/f+gxEXpsavr6u8wzcHNgQSH7S3SrbD4+3vfn4tJl/jLLuiAz7jx1KosXVOUjH21kFvQily+8RxYCUjkuGZLOKjNODUtwVXmEA1lHYKelFhR6WZ+akRJoBtD7JFm8vqowO1vPALzsUemouft6XkeeCrFB1elVUC3Q1IrbKKLQB1fyKNHvwE7Dsd4JsHD5bfeiKtseI6dRTzLdrfMJAZhqL7v4PBxkDM2eXHiW/VnN3VsrZ825HOnp6Yn7Xnj9ksnnOhfS0gYOyqpftxn3pJoznQtxwNV4BI+souKCM8+QPLbLEUdpVocnrPgzVusTZwxvOPIlbogRp+cmEtU7a+rra3YOLRiLm8MQXn7uoRveTzuromyRv8yyLsj8+acHN390klyaPviQTKxe8tGY6ezMwkev167Zvr2x8fC3a5+esfAJlC0acqT20wZXSWfJjA2lbok8A+IRZvBd+5u3V25FRNn2xhu6FLMq61NzGDOMPkHZw7sO/3H7TmTQvfayp4d7Hjx1byk8wqYTdRpa3LhqFMQdcskDq5Dhs8/eE2kCu4iBMlWJfgd2mtEJqWocDHuMnEY9SHftfEJ07NsM4NmseHL72Lw22r0KzJ+/ffrmySPB5CuvK7EDbZSxjZcZuCffPHUVsjhWmtVOqpt8t5HSPvHn4af9oHLr7i8a0nBDYNLZva9WxQ9DePkXtyy/aNSpSEefyp7AVWYZYLYSQWZdmfqqmxZL3PaSj3bNLBTOumhwRkYiccLUK34FS1RZ2Q8hf0KTdNYXF8oSORWP9h7cM3XW/Imjv91Rs+vAJ5n6elCVda05vBl2n7h67WVPD/d8xb03PPjsF2gIx6jT1uI2CuZPuCAvrQY1yw3nWsRAmaqk8gI7zegEJzWFYY+R0+4WL8cJETatLTtu3GxZWuls21A+fl6x18t/PG5XL1hdVQeqVi+42nWZGFls47FlkknjjLP/eW5xkXrlFn0MzWpJxGrAEH/2SQHB4s9jzil67++v7973NYIEJp0Dm17/oObrrEEDcQkV6cLLkh+gT31kljGh62LRSpka2PeiQbsyAy9JZ8GwBMAj7KTLn30m65SsgilTlt2xRPbQzmUN/5oN7MxGn3jhZU8P93zxHcvXV9xSXLoMW1u9TkMfVUd2sbPHHYcnKkwRlUeJfgd2mlcn2Bg5jXoI8Qf7kpq0PHtHJdtKHwlbtUzEOuyH+ae6LhMji228+pn2w3f+urKiMnZbTFuzWmHIdwMjBUuHYPHnrGE5mfurZI5GY82fV3188mlqbtKFlxVI9JFZxoSuBJmH5Y1Xl4w/NrPR6wnMLCC6u0o6C7ol8h4VICa9+GIt9h8ZQ7MP7zqsv4PV8a/ZwM5s9Ilkc8XLnp7seYCqFhWPLL33Kb3Ot1P6qE4ODfVrqKhhhylii36H6TTXTnBFz2nXQ4gXmCXnL/0DNlK4W4wnBdtKfaEm70KyR+ThKTs1uwA59Zd4FdXZs2dOkpyxIIzxtsvOhSiBERQvlMizpKv3cCrdTlFlPdWtZfkQhrqDNfPnL5OfowywIXjk1nvkL4tIl8OeB3on+Hvt012EENIx2uws/cFmxUt4mTLL3Qp7HqhOOHr0iyvGnPlOIsvrfaxPdxFCSMeg+DMhhBASQDt2loQQQkj/hMGSEEIICYDBkhBCCAmAwZIQQggJgMGSEEIICYDBkhBCCAmAwTL2HOuoKiQhhJCQmMFy09oyJWJV3w1SwDElZEDqlR478EGV+rDT0RYZLMMSle6c++Kfubo9GtrtapeQaKI+9A/kk+LqY2kqBbe6SMUBNYXGCBHrUB/5s92xOyGywBfXIdDTvdwRx10dbBMsUX7ntkP5Q/5W9cEBJ0kDV0VE0DnvDcLb0GPW9nq35IfQcM7oOrVkNBdeQ7sL2yWkt3jLkgVWonK6yLAtLxwXEPtt1ev2aiNHAczGCIG2QrWd7uoOsul61wZtgiX2KCcUnHfjnMWiCChIM4i0T91beuP9dw7JzMQxQrR8llp2MOoUBxKTsf+QA6RI9Na3IyhlaPbqKzU9p1rgyJJHt0FVgvx2cT2nuIBL+nJDt0Gl29ZKio9Msd5QqkRrj+HYqBCnrh2lvuGrf+fd8D2kwSIN/VXTVzhWlqAqfYenS0Pv3bvTtecFQzXaKGgMop0fBvT6AouQziNCb+lussAdEBmOGoj9/qrXgk8nRATY5qpQ7Zpuu4MIqutdG7QJlqJeefqPCpXEMVBSwL+6o0y+Xo1jQ2JXTjEjG8LFiAFeUsCGZq+rwDIwtIV1G3DVR59Zz4kuEAWoRcUj17z6ltQMpDjSi/PrsJm2rUVKoEyxYRJQPWZX6NVR2K4hDxAlZ6nH8B0pgQYraegTEyciv7IkVV8rujR0bu5Y154HCM+GarReEE2YQtDekt2ExBdXWWBZp+oiw7a8cOzQVa/bq40cL2x3ZPqyZ0tFa7DEDF7+2DN5I7ITieOxVZIpW5cC1hneVmJXTm3hYiWThiKGFLChwas2f0r+V0AU0bWFDfz1mXVEdqeoeK5znkIVF9tsa5V0sI9MsYG/eLJXR6kNq34X2r4HGqykoYHX2AkItCIN7eORq2q0KohjYxB9JLsJiS8ZbrLAhsiwyoO1o4gJS9kYsUlTvbbdce2E+GK7sztI77o1WKp9DKg7WPPGG9uQqEsB4/Srxo8bjnyJA7SkS+zi1FW4OKR6MPARWNa1hXGqbNBxLa7nXFlRmXSsudl14SC22daGkSkGekP+4sleHYVx0pWcFYbvCi+D5Vgwxk4HsVlJQ/v0PDBUo/WCrrRXspuQGIGVoiEL7CoybMsLRx9slF1Vr0FIbeSYotwJ1LtuDZbyPlCOBw7K2vPCv+2oqcEx9jciBSzvdrH1lInbEON1FS5GWSW96yUFLNjyv4L6DUy0hQ0bFHZxPeekmbP3VyyTevQV3+by3x2fSCBRbLOtDSNTbJukeszVfdeOMpScBcN3pAQaLAUVyhLnvAXEZiUNnX7KCNeeB3r98rupXvCTxs+dfC3Y+Z0LhMQZzKdyVytZYJWS8BYTdgrHAbhjqF7b7tid4BSOEvKezFaottM74o7E0g4QO4ldGLz09886J5G0H3u7PqZp7O8RIYTEhTZ/4NMuYiexK7+oGVvSSNHHlJyPBqk0E0JIXKD4MyGEEBJAx3eWhBBCSD+BwZIQQggJgMGSEEIICYDBkhBCCAmAwZIQQggJgMGSEEIICYDBkvQ0x6hWTaJNfe3el9e/7Zy0E5SNvgwwHfTBy8HWYHlUU/vszFfzUU+X6P12oJ5YjGLPEDIg9UqPHaBaNYk2m156fuzY03EzqClRRPHsFKVDAOSDJ1nDcjI/ORDxW0gcxEOn5PnU11pUonz3LtYO2sYDkYvRv8dpCB16OdhmZ1l4xfXfNAFHcclJbScZXaT32/l60FNUq7bp9W7Jp1o1iTCIiJvX1WcNGohjW885UBI5PT0xtmCoEtqLIMpBW8Ial+ZNni6iDqIMGGsHbeOxFDBkrpFyaPB0ySOBz8vBgNewRsjVtX/vWXi5fJQceSRoYwmPAxgqa3P1pVoRNNbL2oLDsNhQElb16O3qWwR9WaSny2oCluiyzDBSrEUp7GDUqWG8V522eV45YbZkk5WLboOqBPnt4npOcQGXZPUqNes2qHRjgFQK1arlklHQGEQ7f6+vJEiv8+WRhrTRI0QLLwy2hnDOqDG7NTnCqOHqoMj/4dJPrltqSDLE2kHDeFvmeuCgrPp1m/HINzV9/V3mGaKm4upgm2BZ9dKjxycSmGdLFv1WPjNvahdr2r8ls2501TF26kqt6JEZiKCxXtZVcNhQEpZKAOZcV0lhL71opXjcAbVqrzoB1aqpVk36CcNHnyb7SFvPOaQkstLOiybKQVm8KglrXZJW1sGxdtBHsFrJXGdkDP7t0zdPHgkmX3ldiXQLsB10eQ1bvvI3S1e9glNX6WbMd6L966VjnKwohdrTKCtVWbVz0gWHDSVhhZeksGslnVSrdq1ToFo11apJvwLTqJcAsp0C4iiJbEhYI0VJ0q564JLyDdti7aCX8Zs0mWvMD1cvWF1VB6pWL7gaYyp5bFxew06aOVvW3ba2MKZIpf0LO1x1jCU/MASN9bL+gsM2rpLCrpV0Uq06vGE+OWU3Q7VqJymFl8FyLFCtmkSE+j0fGTehrefsL4ksa9bIYjio1tYZQ7NPOnRYLhlPaKwd1I3HZlqXuVYreKyhf5h/Klbwkm476BIsUeacovGVW3djo6C0fEVbWNf+Te7Q3XSMFYagsV7WR3DYRjdD/xMmW4dZQP4Oq1V71WnjlVP9Bka1aqRQrZrEjoGDstL2HPy6qUm9Pkl4KzxjFk7dPm00hDH/GgvBSKEcVMYrd4bn5BYXZenPbN9wUFftnt9W5lp/VVtRnT175iTU4O6gs6juNrD8j4j8L9Wquxz/waVaNYkpz/5+ac3BOuekncTiFqKDPng5GPDXsJ0nOoLG2GRQrbproVo16ZMUTJlSuXW3c9JOGj6tbfzB6RG/heigD14OUvyZEEIICaDbd5aEEEJI3GGwJIQQQgJgsCSEEEICYLAkhBBCAmCwJIQQQgJgsCSEEEICCA6WxyjVSwghpH/TGiyPeog/H9CkekG1t5QuauiYcG5k43GHPfKiyyv0ob5277XX3md/Z9WHrhoINN0uTelYLMg6NnY+z4sXRu/15D1DvBB1DvVNRAyKmi1Ffk59CQ9E+UMinQT9oOT24kXgCEo2SXcdwTY7S1fx5/y2Ur049ZLSzegG4VxMo72oL9gdHvUNenhcevc2EDp2M/g8LyHhTdjrIBAaisFINFSglRaeElKWsn0GPIO3z7rwe/nT84dkOknxIcwIIgU+PnbropKlt6cKmQS8hpVoDGR17C+lqy+BVcE3363W11zGKluyZbcoFasUlVNXKsYl+aq4Wnrrrei2vfP2BjmWD74bOb3sQbqPR6p+vYjRIUa1eoVq8SJax64KxrqR+qldm6T4d0gyvb6qMDtb5VcYNasUNRBq2aUWYob7hoK0a+fI06Wv0QLbVRg59eZUP+CS3v9KjVx6Q++uyxfeI6peMgq45DNSyjbDKSNg60XU4Bpm+5inZ0a6ntNfB5v0PAiEhmKwpHuhlOn6EunpifteeP2Syec657Ei5Ai+9eqarKLigjPPcM7b0iZYtkv82ZbSdWpJvXp6OyVBDC6YkG/rDxvZlFKx3aKPgLPRim7b2edNl3SRJg5pD2ivALXeqKsosaF+rLSO7cyGkXZXoDbDPP8OQfrhXYf/uH2n4Y5dsyqoBsKQcbbd18fFq3MMJecw7Qp2Ti8Nbb3/RY0cV5Wsq2RrbDz87dqnYQn6oWjIkdpPG1xvgA7oQgdKW/uYp3wHxt3rr4NNehF1awFbF1pWP0pIWRJJpPAZQXnkfZ44l9ewIcWfcewl14yCuhiYrJFhk6HWq7IpNTXXFhXD2wo4G60AZRvclq2DSBOHtAe0V4AaqEZdq1VrTEPr2M5sGOnaFYZ5gR3i6o5dsyqoBiK/rYyzv0iy61VbyTlMu4KdU9IV+spd9b/RG7hUOOuiwRkZqHzqFb9CiuoH15HqgC60MbiuZnuZp3xX6E+Wvw426RWw+1eKwRmWCjQSbSFlEin8R3D31kp55M84+5/nFhfpr8QEl9ewIcWffdALAi+1Xlup2FUc2EvA2WhFtw1u69LEIe3xx1UlWG/Uv1pDSdXObBjp2hUG/h3ihV2zSlEDAWSvo2Scbfd1BWn7qq3kHLJdYOfEgauGtt7/Rm9IBldC3gDhdaENd1SKj3l6ZmA8WT462KRXwK5RVwzWMVSgjZUfiQiBIygzHvjwnb+urKi0c7oESyyuw4g/21K6Cr0gIratPyzYSsV2izDGS8DZaEW37ftjJujSxCHt8UGvQVcJ1ht1FSU21I8lEdg2GEbaXSEFDXw6RDLY2DXbA6F+QhMZZ9t9fVzsq6ohXck5TLuCndO4DRR6/39x9Kih7+1FmBvAyymdQGlrH/P0zMbdK08WMrjqYJOeB5t+QzEYixt5d5WwVKBVilO4ryDvY7JH5OFGPTW7wPWJiCxhRtDJ6oPE0rjQLj1h7Bt6V6S0B9SP4yiw3H10a28Yt1MH2uJgERJfAv4aNmpgAR5ewLmPSRO70q4O6fN0X28c7QpdaA4WIfGF4s+EEEJIADHbWRJCCCE9D4MlIYQQEgCDJSGEEBIAgyUhhBASAIMlIYQQEgCDJSGEEBJAnILlsTioHm5aW+bz9RxCCOl16mv3vrz+beeknaCsrrcaF8K77OVga7BUqkxASQ51Hx0QHjrQ/TLUHUBvC8c1DSdf4PZpup40iRDSreBxdp0tn4yJNvKml54fO/Z0OTZsVp+6lNlVqQ4A+dhk1rCczE8OxG4qE5ddB07kYoC47OVgm52lEsMUySEntaOgl7tWsDe/V2WovdDbwnFp6c8k3aAnTSKEdDeGdLAElVhoIyNgbF5XnzVooG0zdiDLKvZ/0wQcLY63Xl1Tl18MN5HSUFmxN/Vd6LEFQ3fWxOnbsMplHBsDh33kocFJSUc4KAoiXg4GvIY1Qq5adEhMNq6qoC1fqjUEe22tY5FBRj3GWkZAEaXxi1MfS8LLUOsFXdtCurimt254bdSg1gSG+7ikN+1qktSAU7ENB7J2wy0rB67WEkKiBmbYuGgjf3mkIW30iBMSiBSmzbX7dt+18Je4gEvTiktEZk605JAyZOg/RKsuZ9QYWzgvyiiXnXONgYOy6tdtxszc1PT1d5ln5AzLQqKrg22CpRLDFM0ETNk+Yrb/+cFW46qhGKwL9tpyu0oG+fNPD3qp7CqNX39LwstQIwT6t4V0tat2VRj2sdZw32jayZQyyfQlpeGMaLprf/P2yq2Ix9veeKPonDE+1hJCehdb/DlGDB99mus3iqt3bHaOUgED/xZMLxGJHiDywIIuMBcLlMvGwGVkDP7t0zdPHgkmX3ldieoW20H317DyetNfzNa+mt9WMVhHvfhWcrtKBtlHZVeJ6/pbguOQMtRh2lL1uyoM+9RguG80rbB9EVngvQf3TJ01f+Lob3fU7DrwSSbcCaM/TAjpeTDD2uLPfQDMSM5RaqbCv8pT8Ozvl+rKnXHEHjjM7VcvWF1VB6pWL7jaZyj9XsP6i9naV3FgKAYrwV5/ud1AlV1/S3zQCwqBbSlfFEZbPjXo7ttNC7YvGL+JM4aXP/tM1ilZBVOmLLtjydCCsRJNw+sPE0J6BUP8ORbU7/moye2vkDA7LXngaVzC9mZjRbk+EyKoPF31lbylBK47gShjuywDp3Yv2Gv9MP9U2SkB20G/YImtktKntcVsh+WNN66qH9hEMVjecYtgr4/crt6Kl8quvyXhZah92vJSaQZeXhs1GO4bTTuZ3HxBImLkiy/Wjs0bnjE0+/Cuw0XnJF+A+FhLCOlFsIA2pIPl5VkstJEHDspK23Pw6ybEDtNmzDnF+XWY6+AXtjeYnRAjZQq6uPihirJFsohHgDF2FBFHuWwPnP6euaI6e/bMScjv6iAlupKgB+9eVv7wIzfLrdAucMOtWPzQ7Duu51+6EkJiwXMP333uFb9W/xteu4jpjBfeZS8HA/4alvhztCs0gQkhpCcpmDKlcmvyJ8kO0PBpbeMPTo/djBfeZS8HubMkhBBCAuDOkhBCCAlggPNfQgghhFjI+1e+hiWEEEIC4GtYQgghJAAGS0IIISQABktCCCEkAAZLQgghJIDWYKk+awSUKiYhhPRVRFYvN/dS0c4DSj5Pvm6tUJ9JswX4JKd8Ok5SoqxDor7KaTio0tXkb+SMpoPGCKphAvqwAnsEjRTdQfcI2NzCh+/8NStrXM3BurqDNeOysv76zofOBUII6XM0Nh6ef+H8VavuHjXqp6K2hDlQ5r3KipUqESDnT0eNWllRKafAzqkOojx/wmx40dT0zW1XFukOqslfPIXxds4IOmiPIGz7bwVXK78U9gi6jqnUozrBudCC32tYtbKQEK1WUhJ11amsMrAxLZx5zTUzCyXDPQsvx4ER2wkhJCJkZAx+YuMTo4YMc85T0gUibFC9Y/PIwjOVQl99zc73084qmV4gp8A1pxxkDcuZMW28Eq+IFDC79PKpIq/hJKWo3bd7/LQZOcOyEokTziwcufrlTa45o+agPYJe2CNop4B9+/5UvmEbLm0+MtBFScYJmqm46iSlpdkRWMKsisZ2EFZrE6kHKdyhEkIijr6JlI0Upi+ZyiQDQJ7UvJhELtk5ZSaUPECfQqOGzMy6hSsWX1N05W3fNIGkX0oZUM8ZWQf1ERSDxULxSOWRRCBDZqfoxV29a7OzlDLouPKKjdg7yq+YmZlD/rRvn6wjnnvohn8UlsyeOQkrEQThIZmg9eqgQadnDRqYMTR7cv5khOWBg7JOHzQoVTEhhEQdbKTue+F1TIvlK3+TNyJbV9aT6RixZM60oZVbd9s5laqwBJXIKlgdO9b06IK5Q6fNES0qQdd8Vhg5Y+Hg8Jzc9z77DEYi7B3auKrqgwPOBWsE7ZRNa8smTb7pL/v3o+zjc0uM33SBy2vYS+cslmY2vbwaSwy1oEDsvPPx7SsfvD6Rnp6DvmoJ5gAbdilLCCFxB/Obc5QCp0eOHBAdewMjJ9i2ofz9tLPG5nVE/aq7Qfy7a/Yl29IKXluzRJcjhBfbN66r/bSh4dPadRu3//qyqV45QZQdVBw9VLejocE5cRtBO0W9UZf3zE6qjkQ7oN6jqp24vFBF4uTJ+diWYscpRSRMqlMppV7MIixjZ4kUibJ8DUsIiSDGe0XMVPqrOeNFnJru5OWenVNmS6De6UUQZaSgT87KQXkHa+eMoIOdGUE7Ra9N5dHht2EJIYSQAPhRAkIIISQABktCCCEkAAZLQgghJACKPxNCCCGeyF/28A98CCGEkAD4GpYQQgjxJS3t/wMwVcDUj0MKuwAAAABJRU5ErkJggg==")
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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 10.6. Nieujęte aktywa z tytułu odroczonego podatku dochodowego i niewykorzystane ulgi podatkowe
    • p (class="pt-Normalny-000136", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W ocenie Zarządu nie ma pewności co do rozliczenia w podatku dochodowym pewnych aktywów, wobec czego aktywo nie zostało utworzone lub zostało rozwiązane, poniżej specyfikacja:
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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bW1Cb9OAgDAiMv4WUdo3Ch+vixp6EWoBACAUYApugAAAAx8/58lAAAA+CFYAgAAGCBYAgAAGCBYAgAAGCBYAgAAGCBYAgAAGCBYAgAAGCBYwkhINtbilYQAEF+DDpaDfzNrsrFUzEwJEaijU+imzOzMRG1h93Ln7UuJ2iF8lW90e9O6OKkovGMYwtDlYb+TmojLRE9RkuJ3S3PrrnwM6BPkSYtzA/XKBzQ5sBeEQQfLzJ1NMrXokrbUix2mCuhG7EBniy4SNmfMiEvr4iyo24rXKUIEMfmuck15U5KN1WK23d6GLmfG3tiwJx+2627Vb+C3EzZnlNrCWDcwoPJ6kxMb6sUsV2JCZVWawdKNu050phRxo/bHZHkLpwWeQjlowb21e27ybHc7m3IMeQhir6rHaPSVI7exVFqp4BOesDXKIDiPC8pBnFLUspVeiiiW1pyKaYfw5Axustxd7uQeTNZKlivekBt9IAcrx97sL1Aenxbk/r6coi628Pw2uRPPxLaZWpRoa+7kV6bbEntLcAU8qe4eahbOv7tnXamFqEbA4YZ0yAvjkphttyByasPM1tvdWbPcfrRlM/mv9j3kxrqBEZUX0z0Wzi1pbqMbRLJxfVfVMju3wo6iKettKBEPU+01/LFKprTXOFNROksiC60SliI2OLuKf1kJDQ0lzlOaW46zSBlkEuOse8vx55KbFW4edlDneE4pzu5KDfSDq8Vq24iSpuR0D6LUyVMbe0lvu1orZVcSfCBKje5MkZfW/CfFLU3uQ8Ly25Q62Mwt6m1oqBFJ3uMoq74NJPI4vKnBuzsZZTbayvsmIL9+XACJrhzBvXJEgpPiJhBxwcWIqL7TPPrQ2Os2nhjrBoZWnjYon3zebCVBMowsnUd58TSuoBAslrhkT1dnPZ9p0hkDlS+voSid7LGq1lZZNKalBxU7WPN0NsQQTzBWc3298zRD5Yj4zzgPAEoSjZSduTM95dCQem03q4BeV9mOwvpOkeASDQmovy2yWLViEYcIajLnfdTR204pYs0VeSAS3ZkhJyWs+aEn0RbQOYYWFdTVLecr3k3hFSDyjIe3PXh3d0fJcLoBQpQ3iXtme7H4zk5LkQl0/43hzPSi+vSRtr9ioc+wGzfZZz/mDQyufLKxtMJqd75ZpxtMtbWJsmyyqrVbviFYOuWbf3FSelZ+qU832q62DS1WUfmyKqt7g7zNshml22qVMT6F+XarwjlDXT38yzC6oeknhH2Nvla0zF+OXdt2S/syncbU/Kt3z7OSV1D9hbBiVaZDaE3mRFNFS/W2U4od4lzmthg6M/ikhDc/7CQK/s4xtUhSNjHhFXDPeETbg3ZXLxW/8MMBRPJfyEEp9FSsPgnGizIOUm4+3vbEuoFK5dmfHq51wxudyRp+yyhYVlWi3p9s4n6RIrpLifGrs+RJEWW6Y1w28nWy+Ye6zqpSkp3XLUfkcDLwRc82tu7mUrfIBG+ReplyScnkHI7I1OBiZU5l74CcYs3ZwlEKsXdRM3G+QiihxO0mIaJKLEms21ndzGEnxc3pVMYRdhKVfUQqrZtbJL/t9O3t5lQr4NlfyeKWoR3IrSzHd3Sz8SV/fqViAH7K5eJeeiLBSbE/KZ6EOJGVdz9/bhNFg8ZGA2XllSZrdw3PXYgbpfksaexLo93BP9EPVTkjQK8qpWwo2joqfyY6TGLdohhdSwAw4gb9v46cleTTLZb327yzM1TljIAYVXU8okhZWI8TBABhRmlkCQAAEB+jM7IEAACIEQRLAAAAAwRLAAAAAwRLAAAAAwRLAAAAAwRLAAAAAwRLAAAAg0EHy8T4m/w5rMKD6graOYVeiF1fAQCMCYMOluXjbfLncMPVFSPeEAAA8EozWNLIxp7WiOE3cHes427j4yt5j5cjLspBC+693xMF2O52NuUY8hB8SuHRmvzZcxiFWgjt4+a00apxJmS3Zs5EUf6q0i5KQwRWjr3ZX6CsIi3I/X05RV0AACBl6Y8s5RQNbIJGBZs7ULx7v5jPfcbncLQSbV0lfDa03m729k0nXZ3dsaexlE2VwgZmbjnqzE9VbI6xpvKCuq32m+FLGjbV1XnLYS9f5W+TZy/ypoztfJpftmbPI0WcadlsvoZo9TeSR6QKiYld/Oxqy8PqTWNzkYuDihfg+6vqbQgT1VdhfX4WrQMAAMkQLJ1xjjpi4sbL5M8RCpZVWfYuhfXFoiE+otoFmTu3MwAMtfDb5hgxPhtoCJbOOMc861LQbLp05x4Lkz+HoZFlMR+dhvWPaSZkEUUVIz63MwAMsdRvmzE1Phs46D/wkcpXV7XwsYsbj8uXFzc3s1EXDcK6mt059n2rTHlTL+1PO7rlFIoRpIJiCf8Bj//yppbj/ChX4ZRLQ0bxUx/LxvYJH66RoPozcues9V3e+OVuCf0hsKWabaSRpx3f9aaxcO8pPKiqbkOEyL4K7vOw1gEAQAow+fPZS9SW9qy2jx1YDUocY3M7AwCMV0M3skzHUM2EPLozKtMYTvwOGDAGBgCAsQOTPwMAABiMzsgSAAAgRhAsAQAADBAsAQAADBAsAQAADBAsAQAADBAsAQAADMZOsOzv73vgzjv3Hjws1gE0hw/ubUu8Ilbsa+bxjY/39feL9WHzSqINVyZArI2dYHn07YMHrBl5F+WI9bPV89pLS1bePQI3UN2pU8fvXHrn8VOnxLpikLWiIPHvDz0uVtInd0+xGpT/zjsfGJU+jEDd+9h3/6e87CNi3bIe+1rNBz9yZfaECWJ9eFCnPfLrt/LzcsU6jCF0crOysl56rYeWtzzZbL+jhMnPvynwg5zJ6GN7+dSpzU9u4av0KHn3yiW8ObyB5JF77Td4KilxwVtHNZ869XL+5KqnGM6g/brYs3fy5LFVS1YdO3lSrI+ejtamF3fsESvxNHydeehAct23NouV9A/k2z0zZc6lCONEX9+Zhi+tX7Vqie/OE4vPiw99fNZ/qeE3nc80tXbwFLqj8mVqzqpV95/p69uz48Xb7nmYUmL9WaN28VZIekrgGUxvZClHGHwM9NbRI/fXVD78/MNTJk2iBw166OCPG7TAH08oUNOC+oRSfe8jvJybb76ZojqtymBOQ5aT757Uc/LgL1PU0tSHoF2vHrmsIFctWT+ueqz1a1YE1la2kT8zEv7coe6745Vn+bL+kEIi6kn0WlFn3pSfT6uTJk15Zt8fKUW2ghL5SE7WSh6I7yv7nGrLU/gyK12pHscP/dDjP1PPmixZjmvDdicys9obe/fu8pVAC1/7ciNV21eUbCmhQ4d1UdiFpFdMdtSKNevVRumd7Os3X00ohRhPse+kBNZHPYpejbCm0QLEzsu/2LTgH26ZN226WHc89ei66667UqzExMSJF37163UXnHueWLfNmZVH/71gco7Ve+B0X9/BfbtvX76YUrKzz5tRaB098a6dK35K5xWJJVvPzq28XVLgGRzU17DnTjj3K82t/BHjmiuKFi+/fWPbFroNdb858HrHNnaL/8OfyhbN2f/G9ksrv8KD8/UXHuG3ldzchdsPHdp03x2LV9TQA9r9q1Y1bfjCW72/1XNWfrWRVulZ5vzOnXQjlqVRypFXd/Hv+o6+ffDk3868cOJEtWT9uOqxqlbWB9aWSuCKrriG79vSdFfHtt3qvguuul7dxPOnUk+i1+pwcteyBx/lOT8x62KejbeCjlg25cTBt4/yRLJ7W8ddTS2UmRpIq7zPaWFL20Z5vn0154nvvf/OvdXLKtZ8/1//6e/Vs8a3qgJ391F74wPZHxCpGl9RsqWEDh3WRWEXUmDFeEc9+eBatVF6J/v6zVcTXpTxFPtOil4f31ECrsCQptnFQ5zQSXzl1dMLPzxTrDvogWnnkQ/p6bGTN2vOtQtm03OefIinoMI3xRedtR9+4xfyE0fPrNTA1p7p6vkKO4OGYMnLSvH799yCyyhO7D3Q+9GbV86wDuxMdu//06S8i3LoeYQ/oZBTx5OHjrCicgs/KH8rontKTlllfl5uYE6OnmVmf4QFEspTW1nGT+H//v4tvlV9EJAlB5YmjxVWW56fULfywUdZZS1Pkfvqm6ToehK9VpTCV1W8FRMmZE+Z9p7aD3RD/8vOTVQsH6DwVuw/vH9n5/k0sOZ5AquXeOjfW7a7eSJEtE4le0OsB/EVpbadhHVR2KkJrJh6IUl6J/v6zVcTKfoU+06KnifiKLwaxqsO4uLnG79z6+er9GuPHpjmly3S02NHPgvSs+xnbll8XnZ20bxSsS2e+vv77q+p/FzTN+Vd6477NlEDv7+mYln1vfJhPewMGoIlL2vv3qf4oC0aDeRLK3JbNv9wxsz8RWXzn2trn3blZXRIekLZve8gZaC6Hjty/vRpnqLojtOw5omq61moi87JUR75rfrzTzxA5VMJaqiQ9NLUY4XV1t6VefXZli+2JugoHa1NtKru69sUSK+nTPfVilK27hTfBEqHe/9AJy+wH+ik0OX74k8TlIFaUXnH/B//4Mfz76iU5yiwejTwTbR+sbLmfnlNhEmldWpvRPAVJdvOhXVR2KlJpWKc3sm0rPabryac8RT7TkpgnsCjyF2MVx3ExS13rdm4+p/pwWjVuh/dvPQW/jUYXUKtj7xu/FzEy+Hkrp7sbLpK6Xrm32P19Z0+0GvlTL6AZ4iLx75WU7Hm+/rXaROnTS+aMokvR5zB9L6Gzbko7/3tP6Dr49JLP/Zu7jmUQgOpyVN7+A9FtHrlddf99KcHKW7NWVT27KZn+Wh35ocXvtl6P+2VnX2uPhahOw7/qWnJyrv/rvDyiJycLI2In6OSu9RQIenHVY9F97LA2kqU+PmlJbT7dzaz2ZLVfS+ZfxXfFDH20uvJ6bWilOk9rZQie5UcPrx94fTplOd30+ap/cB/V6OhmLzJ6pWXNfdVjx4Vv1J5ac3XHlPPmn5Ow3ZXqb1x/oXTfCVIvj6Ubec/8oV1EQk8NdEVUxuld7Kv33w14SUYT7HvpOj1CTuKrAbli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    • h2 (dir="ltr")
    • span: 11. Zysk netto przypadający na jedną akcję
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    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zysk przypadający na jedną akcję dla każdego okresu sprawozdawczego obliczany jest poprzez podzielenie zysku netto za dany okres sprawozdawczy przez średnią ważoną liczbę akcji w danym okresie sprawozdawczym.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rozwodniony zysk netto na jedną akcję jest równy zyskowi podstawowemu, ponieważ nie występują instrumenty, które rozwadniają zysk netto na jedną akcję.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-000006", id="_Toc67549868")
    • h2 (dir="ltr")
    • span: 12. Rzeczowe aktywa trwałe
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa w sprawozdaniu z sytuacji finansowej prezentuje aktywa z tytułu prawa do użytkowania (umowy leasingu) w ramach tej samej pozycji, w ramach której uwzględnia aktywa będące jej własnością, poniżej wyodrębniono te aktywa oraz wartość amortyzacji dla tych aktywów.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Aktywa z tytułu prawa do użytkowania stanowią głównie umowy leasingu samochodów, regałów magazynowych, magazynowego systemu transportu wewnętrznego oraz umowy najmu powierzchni magazynowo biurowych. Środki trwałe ujęte na podstawie umów leasingu zabezpieczone są prawami leasingodawców do składników objętych umową.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wartość netto środków trwałych sfinansowanych pożyczką (nota 20) na 31.12.2019 wynosiła 74tys.PLN, na 31.12.2020 wynosi 45tys.PLN i są zabezpieczone prawami finansującego.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i) Środki trwałe w budowie w leasingu to nie oddane na koniec okresu do użytkowania aktywa z tytułu zawartych umów leasingu.
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549869")
    • h2 (dir="ltr")
    • span: 13. Wartości niematerialne
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa w sprawozdaniu z sytuacji finansowej prezentuje wartości niematerialne z tytułu prawa do użytkowania (umowy leasingu) w ramach tej samej pozycji, w ramach której uwzględnia wartości niematerialne będące jej własnością, poniżej wyodrębniono te wartości niematerialne oraz wartość amortyzacji dla tych wartości niematerialnych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549870")
    • h2 (dir="ltr")
    • span: 14. Inwestycje w jednostkach powiązanych oraz pozostałych
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poniżej przedstawiono podstawowe informacje dotyczące jednostek, które konsolidowane są metodą pełną.
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000092", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): *) 99% prawa do głosu posiada Auto Partner S.A. jako komandytariusz; 1% prawa do głosu posiada komplementariusz, w którym 100% prawa do głosu ma Auto Partner S.A.
    • p (class="pt-Normalny-000092", dir="ltr")
    • p (class="pt-Normalny-000092", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Inwestycje w jednostkach pozostałych
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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    • p (class="pt-000006", id="_Toc67549871")
    • h2 (dir="ltr")
    • span: 15. Pozostałe aktywa finansowe
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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src="data:image/png;base64,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")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Nie wystąpiły aktywa finansowe wyceniane w wartości godziwej przez wynik finansowy.
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549872")
    • h2 (dir="ltr")
    • span: 16. Zapasy oraz aktywa z tytułu udzielonego prawa do zwrotu towaru
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 16.1. Zapasy
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Towary handlowe są zlokalizowane w magazynach centralnych oraz w magazynach filialnych, są objęte ubezpieczeniem od kradzieży z włamaniem i rabunkiem oraz od ognia i innych żywiołów.
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Zabezpieczenia ustanowione na zapasach
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa ustanowiła zastaw rejestrowy na zapasach jako zabezpieczenie kredytów bankowych, szczegóły w nocie 20. Wartość zobowiązań zabezpieczonych zastawem na zapasach w poszczególnych okresach wynosiła:
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zgodnie z zawartymi z niektórymi dostawcami umowami zakupu towarów, otrzymywane dostawy towarów przeprowadzane są przy zastrzeżeniu przekazania prawa własności tych towarów w momencie całkowitej zapłaty za dostawę. W ocenie Zarządu Grupy przekazanie wszystkich istotnych ryzyk dotyczących nabywanych towarów następuje w momencie dostawy towaru i dlatego zakup zapasu ujmowany jest w momencie otrzymania dostawy, a zastrzeżenie przekazania własności stanowi rodzaj zabezpieczenia dotyczącego zobowiązań handlowych Grupy.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Zmiana odpisów na zapasach
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000173")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Na koszt odpisu aktualizującego zapasy składa się odpis doprowadzający zapasy do ceny sprzedaży netto oraz odpis na towary niepełnowartościowe i uszkodzone.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Wartość ujętego kosztu zapasów
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Jako koszt sprzedaży Grupa ujmuje głównie koszt wymiany gwarancyjnej towarów.
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 16.2. Aktywa z tytułu udzielonego prawa do zwrotu towaru
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Klienci Grupy otrzymali prawo do dobrowolnego dokonania zwrotu nabytego towaru pod warunkiem, że towar ten nie nosi śladów użytkowania, klient w tym przypadku może dokonać zwrotu towaru do 14 dni od daty zakupu. W zakresie zwrotów towaru tytułem reklamacji Grupa zobowiązana jest do stosowania przepisów Kodeksu Cywilnego. Grupa oszacowała wartość przyszłych korekt sprzedaży z tytułu zwrotów towarów przez klientów na podstawie danych historycznych w zakresie realizacji zwrotów oraz zrealizowanego obrotu w bieżącym okresie.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-000006", id="_Toc67549873")
    • h2 (dir="ltr")
    • span: 17. Należności handlowe oraz pozostałe należności
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i)Oczekiwane wpływy z udziału w grupie zakupowej Global One Automotive GmbH to wartość dodatkowych rabatów w zakresie zrealizowanych zakupów w danym roku obrotowym. Odpis aktualizujący utworzony został na należności terminowe.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (ii)Grupa wpłaciła kaucje zabezpieczające w związku z zawartymi umowami najmu nieruchomości. Kaucje stanowią zabezpieczenie zapłaty zobowiązań z tytułu najmu nieruchomości jak również ewentualnych kar umownych i odszkodowań.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Kalkulacja oczekiwanych strat kredytowych dla należności z tytułu dostaw i usług dokonywana jest w horyzoncie czasu do upływu terminu zapadalności należności. Dla celów oszacowania oczekiwanej straty kredytowej Grupa wykorzystuje matrycę rezerw oszacowaną na podstawie historycznych poziomów spłacalności oraz odzyskanych należności od kontrahentów. Matryca przewiduje podział należności na grupy: należności terminowe, należności przeterminowane 1-30dni, należności przeterminowane 31-90dni, należności przeterminowane 91-120dni, należności przeterminowane 121-180dni, należności przeterminowane 181-360dni oraz należności przeterminowane powyżej 360dni. Określając poziom ściągalności należności handlowych Grupa uwzględnia zmiany ich jakości od dnia udzielenia kredytu do dnia sporządzenia sprawozdania finansowego. Koncentracja ryzyka kredytowego jest ograniczona ze względu na duży zasięg bazy klientów i brak powiązań między nimi.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poniżej wartość utworzonego odpisu w odniesieniu do wieku należności handlowych.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poniżej przedstawiono zmianę stanu odpisów aktualizujących na pozostałe należności.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAoUAAACHCAIAAADvHLShAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABdmSURBVHhe7d1/dFTVtcDx5L0uBoQE8gK2iUEhgUAsRMBCChG0BGjFVZEy8KQ/xPZhAHGJXdW0QCsLVPyBXZpXa0xgYWlVahp9oK1ZAqEqEkp4NRhUakhAS5pYMYZMojB5rubtzL65uZk7k9/mzsj384fce+45596T1ZV995lpdmRzc3MEAABw1L8Z/wIAAOcQjwEAcB7xGAAA5xGPAQBwHvEYAADnEY8BAH2pvPRAZKs5S9e+cWhPUtKCsw0NxuUw57c6b1OTtPTJAonHAIA+U1NVuXjuwtyCoubmZo+nbnBJ/pUzvmlcC3/21WXet9241mvEYwBAnzl+uKhxaPqSeVPlOCpq2JqHfqrt55vOr106R9Plcddcc8Xw4cs2PNHQcHZBUpLmmnIq3czsU1NPHRs67Kt7/anC6vpaOe39AonHAIC+NHra5YNcLuOk1aZffPdIxNQ/7dg4ZOCg8ldffWxv8Y6NK4/syf9k2pLzXm/16YqPC4vPNjRUnTyecePPpGXfzvtdAwYYg0NJwNWJ3i+QeAwA6EunSt455/UaJz4nT76Qk7PvkuTLNAIlJl4/cUycHJSXHSz6/QMDXa74kWPeqa2XlqnzlgwuyZcWzSZDkH11ok8WSDwGAPSZlLSMIfUH8/cckeOGhrPZWQ/KgcSn0rdLjv765wdKy329DMmp6ZosNjc3V1buHhYlhu2urHz3jddef6owBL8CZl/dVd+/Nn5obJ8skHgMAOgzcQlJj+RuXuHOiIyMjI6O+WTakr8Wvyzto0aOl/ab3Xfpp63KTBbNz1Of2LBMjsdNmSVxTqKX0S9k2FeXt/5Heqn3C6SeBAAAziM/BgDAecRjAACcRzwGAMB5xGMAAJxHPAYAwHnEYwAAnEc8BgD01v7n8vKe22+cfOH0z+qIxwCAwLpYSVC63ZL1J62yEEZCbXXEYwBAryRPnql/DNI4/2Lpt9URjwHggrb/ubxIH60VqMfC3KE1Kwmeqf3ArB6omaVZPVBoi7XC4IHScnNyLUGoxwHHflB7Ru5iFiXsSubaFf2zuq4M73SBxGMAuKDNXpTp8dRdn5i4xD13yvR5zT5FBbn5BXsbz5+TDmYlwWOvvPBWxIQ6j6ibEPGWllWIjU2tOF1dfbpi5Jfqa+sbzQqDMsnMycnm5OWvvto4NL2DsZ+c++yHWRu0ysL+Xdv66u9X98/qZPJOh3e6QOIxAFzonn54jYSZZd++qqaqUrPYDPcKvWStJFhedlCr/7pcgy6fNlo7DB06KnboEDmoq32r+kyD9NF2k05+z13f6XRs3JiJEsle+etfC596ffkNs7VP7/XD6mTyrgzveIHEYwC4oJWXHvj5r4/mbrldYtLurZsmrb5XM0i9aq0kmJyartV/az+semnv0ZTEBO1jZfZpavJ6PI3m5DPSvtnp2KioYdd+/6qF3/iGJJpaP7j3+md1MnlXhne8QOIxAFzQ9u/aVltbNmZkfFLSgvHfWPjbTausGaQwKwkmzpgn6V1MdHT8yDES2GZOTjZ6WEydt0T7uFwD36ysNieXCSUZ7XismH3DcvlvHxZb7J/VyeRdGS46WCD1FgEAoaKmqvJbk9Ie21scLJ6Fuw4WSH4MAAgVxw8XNQ5N76vN6hDUwQLJjwEAcB75MQAAziMeAwDgPOIxAADOIx4DAOA84jEAAM4jHgMAAmhq8q5dOqdbdX97MMQpIbg64jEAXEDMv+EsDpSWWxu19JCp9sOqQ298lpGWIsd+HQJOInTIZbH/53dVI5m2aDyzz2Dv0wP9sDoZ0sWH95vWrzaUNloRjwHgQvLZv7966pTXe/5nN2ZsfOhJb1OThI2lGf8VMyHW6NDq+OGiL02ZnnBxrL1DU+O5548e09JGOom265CRw/7D7+p7b5fklwyu83iKCnIfzMo+29Bgn8HeR+fsns9/dTKkKw9vn9asDSV9bnbfZV8g8RgALiBxo0YNi4ryes+9U3JK6xrFJSS98u4rN179daOHjyR8ewvyl7jnBuxw2fgJSQlx1kJGwhxy+aSpflf379qmtY9S0jK0cKF9Bnsfbe+WflidDOnKw9unLS87qI+UkJhSX/+efYHEYwC4gOjOanR0zMH6IXffssBotZGEb+veM7qdG4z0eeD3RRuyfigxRk+tQ/yuaiiSA6086OvSpT7d0m+rE919+OTUdK1mMW7KLKOpPeIxAFxABgxw3b9zX3Nz872rJ827emWwbWFJ+K5bvUqyQOPcprz0gMSV3IIisy6CdYj96j/K39eN35jYCfEjWkobdaVPd/XP6kQPHn72okx5MPHuG6+ZdZGtiMcAgHYaGs4GLJhvqqmqXDx3oUSjzEVGH+sQ+1WzNvDxw0WnPxsqoagrfbS9z/VydaKXD29ubhvnJg3XAIALgVmKX0hEkZbq0xWpscbXjhITr6/zeCSB0wMdYu9gnSQ2NrXidLV1iP2qfvVJW/SmXenTA/2wOtGVhw94X+upTmVFfScAQDtPbFh2KGL6jo0rjfMu6MEQp4Ts6tivBgC06XQ7164HQ5wSyqsjPwaA8BYZGWkcITxpICYeAwDgPParAQBwHvEYAADnEY8BAHAe8RgAAOcRjwEAcB7xGAAA5xGPAQBwHvEYAADnEY8BAHAe8RgAAOcRjwEAcB7xGAAA5xGPAQBwHvEYAADnEY8BAHAe8RgAAOcRjwEAcB7xGAAA5xGPAQBwHvEYAADnEY8BAHAe8RgAAOe1xeOGhrMLkpIiIyOHD7+isqrGaP1CqKmqvOeRp42T4LrYDQDQLfLb9YrhwyW+iLzn9nfcEqYxqLz0gC5nztK13qamgMvRRl2vXVs8PrIn/7qHtjY3N3/00ZtJCXESnm+de+vZhgbjcmgLr6cFgAuNe322xBeRuWh2wJa4hKQ3P/pITvNzV2/aulv7hAuJQY9m7azzeOT59+283zVggH050mf7Y3988sVndIhdWzxOSEx5MCtbQ1pTk3dzpjtnX05MdPSB0nIz7Jtx3vpqs2zDE74JWtjb7WOV9Fy4cKF21rcJuenapXO0s441U3Yhj7H/uTw9lv5vHNqjxzLtscpK69Na57G+hmi72WK/nTK7mU8oV+1zmivVsXKquTVvBgDQS+mpycZRmKipODZppXtYVJRx3p4uJypq2PoH1gwZOEgb7dricfLkmYUFd0pIk2jXHBG5Lq9g1ZxVEu1nTk6WSy3vML44X3T4uPbXVxuPp25wcZk1/Pi1Bxyr4uKmlVRXe73nM2Lqqz6sfe/tktHuddp53rAzErxlhZqyC3mM2YsypfPmVatyt9w+Zfo8bZdpDx193/q05jzyDGeOHJNIL/f65NOPNiy7bn7W4+armf129m76hDs2rrTPefxw0ercfGmRq775AACBDRka+7+P3W1NaewtSlKa3zz4YkZainEeJqpOHl/hztDlaIap7d1aTrvvc2nsXOcenXnfdqPJx8xTM9wrjKZWLtegcVdeYpxYmO0djI0be6kk9QMGuGJGfFJ9pkHWk5KYoJcazlb4tSiJi7EZbt1ODzat+XOJjo758/sfaGPhI/fklwyeOCZOT4X9dnLg102fUA7sc8rLwb/KdkiLZOS+vgCAwCQ13F1ZqSnN0ScKJFWzt0i3Jt/W7C25v5Rf8jowXCQkpuQWFMlyzAxTGru7nHbxWMm8xlGrI3vy7ywolDsVFeQaTV3WwdiaE3/Xbeq6M4PjR0TJfY+frJJ2e4uSGPxo1s4l86bKcQfTmj8Xofv40ihZu2T/7szN5muL/XZybO+mAs65cuMO+V/Sa88W+nUGAATUWF8bMXbkIJfLOG/fsv2+zPlZj8+cHGab1epgmZGbXRR9SezQIXLQ3eW0xWPz09lr3Q9n3/k9SXCHDi/XT2RT0jJumztDLtmT0U51MLampmRafLzLNfBvI1Ll9WHUV6edKtgsPaVFk2CzRT97lhisHxLPWbr2sknTddpfPVUoU1mf1hwlrB8MS/ZvTf3tt9N2v27KPqf+uCRdHjF1ooTn2IsTPi15UlpGj766Me5LOgoAIMz4MnHSd36y7mb5nWlvKS89sGrTb2dNGSeNSUkLwutbOBIj4ssL5MkloAyaOn1YVJR9ObqtO27KrBXujIALjJSEzzjsXzVVldv+8Jdf/Ph7xnmPSGr7yzt+vGTdL8JucwMAAKsA+9VhxOs995eXX15x13+zYwwACGuO5ccAAMAU3vkxAABfDMRjAACcRzwGAMB5xGMAAJxHPAYAwHnEYwAAnEc8BgDAeW3x+IkNy1r+dpmPtTyFn/LSAwGvmgUH+0SwuwAAwpSW39UaPGbJWrMUb1OQUrnhQldkPrl9geafCBUB/15mWzxeuXGHr1xCc87dN23I+qGWTLBLnjzTLKjw+emfuwAA+oeE28JnX1u1ao6e2sv1v/d2SXWyW1qspXLDRUPD2e2P/fHJF58xzgMtcPaizJYQ29xcfbri5tuW2Isl++9Xy/vLoYjpMycnS7qsbzFyoAFfYrscmHlwwHcZbdRu1nL95nuBZL2eRk+w2v7Cr7x/uL8xAQDE6y/umPKfi1NHxBvnrcrLDi6/oaXefNSI+I8LiyVrPLInX+v0aIewEBU1bP0Da4YMHGSct5ee2q7E0+6tm665pqVQoZ928VgLGmbf2VLjYfYNy7ft2i8t75xqPlp0WF5Vav7+T2tRZb8S/Z96P7UW8/cr1y/vBV7v+c2rVuVuuf2DE2/61faXDu712doyuLjMmsX73YUdbAAIOxJKDh05N+2ro4xzH/2QtKA8Xtslocx7fsPVo0dvLji17NtXaZ9wJwv/zYMvWkOnZJtlZ8b7/ShUu3j89MNrJq10axIdN2aihMbK0ye+vnDpyIjTZRXvvPfP6ISLY7WnsJfotxbzt5frl8iqZQ3tA00u16BxV15inPh00BkAEBZe2ParG29b4pfy6oekj2fNv27ZBsm1yksP/OCubSXV1b/bstx91XL7x6thp6nJuznTfUvuL60VCCVZnZSRFjD7b4vHGrTNtxLJvtPnx+U/9ZuRo5LSMibt3fWS3waCX4n+i1wX+RXzt5br18x7ybyWDD1gbf9gutUZABCCFq/O2nbXDySzWrXptwvnLtbvN6moEfHJMdFyINmXfnUp9uKEGV8bUlvfqB3C1/b7MudnPT5zcttmtYTCgieOaii0a4vHu7duyslZN9Dlkh+ZfvVr6jXXPPtsleS7KWkZe3bssWbcImDZf7OYv35gbJbrP7InP2dfTkx09Jyla78y9gr7wGAC3gUAEEYGDHDdv3OfpFU5d9/0P3v/IPmiftdaxI8cs/SWRRImJNDcNneGtLhcA/82IjW8qtpLoF2QlDRuyqwV7gwNoLJAefmYNWWcrMj8NrWEQnMT2q639RblIX76nXWbn38w2A0AAECn/L9f3V2N9bUHS/PNPWoAANADvc2PAQBA7/U2PwYAAL1HPAYAwHnEYwAAnEc8BgDAecRjAACcRzwGAMB5xGMAAJxHPAYA9D2zbG53lZceCP3quj1enQi2wLZ4rKWv1Jyla7v197Zk9mBD5KFvvfX+3v/1rg5uAQAINccPF2mVX4kCVwwfbkYgM9Zo9T97kfu4MRNDv7pusNVZl2OWN5T4pS0axYItsC0ea+krkXP3TVpkw7jQBcmTZwYrvhSXkPT442u7NVtAHdwCABBSJCwdO3Jm4pi4hoaz2x/745MvPqPtEpkORUyXQOPx1O3MevRsQ8N7b5dUJ7u1RaNUVNSwUV/2VH1Yq0NCULDViddf3KE1+6tPV+zc+pwsR/o8mrWzzuORRo1iwRbov1+tP6yZk5M15mtIX71unR5rhSXrJbNFM3f7m448yn0/y5ZnMkfpEC0AJeR9wdPo8RvVrVsAAEJK7YdV73r+bZDLJbFn/QNrhgwcpO1VJ48vv2G2HLhcg0aOjaitb4waEf9xYbEE5iN78s2qvnGXfrno8HHfiFAUbHUqJTFB/jtkaGzEidPnvN6aimP2mk4BF9guHmsYz77ze3rqXp+t7yzx//pySXW1HAwuLtOiUeYls0XJm46+GphvOsYFX3a/OjdfLu3YuFJOZy/K9HrPb161KnfL7R+ceNM+qge3AACEgoYz1Z+MiLHvaJaXHTSOWsUlJOU9v+Hq0aM3F5wyC/AnJKYcLDM2e0NQsNUJeXKtsRgdHfPyyX9Ii7yCrHBnaA5pfuoacIHt4vHTD6/poDSjvM6Mu/IS48TH3mLeWB7lz+9/YLT6SAD+V9kOuWRuqUtkjc1wJyXEdTCqW7cAAISy5NR046hVeemBH9y1TVK+321Z7r5quTX7CkfJk2dKuqgZ448Wz5YcWkJvbkGRtEgKmhFT38E+fFs8rqmqLDsz3nw96RnzxsL+ce/KjTvkEV97tlBeEDQXXzKv5fPwjkf56VZnAED/ixoRP/hMnX3/Un6Bb9vV8jmj13vu9ImI2KFDJMXSbyzFXpww42tDausbtWd6arIehKBgq7OqqThW7nJphDJT4YuiL5El67F9gW3xePfWTTk56wa6XJJ6JiUt+KfnY+NCd4z66rRTBZtlBqGf+5r0A2NJavUTgiN78nP25cRER0v+/pWxVwQbZdfBLQAAocD89FRSrwVJSeOmzFrhzpDIEn3p+PjyAvntLbFg6UN3DIuKSknLuG3uDGlxuQb+bURqUkKcDN+/a5t+Chuagq1Oknvzq9S3PvRS3vofSWeJWbpkWeCgqdN1BzrgAj/3+sct38PanP/Ioz8hkQWAC8fTj9zz9cXLNb52S1OTN+fuh5etvz3Yh6ehoMerE8EW6P/96r4lwfhbk9ImZaQRjAHggjJ78Xef+UNP/i8w771dYuaRIavHqxPBFvi558cAAKBTkca/AADACZoYkx8DAOC8z/fzYwAA0BXEYwAAnEc8BgDAecRjAACcRzwGAMB51nhcuEL/zFdkZHp2hdH2eWi5z4pC46RLKrLTe/tQ3b8pAKBP6N+V1Piif+fY3mIts2uWHQoX1oe3L6eLC2yLxxXZ9+ZFZL7U3OLgmjEaA0Mkgo1Zc1AfCgAQdo7syX8rYkKdx/PuG6+9/lThWV+1Y7+WpsZzzx895vHUXZ+YuPGhJ8Oulu6lifNlORJAtaawvaXTBfrtV+ftMgJwRfayO4rlfL4vLW3LnP1P24Vse7vfwHbMpNc6zH+UpUVvZLlm3LmtxWhoYZvT0HpTuZ6eLoe+i7Y5zQbtqa0tQ22LAAB0JiEx5eTJF45V1OzftW30tMu1CqFfy2XjJyQlxLlcgy6fNtoY9sXS+QJ9+bA68egMo7ElTfadGflyq5a2GY+eeCkzouUf89y42hys3a+hpVtmprWvcZ/W8fZ5fEOMh9J5Wo7at1gEmbPtpr5To0cnc7beOvCdAABdIHmw/NaNjU2tOF0drEVo42tvvGuch4nq0xWpsbHy5OKmu3MCtqgOFmjNj327wr6wk3dv+zzQl1WKsS05s5qQbOweF79zQg9U+/YAA1VeXp7R98Q7xREzLh/b0jj28tYXgmDzt3QuvmOsZcaWFpsgc7bd1Cfzhmtb/rHPOWbNzzO1xZpaAwB6ZP9zede6H67zePJzV6dN+lZlVY29RbqVlx4YN2VWbkHRzMmhW/w4oLiEpDc/+kgiaFFBrm6/21ukW8cLbIvHhdkag8ckT/CdWxRuuaPYTBG7I/jAzJekKW++xLuWgKkxt+JP+cWWcBlIS+e2HDVX4mnb8IiKitaXiCBztt3Uyj5nRMS1uXIombGxf/9WucwcMPIDADpTXnZQN6VT0jImxMYEbKmpqlw8d6HEqsxFs32DwpKsyzhqZbZ0vkCNQsK3g6vadm+NE8u1lvN2W7h65GNv9xvYvltrL0snnSvwPG3XDMaEbS3awyfonMaUbRMa1wy+OdvP2Ho2Ywb71QDQA7pJq3Tz1t4ieaRxbtvEDn3Wh9e96I5bAi6QehIAADjP7/vVAADAAcRjAACcF2n8CwAAnKAfHPP5MQAAzmO/GgAAp0VE/D9n8vnQEU1CzgAAAABJRU5ErkJggg==")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Zabezpieczenia ustanowione na należnościach handlowych i pozostałych
    • p (class="pt-000006", id="_Hlk35337545")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Należności handlowe są objęte zastawem rejestrowym jako zabezpieczenie otrzymanych kredytów co zostało szczegółowo opisane w nocie 20. Wartość zabezpieczenia ustanowionego na należnościach w poszczególnych okresach wynosiła:
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Należności z tytułu leasingu finansowego, w którym Grupa występuje jako finansujący
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Należności z tytułu leasingu nie są przeterminowane ani obarczone ryzykiem utraty wartości.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
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    • p (class="pt-000006", id="_Toc67549874")
    • h2 (dir="ltr")
    • span: 18. Kapitał akcyjny
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Akcje Auto Partner S.A. są notowane na Giełdzie Papierów Wartościowych w Warszawie S.A. w systemie notowań ciągłych.
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")
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    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rada Nadzorcza Spółki działając na podstawie uchwały nr 2 Nadzwyczajnego Walnego Zgromadzenia Auto Partner Spółka Akcyjna z dnia 17 marca 2016 roku w sprawie emisji Warrantów Subskrypcyjnych serii B z wyłączeniem prawa poboru, warunkowego podwyższenia kapitału zakładowego Spółki z wyłączeniem prawa poboru, wprowadzenia w Spółce programu motywacyjnego oraz zmiany Statutu Spółki („Uchwała”) oraz Regulaminu Programu Motywacyjnego Spółki Auto Partner S.A. („Regulamin”) przyjętego przez Radę Nadzorczą w dniu 20 marca 2016 roku uchwałą nr 1, a także w oparciu o dane zawarte w zbadanym przez biegłego rewidenta i opublikowanym w dniu 4 kwietnia 2019 r. skonsolidowanym sprawozdaniu finansowym Grupy Kapitałowej Auto Partner S.A. za rok obrotowy 2018, na posiedzeniu w dniu 9 kwietnia 2019 roku, określiła łączną liczbę Warrantów Subskrypcyjnych w ilości 495 000 i zaoferowała je Osobom Uprawnionym w ramach Transzy Stałej oraz Transzy Ruchomej za trzeci Okres Rozliczeniowy tj. od dnia 01.01.2018 r. do dnia 31.12.2018 r. w sposób następujący: Andrzej Manowski (Wiceprezes Zarządu) - 190 000 (słownie: sto dziewięćdziesiąt tysięcy) Warrantów Subskrypcyjnych serii B; Piotr Janta (Wiceprezes Zarządu) - 190 000 (słownie: sto dziewięćdziesiąt tysięcy) Warrantów Subskrypcyjnych serii B; Michał Breguła (Członek Zarządu) - 5 000 (słownie: pięć tysięcy) Warrantów Subskrypcyjnych serii B; Grzegorz Pal (Dyrektor ds. zakupów) - 82 500 (słownie: osiemdziesiąt dwa tysiące pięćset) Warrantów subskrypcyjnych serii B; Arkadiusz Cieplak (Dyrektor ds. Sprzedaży) - 27 500 (słownie: dwadzieścia siedem tysięcy pięćset) Warrantów Subskrypcyjnych serii B. W ramach ww. Programu obejmowane Warranty Subskrypcyjne serii B uprawniają do objęcia akcji serii I Spółki, których cena emisyjna wynosi 1,98 PLN (słownie: jeden złoty dziewięćdziesiąt osiem groszy). Trzeci Okres Rozliczeniowy jest ostatnim okresem obowiązywania Programu Motywacyjnego Spółki Auto Partner S.A., który został ustanowiony na lata 2016-2018 (całkowite rozliczenie Programu nastąpiło w roku 2019). W dniu 17 kwietnia 2019 r. wszystkie zaoferowane przez Spółkę w ramach Programu Motywacyjnego na lata 2016-2018 Warranty Subskrypcyjne serii B w łącznej ilości 495 000 sztuk, zostały objęte nieodpłatnie przez Osoby Uprawnione. Również w dniu 17 kwietnia 2019 r. Osoby Uprawnione w ramach wykonania uprawnienia z Warrantów Subskrypcyjnych serii B, objęły łącznie 495.000 akcji serii I Spółki, po cenie emisyjnej 1,98 zł za jedną akcję, za wniesione wkłady pieniężne o łącznej wartości 980 100 złotych. W/w akcje zostały wprowadzone do obrotu giełdowego na rynku podstawowym w dniu 25 lipca 2019 r. Zgodnie z art. 451 § 2 oraz art. 452 § 1 kodeksu spółek handlowych, nabycie praw z akcji serii I oraz podwyższenie kapitału zakładowego Spółki nastąpiło z chwilą zapisania akcji serii I na rachunku papierów wartościowych tj. z dniem 25 lipca 2019 r. W związku z powyższym wysokość kapitału zakładowego Spółki z tym dniem wynosi 13.062.000 zł.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rada Nadzorcza Spółki działając na wniosek akcjonariusza Pana Aleksandra Góreckiego na podstawie art. 334 § 2 kodeksu spółek handlowych oraz § 8 ust. 3 Statutu Spółki podjęła w dniu 4 czerwca 2019 roku Uchwałę nr 1/2019 o dokonaniu zamiany posiadanych przez ww. akcjonariusza 2 150 000 akcji zwykłych imiennych serii J o wartości nominalnej 0,10 PLN każda na 2 150 000 akcji zwykłych na okaziciela serii J o wartości nominalnej 0,10 PLN każda. W związku z dokonaną zamianą nie nastąpiła zmiana praw z w/w akcji. Akcje te były i są akcjami zwykłymi, nie były i nie są uprzywilejowane. W/w akcje zostały wprowadzone do obrotu giełdowego na rynku podstawowym w dniu 25 lipca 2019.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549875")
    • h2 (dir="ltr")
    • span: 19. Kapitał własny, zyski zatrzymane i podział zysku
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 19.1. Kapitał własny
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne-000170")
      • img (alt="image", 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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Kapitał niedostępny do podziału na rzecz akcjonariuszy
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zgodnie z art. 396 §1 Kodeksu Spółek Handlowych, któremu podlega Spółka dominująca na pokrycie straty należy utworzyć kapitał zapasowy, do którego przelewa się co najmniej 8% zysku za dany rok obrotowy, dopóki kapitał ten nie osiągnie co najmniej jednej trzeciej kapitału akcyjnego. Ta część kapitału zapasowego nie jest dostępna do podziału na rzecz akcjonariuszy.
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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    • span (class="pt-Wyrnienieintensywne"): 19.2. Zyski zatrzymane
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    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zmiany zysków niepodzielonych
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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 19.3. Podział zysku
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Podział zysku za rok obrotowy 2019
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zysk netto za rok obrotowy zakończony 31 grudnia 2019 przeznaczony został w całości na kapitał zapasowy.
    • p (class="pt-Normalny-000134", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Propozycja Zarządu co do podziału zysku za 2020 rok
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zarząd Emitenta w dniu 15 marca 2021 r. podjął uchwałę w przedmiocie wniosku do Zwyczajnego Walnego Zgromadzenia dot. wypłaty dywidendy za rok obrotowy 2020. Zgodnie z podjętą uchwałą Zarząd rekomenduje wypłatę dywidendy dla akcjonariuszy Spółki w kwocie 13 062 000 złotych (słownie: trzynaście milionów sześćdziesiąt dwa tysiące złotych) tj. po 0,10 zł (słownie: dziesięć groszy) na jedną akcję. Pozostałą część zysku netto za rok obrotowy 2020 Zarząd rekomenduje przeznaczyć na kapitał zapasowy Spółki.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549876")
    • h2 (dir="ltr")
    • span: 20. Kredyty i pożyczki otrzymane
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zawarte umowy kredytów i pożyczek:
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): (i)Umowa kredytu – ING Bank Śląski S.A.
    • p (class="pt-000006", id="_Hlk34803523")
    • p (class="pt-Normalny-000174", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 19.10.2015 Spółka dominująca podpisała z ING Bank Śląski umowę wieloproduktową nr 882/2015/00000925/00, z późniejszymi zmianami. Jednostka zależna Maxgear Sp. z o.o. Sp.kom. przystąpiła do umowy w charakterze dłużnika solidarnego. Dłużnik solidarny zobowiązuje się do spłaty wszelkich zobowiązań wynikających z umowy. Wartość przyznanego limitu kredytowego wynosi 127.785.000,00 PLN z terminem spłaty na 16 października 2021 roku. W ramach limitu jednostce zależnej przysługuje sublimit kredytowy w wysokości 10mln PLN. Na dzień bilansowy Spółka zależna wykorzystała limit w wysokości 8mln438tys.PLN. Zabezpieczeniem kredytu jest: a) zastaw rejestrowy na należnościach od odbiorców krajowych, przysługujących Auto Partner S.A. (pozycja bilansowa), b) zastaw rejestrowy na zapasach towarów handlowych (części zamienne do samochodów), będących własnością Auto Partner S.A., zlokalizowanych w Bieruniu, ul. Ekonomiczna 20, wraz z cesją praw z polisy ubezpieczeniowej, c)
    • span (class="pt-Domylnaczcionkaakapitu-000130"): oświadczenie o poddaniu się egzekucji Spółki w trybie art. 777 par.1 pkt 4 kodeksu postępowania cywilnego, dotyczące obowiązku wydania przedmiotu zabezpieczenia (zapasy towarów handlowych), d) oświadczenie o poddaniu się egzekucji Spółki w trybie art. 777 par.1 pkt 5 kodeksu postępowania cywilnego dotyczące obowiązku zapłaty sumy pieniężnej do wysokości 194mln970tys PLN, e) oświadczenie o poddaniu się egzekucji Spółki zależnej Maxgear Sp. z o.o Sp. kom. w trybie art. 777 par.1 pkt 5 kodeksu postępowania cywilnego dotyczące obowiązku zapłaty sumy pieniężnej do wysokości 194mln 970 tys.
    • span (class="pt-Domylnaczcionkaakapitu-000130"): , f) podporządkowanie pożyczek spłacie wierzytelności wynikających z umowy udzielonych przez Panią Katarzynę Górecką i Pana Aleksandra Góreckiego w łącznej wysokości min. 26.000.000,00 PLN.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): (ii)Umowa kredytu – Santander Bank Polska S.A.
    • p (class="pt-000006", id="_Hlk34803541")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 26.09.2016 Spółka dominująca podpisała z Bank Zachodni WBK S.A. obecnie Santander Bank Polska S.A. umowę o multilinię nr K00922/16, z późniejszymi zmianami. Multilinia wynosi 30.000.000,00 PLN z terminem spłaty na 31 marca 2023 roku. W ramach limitu udostępniono 30mln PLN do wykorzystania jako kredyt w rachunku bieżącym oraz 10mln PLN do wykorzystania jako gwarancje. Zabezpieczeniem kredytu jest: a) zastaw rejestrowy na całości zapasów towarów handlowych, usytuowanych w lokalizacjach zaakceptowanych przez Bank, o wartości min. 40mln PLN; b) przelew wierzytelności na rzecz Banku z tytułu ubezpieczenia w/w przedmiotu zastawu; c) podporządkowanie pożyczek spłacie wierzytelności wynikających z umowy udzielonych przez Panią Katarzynę Górecką i Pana Aleksandra Góreckiego w łącznej wysokości min. 26.000.000,00 PLN, d) zastaw rejestrowy na należnościach o wartości minimum 7mln PLN; e) oświadczenie o poddaniu się egzekucji Spółki w trybie art. 777 par.1 kodeksu postępowania cywilnego.
    • p (class="pt-000006", id="_Hlk34803556")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): (iii)Umowa kredytu – mBank S.A.
    • p (class="pt-000006", id="_Hlk40297293")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 22 października 2019 Spółka dominująca podpisała z mBank S.A. umowę o kredyt w rachunku bieżącym nr 11/145/19/Z/VV, z późniejszymi aneksami. Wartość przyznanego kredytu w rachunku bieżącym wynosi 25.000.000,00 PLN z terminem spłaty do 30 września 2022 roku. Zabezpieczeniem kredytu jest: a) zastaw rejestrowy na zapasach towarów o wartości 37mln500tys, b) cesja prawa z umowy ubezpieczenia zapasów towaru objętych zastawem rejestrowym, c) oświadczenie o poddaniu się egzekucji Spółki w trybie art. 777 par.1 pkt 5 kodeksu postępowania cywilnego do kwoty 37mln500tys. PLN, d) podporządkowanie pożyczek spłacie wierzytelności wynikających z umowy udzielonych przez Panią Katarzynę Górecką i Pana Aleksandra Góreckiego w łącznej wysokości min. 26.000.000,00 PLN.
    • p (class="pt-000006", id="_Hlk34803566")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): (iv)Umowa pożyczki z akcjonariuszami
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 2 stycznia 2014 roku Spółka dominująca podpisała z Aleksandrem Góreckim oraz Katarzyną Górecką umowę pożyczki, z późniejszymi zmianami z terminem spłaty na 2 stycznia 2024 roku. Pożyczka nie jest zabezpieczona. Oprocentowanie stałe 5% w skali roku. Pozostała wartość kapitału do spłaty wynosi 26.700.000,00. Wartość bilansowa pożyczki uwzględnia naliczone odsetki za rok 2020, 1mln335tys. PLN.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): (v)Umowy na sfinansowanie środków trwałych - UniCredit Leasing a.s.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 17.08.2017 Spółka zależna AP Auto Partner C.Z. s.r.o. podpisała z UniCredit Leasing a.s. umowy nr 1251910740, 1251910741, 1251910742 o finansowanie zakupu środków trwałych w kwocie 386.727,00 CZK na okres 48 miesięcy. W dniu 21.06.2019 podpisana została kolejna umowa nr 1132304215 o finansowanie zakupu środków trwałych w kwocie 149.479,00 CZK na okres 48 miesięcy. Udzielone finansowanie zabezpieczone jest prawami udzielającego do przedmiotów objętych umowami.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (vi)jako zobowiązania krótkoterminowe Grupa prezentuje wszystkie kredyty w rachunkach bieżących niezależnie od ustalonego terminu spłaty.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-000006", id="_Toc67549877")
    • h2 (dir="ltr")
    • span: 21. Rezerwy
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i)Grupa zgodnie z obowiązującymi przepisami udziela gwarancji konsumenckiej na sprzedawane towary. W ramach udzielonej gwarancji Grupa jest zobowiązana dokonać wymiany wadliwego towaru na poprawnie działający bądź dokonać zwrotu gotówki. Zarząd Grupy przeprowadził szacunki wysokości przyszłych kosztów wynikających z udzielonych gwarancji na sprzedane towary i utworzył stosowne rezerwy.
    • p (class="pt-paragraph", dir="ltr")
    • p (class="pt-paragraph", dir="ltr")
    • p (class="pt-000006", id="_Toc67549878")
    • h2 (dir="ltr")
    • span: 22. Zobowiązania handlowe i inne zobowiązania
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 22.1. Zobowiązania handlowe i pozostałe zobowiązania
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Średni termin zapłaty za zakup towarów wynosi przeciętnie 30-40 dni. Grupa posiada zasady zarządzania ryzykiem finansowym zapewniające regulowanie zobowiązań w wyznaczonym terminie.
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000143", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 22.2. Zobowiązania kontraktowe oraz z tytułu prawa do zwrotu towaru
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", 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d4DlYa96tihoe01dkGO6Wnb1G7lpHSvvTYRquVNXbrhqtuh+ZXlPiXqWN1BOQ3tu72BnPZ5tZHlEu6JtFdJ78n5pOH14viuuXuTAwAYLRU7XRvm22tKTY2VpbEjUR1DlpqmJrVUMc8JYO+BE4HqldWp8kpp+t+63ePWyJbmaFXrOuNuIlFiHaJyOLK7PVQ1r8LewaADXFE3LnF6nByn4t0uUTvJYqJELcUDXxdZNwOqyFkAAExe6vKfuNZbl35vkAgrZcxQSDrQOU7kanKYbfR20NqaVOgusc6Az5mx+DyvVvtHj8RkLT4irmiW+xwl0lgrQ/WdTeXqHiHaXGFuU5x7ISv6rZsBAEA+sZ/Uqg8+K4xHpJHGAhUgsZSPouNPeFWG+T3OzQXOU2grKZ3I03r2dERDDRusJwFaUolK1NqQ3GjEWkPNFT7f0vJ5Xl2zzj4Zapht3aTYdwROGuuHDomAz9Un/QCAXCBZZIVxlxFWqVhPunOdzzPndM+qFdUvPVZdVm+OshPsSBUq7e2MtRftkbWlqrU1sSYpbWzTB6kCJ71dRQCAycgermnqem8W2Ini2ksXpz0wd4MjEX2uNlrNdzqseErMSPXrIb9fDQBA8NJ+vxoAAIwL8hgAgOAx/zEAAEHSHxzz+TEAAMHjeTUAAEELhf4HH8b2+nqxQ88AAAAASUVORK5CYII=")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i)Klienci Grupy otrzymali prawo do dobrowolnego dokonania zwrotu nabytego towaru pod warunkiem, że towar ten nie nosi śladów użytkowania, klient w tym przypadku może dokonać zwrotu towaru do 14 dni od daty zakupu. W zakresie zwrotów towaru tytułem reklamacji Grupa zobowiązana jest do stosowania przepisów Kodeksu Cywilnego. Grupa oszacowała wartość przyszłych korekt sprzedaży z tytułu zwrotów towarów przez klientów na podstawie danych historycznych w zakresie realizacji zwrotów oraz zrealizowanego obrotu w bieżącym okresie. Zobowiązania kontraktowe powstały w związku z zawartymi umowami z klientami.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549879")
    • h2 (dir="ltr")
    • span: 23. Zobowiązania finansowe z tytułu zawartych umów leasingu
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zobowiązania finansowe z tytułu zawartych umów leasingu dotyczą głównie rzeczowych aktywów trwałych (umowy najmu nieruchomości, wyposażenie magazynów, środki transportu). Więcej informacji przedstawiono w nocie 12.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): MSSF 16 przewiduje wyjątki od ogólnego modelu leasingu u leasingobiorcy dotyczące umów leasingu krótkoterminowych (umów poniżej 12 miesięcy), oraz dla leasingów w odniesieniu do których bazowy składnik aktywów ma niską wartość. Jako leasing krótkoterminowy Grupa traktuje umowy zawarte na czas nieokreślony z krótkim terminem wypowiedzenia, tj. do 12 miesięcy, bez istotnych kar dla jednej ze stron umowy. Poniżej płatności ujęte bezpośrednio w kosztach. Część umów najmu lokali jest refakturowana na współpracujących filiantów.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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    • p (class="pt-000006", id="_Hlk35850645")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i)w tym wartość kosztu związanego z leasingiem w odniesieniu, do którego bazowy składnik aktywów ma niską wartość w roku 2020 wynosiła 759 tys. PLN, w roku 2019 wynosiła 835 tys. PLN. Koszt został ujęty metodą liniową w koszt okresu.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549880")
    • h2 (dir="ltr")
    • span: 24. Zobowiązania z tytułu faktoringu
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000176", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 24.1. Zobowiązania z tytułu faktoringu na finansowanie dostaw
    • p (class="pt-000006", id="_Hlk36208860")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 29 marca 2019 roku Grupa zawarła „Umowę Faktoringu – Finansowania Dostaw” z Santander Faktoring Sp. z o.o., z późniejszymi zmianami. Udzielony limit w zakresie faktoringu odwrotnego wynosi 10 mln PLN, z przeznaczeniem na sfinansowanie dostaw krajowych oraz zagranicznych towaru handlowego. Okres obowiązywania do 31.03.2021. Zabezpieczenia: weksel własny in blanco, do którego dołączona jest deklaracja wekslowa; oświadczenie o poddaniu się egzekucji do kwoty 22,5 mln PLN; zastaw rejestrowy na zapasach towarów handlowych o wartości nie niższej niż 15 mln PLN; nieodwołalne pełnomocnictwo do rachunków bankowych w Santander Bank Polska S.A.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Prezentacja w sprawozdaniu z przepływów pieniężnych: Grupa prezentuje w działalności finansowej różnicę między wartością sfinansowanych przez Faktora zobowiązań handlowych wobec dostawców a wartością spłaconego przez Grupę do Faktora zobowiązania z tytułu finansowania.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000176", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 24.2. Zobowiązania z tytułu faktoringu na finansowanie należności
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 18 września 2019 Spółka dominująca zawarła umowę faktoringu z Santander Faktoring Sp. z o.o., z późniejszymi zmianami, limit finansowania wierzytelności wynosi 10 mln PLN. Okres obowiązywania umowy do 31 marca 2020. Zabezpieczenia: weksel własny in blanco, do którego dołączona jest deklaracja wekslowa; nieodwołalne pełnomocnictwo do rachunków bankowych w Santander Bank Polska S.A.; cesja selektywna wierzytelności z zawartej umowy ubezpieczenia. Faktoring został udzielony bez przejęcia ryzyka przez Faktora.
    • p (class="pt-000006", id="_Hlk65486434")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Z dniem 6 marca 2020 umowa została przez Spółkę dominującą rozwiązana.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa rozlicza należności od klienta sfinansowane umową faktoringu w momencie otrzymania informacji o wpływie na rachunek Faktora zapłaty należności przez klienta, do tego czasu należności klienta są prezentowane w sprawozdaniu z sytuacji finansowej w należnościach handlowych a ich finansowanie w zobowiązaniach z tytułu faktoringu na finansowanie należności.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Prezentacja w sprawozdaniu z przepływów pieniężnych: Grupa prezentuje w działalności finansowej różnicę między wartością otrzymanej zaliczki od Faktora na finansowanie należności a wartością kompensaty należności handlowych i zobowiązania do Faktora (kompensata w momencie uregulowania faktur przez klienta do Faktora).
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549881")
    • h2 (dir="ltr")
    • span: 25. Struktura środków pieniężnych do sprawozdania z przepływów pieniężnych
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549882")
    • h2 (dir="ltr")
    • span: 26. Zobowiązania i rezerwy z tytułu świadczeń pracowniczych oraz programy świadczeń dla pracowników
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000176", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 26.1. Zobowiązania i rezerwy z tytułu świadczeń pracowniczych
    • p (class="pt-Normalny-000176", dir="ltr")
    • span (class="pt-Wyrnienieintensywne-000170")
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")
    • p (class="pt-paragraph", dir="ltr")
    • span (class="pt-eop"): (i)Grupa dokonała zmiany prezentacji w sprawozdaniu z sytuacji finansowej rezerwy na zobowiązania z tytułu Programu Motywacyjnego, tj. na dzień 31 grudnia 2019 rezerwa była prezentowana w pozycji: rezerwy długoterminowe i krótkoterminowe razem z innymi rezerwami.
    • p (class="pt-000006", id="_Hlk49761638")
    • p (class="pt-Normalny-000177", dir="ltr")
    • span (class="pt-normaltextrun"): W dniu 9 kwietnia 2019 r. Rada Nadzorcza uchwałą nr 14 przyjęła Regulamin Programu Motywacyjnego dla Członków Zarządu Auto Partner S.A. na okres 2019 – 2021 roku, którego celem jest stworzenie mechanizmów motywujących do działań zapewniających długoterminowy wzrost wartości Spółki, stabilizację kadry menedżerskiej Spółki oraz wprowadzenie mechanizmu wynagradzania za ich wkład we wzrost wartości Spółki. Adresatami Programu są Członkowie Zarządu: Andrzej Manowski, Piotr Janta i Michał Breguła, przy czym mandat Pana Michała Breguły wygasł w dniu 7 września 2019 r. tj. w trakcie trwania okresu referencyjnego. Łączna kwota premii wypłaconych zgodnie z zasadami określonymi w Regulaminie nie przekroczy 5.360.000,00 PLN w całym okresie trwania Programu tj. od 2019 do 2021 roku.
    • span (class="pt-eop")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rada Nadzorcza Auto Partner S.A. doprecyzowując zapisy Regulaminu Programu Motywacyjnego, ustaliła, iż premia wypłacana uprawnionym Członkom Zarządu Spółki na podstawie w/w Regulaminów Programu Motywacyjnego dla Członków Zarządu Auto Partner S.A. będzie wyliczana na podstawie danych finansowych nieuwzględniających wpływu MSSF16 (Leasing) w odniesieniu do umów zaklasyfikowanych jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17, tzn.:
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - amortyzacji skorygowanej o wartość amortyzacji wynikającej z umów zaklasyfikowanych od 1 stycznia 2019 jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17,
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - zobowiązań leasingowych skorygowanych o wartość zobowiązań leasingowych rozpoznanych z umów zaklasyfikowanych od 1 stycznia 2019 jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17,
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - zysku operacyjnego EBIT skorygowanego o wpływ sposobu ujęcia w wyniku kosztów wynikających z umów zaklasyfikowanych od 1 stycznia 2019 jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17.
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-eop"): W dniu 29 czerwca 2020 roku w oparciu o postanowienia Regulaminu Programu Motywacyjnego z dnia 9 kwietnia 2019 roku, uchwałę nr 3 Rady Nadzorczej Spółki z dnia 3 kwietnia 2020 roku, a także w oparciu o dane zawarte w zbadanym przez Biegłego Rewidenta i zatwierdzonym przez ZWZ w dniu 19 czerwca 2020 roku skonsolidowanym sprawozdaniu finansowym Grupy Kapitałowej Auto Partner S.A. za rok obrotowy 2019 oraz rozliczeniem kryteriów biznesowych zawartych w Regulaminie, Rada Nadzorcza podjęła decyzję o przyznaniu premii dla uczestników Programu tj. Pana Andrzeja Manowskiego – Wiceprezesa Zarządu oraz Pana Piotra Janty – Wiceprezesa Zarządu w sposób następujący:
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-eop"): Piotr Janta – Wiceprezes Zarządu – przyznana premia w kwocie 674 000 PLN zostanie wypłacona w sposób następujący: w roku 2020 wypłata kwoty 472 000 PLN; w roku 2021 wypłata kwoty 135 000 PLN; w roku 2022 wypłata kwoty 67 000 PLN. Andrzej Manowski – Wiceprezes Zarządu – przyznana premia w kwocie 674 000 PLN zostanie wypłacona w sposób następujący: w roku 2020 wypłata kwoty 472 000 PLN; w roku 2021 wypłata kwoty 135 000 PLN; w roku 2022 wypłata kwoty 67 000,00 PLN.
    • p (class="pt-paragraph", dir="ltr")
    • span (class="pt-normaltextrun"): Wartość premii wynikająca z uchwały nr 3 RN z dnia 29 czerwca 2020 za rok 2019 i przypadająca do wypłaty w 2020 została naliczona na dzień bilansowy.
    • span (class="pt-eop"): Premia przypadająca do wypłaty w roku 2020 wypłacona została w dniu 1 lipca 2020 roku.
    • p (class="pt-Podstawowy", dir="ltr")
    • p (class="pt-paragraph", dir="ltr")
    • span (class="pt-eop"): (ii)Różnica między wartością przyznanej premii 1mln348tys wynikającej z uchwały RN z dnia 29 czerwca 2020 a zaprezentowanym zobowiązaniem z tytułu programu motywacyjnego za rok 2019 1mln053tys stanowi obciążenie publicznoprawne z tytułu naliczenia premii na dzień bilansowy, której wypłata przypada w 2020 roku i zaprezentowane zostało w sprawozdaniu z sytuacji finansowej w pozycji zobowiązania handlowe i pozostałe zobowiązania. Premia przypadająca do wypłaty w roku 2020 wypłacona została w dniu 1 lipca 2020 roku.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (iii) Grupa jest zobowiązana do realizowania wypłat tytułem odprawy emerytalnej i rentowej. Prawo do odprawy emerytalnej przysługuje każdemu pracownikowi, który osiągnie wiek emerytalny 65 lat dla mężczyzn i 60 lat dla kobiet. Wysokość odprawy emerytalnej stanowi jednomiesięczne wynagrodzenie. Odprawa rentowa przysługuje pracownikowi, który nabył trwałą niezdolność do pracy uprawniającą do pobierania świadczenia rentowego w ramach ubezpieczenia społecznego. Wysokość odprawy rentowej stanowi jednomiesięczne wynagrodzenie. Rezerwy na świadczenia pracownicze wyznaczane są przez Aktuariusza. Do wyznaczenia rezerwy na odprawy emerytalne i rentowe wykorzystano metodę prognozowanych świadczeń jednostkowych. Wartość przyszłych zobowiązań obliczana jest jako nagromadzona część przyszłych świadczeń z uwzględnieniem prognozowanego wzrostu wynagrodzenia stanowiącego podstawę wymiaru przyszłych świadczeń. Przy wyznaczaniu zobowiązań zostały również uwzględnione prawdopodobieństwa osiągnięcia uprawnień do jednorazowej odprawy emerytalnej lub rentowej. Wysokość zobowiązania z tytułu niewykorzystanych urlopów, została wyliczona jako należne za niewykorzystany urlop wynagrodzenie.
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000129", dir="ltr")
    • p (class="pt-Normalny-000176", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 26.2. Programy określonych składek ZUS
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000178"): Zgodnie z ustawą z dnia 13 października 1998 r. o systemie ubezpieczeń społecznych p
    • span (class="pt-Domylnaczcionkaakapitu-000130"): racownicy Grupy są objęci państwowym programem świadczeń. Grupa ma obowiązek przekazywania określonego procentu kosztów wynagrodzeń. Ogólne koszty ujęte w rachunku zysków i strat przedstawiono poniżej i stanowią one składki zapłacone przez Grupę w ramach tych programów, według stawek określonych w zasadach poszczególnych programów. Część składek należnych za dany okres sprawozdawczy nie została odprowadzona do programów, są wymagalne po dniu bilansowym.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-000006", id="_Hlk35339704")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i)część składek należnych za dany okres sprawozdawczy nie została odprowadzona do programów, są wymagalne po dniu bilansowym.
    • p (class="pt-Normalny-000179", dir="ltr")
    • p (class="pt-Normalny-000135", dir="ltr")
    • span (class="pt-Wyrnienieintensywne"): 26.3. Pracownicze plany kapitałowe PPK
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zgodnie z ustawą z dnia 4 października 2018 o pracowniczych planach kapitałowych, Grupa jest zobowiązania do odprowadzania określonych składek.
    • span (class="pt-Domylnaczcionkaakapitu-000181"): PPK jest tworzony w celu systematycznego gromadzenia oszczędności przez uczestnika PPK.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): (i)część składek należnych za dany okres sprawozdawczy nie została odprowadzona do programów, są wymagalne po dniu bilansowym.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549883")
    • h2 (dir="ltr")
    • span: 27. Instrumenty finansowe
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000156"): Wartość godziwa
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Jako aktywa i zobowiązania finansowe wyceniane w wartości godziwej przez wynik finansowy Grupa wyznacza pochodne instrumenty finansowe, dla których zmiany wartości godziwej wynikają ze zmian warunków rynkowych, tj. kursów wymiany walut. W okresie sprawozdawczym Grupa zawierała walutowe transakcje terminowe. Na dzień bilansowy nie było otwartych kontraktów terminowych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zdaniem Zarządu, wartości bilansowe aktywów i zobowiązań finansowych ujętych w sprawozdaniu finansowym są przybliżeniem ich wartości godziwej.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549884")
    • h2 (dir="ltr")
    • span: 28. Zarządzanie ryzykiem finansowym
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Działalność prowadzona przez Grupę naraża ją na wiele różnych rodzajów ryzyka finansowego: ryzyko rynkowe, ryzyko walutowe, ryzyko kredytowe oraz ryzyko płynności. Podstawowymi celami Grupy w zakresie zarządzania ryzykiem finansowym jest zapewnienie płynności finansowej.
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Zarządzanie kapitałem
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zarządza kapitałem by zagwarantować zdolność do kontynuowania działalności przy jednoczesnej maksymalizacji rentowności dla akcjonariuszy dzięki optymalizacji relacji zadłużenia do kapitału własnego.
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Na Grupę nie są nałożone żadne zewnętrzne wymagania kapitałowe poza następującymi wyjątkami:
    • p (class="pt-Normalny-000129", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): 1)Zgodnie z art. 396 §1 Kodeksu Spółek Handlowych, któremu podlega Spółka dominująca na pokrycie straty należy utworzyć kapitał zapasowy, do którego przelewa się co najmniej 8% zysku za dany rok obrotowy, dopóki kapitał ten nie osiągnie co najmniej jednej trzeciej kapitału akcyjnego. Ta część kapitału zapasowego (zysków zatrzymanych) nie jest dostępna do dystrybucji na rzecz Akcjonariuszy.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): 2)Kowenanty zawarte w umowach kredytowych ograniczają możliwość wypłaty dywidendy do kwoty wynoszącej 30% zysku netto za rok poprzedzający z możliwością podwyższenia do 50% pod warunkiem utrzymania wskaźnika wypłacalności liczonego jako stosunek kapitałów własnych do sumy bilansowej na poziomie nie niższym niż 50%.
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa analizuje stan kapitałów wykorzystując wskaźnik, który liczony jest jako stosunek zadłużenia netto do kapitału własnego wykazanego w sprawozdaniu z sytuacji finansowej.
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Ryzyko kredytowe
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Ryzyko kredytowe w Grupie dotyczy głównie należności handlowych - oznacza ryzyko, że kontrahent nie dopełni zobowiązań umownych, w wyniku czego Grupa poniesie straty finansowe. Grupa stosuje zasadę dokonywania transakcji wyłącznie z kontrahentami o sprawdzonej wiarygodności kredytowej; w razie potrzeby uzyskując stosowne zabezpieczenie jako narzędzie redukcji ryzyka strat finansowych z tytułu niedotrzymania warunków umowy. Grupa korzysta z informacji finansowych dostępnych publicznie oraz z własnych danych o transakcjach dokonując oceny wiarygodności kredytowej swoich głównych klientów. Narażenie Grupy na ryzyko wiarygodności kredytowej kontrahentów jest stale monitorowane. Na należności z tytułu dostaw i usług składają się kwoty należne od dużej liczby klientów, w związku z powyższym Grupa nie jest narażona na istotne ryzyko kredytowe wobec pojedynczego kontrahenta, choć koncentracja zwiększa się wraz ze zwiększaniem skali działalności na rynkach zagranicznych. Dlatego Grupa dodatkowo ubezpiecza określony portfel należności klientów zagranicznych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Środki pieniężne są lokowane w kraju i za granicą w bankach o uznanej wiarygodności.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Ryzyko stopy procentowej
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa jest narażona na ryzyko zmiany stóp procentowych. Grupa zarządza tym ryzykiem utrzymując odpowiednią proporcję pożyczek i kredytów o oprocentowaniu stałym i zmiennym. Grupa nie wykorzystuje instrumentów pochodnych w celu zabezpieczania się przed ryzykiem zmiany stóp procentowych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Narażenie Grupy na ryzyko zmiany stóp procentowych związane z aktywami i zobowiązaniami finansowymi omówiono szczegółowo w części noty poświęconej zarządzaniu ryzykiem płynności.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Przedstawione poniżej analizy wrażliwości oparto o stopień narażenia na ryzyko zmiany stóp procentowych pozostałych instrumentów finansowych na dzień bilansowy. W przypadku zobowiązań o oprocentowaniu zmiennym zakłada się na potrzeby analizy, że kwota zobowiązań niespłaconych na dzień bilansowy była niezapłacona przez cały rok. W sprawozdaniach wewnętrznych dotyczących ryzyka stopy procentowej dla kluczowych członków kierownictwa wykorzystuje się wahania w górę i w dół o 50 punktów bazowych, co odzwierciedla ocenę kierownictwa dotyczącą prawdopodobnej zmiany stóp procentowych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wpływ zmian stopy procentowej o +/-50 p.b. na zysk netto:
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wrażliwość Spółki na ryzyko procentowe istotnie się zmniejszyła dzięki znaczącemu obniżeniu zadłużenia z tytułu kredytów bankowych i faktoringu.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Ryzyko walutowe
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zawiera określone transakcje denominowane w walutach obcych. W związku z tym pojawia się ryzyko wahań kursów walut. Grupa wykorzystywała w 2020 roku instrumenty pochodne w celu zabezpieczania się przed ryzykiem zmiany kursów walutowych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wartość bilansowa aktywów oraz zobowiązań pieniężnych Grupy denominowanych w walutach obcych na dzień bilansowy przedstawia się następująco:
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa jest narażona na znaczące ryzyko zmiany kursów walut wynikające z ekspozycji walutowej, które może wpłynąć na wysokość przyszłych przepływów pieniężnych oraz wynik finansowy. Głównym źródłem ryzyka walutowego w Grupie jest zakup towarów w walutach EUR i USD oraz sprzedaż towarów w walutach EUR i CZK.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Stopień wrażliwości Grupy na 10-proc. wzrost i spadek kursu wymiany PLN na waluty obce przedstawiony jest w poniższej tabeli. Analiza wrażliwości obejmuje wyłącznie nierozliczone pozycje pieniężne denominowane w walutach obcych i koryguje przewalutowanie na koniec okresu obrachunkowego o 10-proc. zmianę kursów. Wartość dodatnia w poniższej tabeli wskazuje wzrost zysku i zwiększenie kapitału własnego. Wartość ujemna oznacza odwrotny wpływ zmiany kursu walutowego na zysk i kapitały własne.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Zmiana kursów walut innych niż EUR, USD i CZK nie wpływa w istotny sposób na zysk Grupy. Wrażliwość Grupy na ryzyko walutowe uległa dalszemu istotnemu zmniejszeniu dzięki szybko rosnącej sprzedaży eksportowej w walucie EUR, co powoduje zmniejszanie ekspozycji netto na walutę EUR.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Ryzyko płynności
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Ostateczną odpowiedzialność za zarządzanie ryzykiem płynności ponosi Zarząd, który opracował odpowiedni system służący do zarządzania krótko-, średnio- i długoterminowymi wymogami dotyczącymi finansowania i zarządzania płynnością. Zarządzanie ryzykiem płynności w Grupie ma formę utrzymywania odpowiedniego poziomu rezerwowych linii kredytowych, ciągłego monitoringu prognozowanych i faktycznych przepływów pieniężnych oraz dopasowywania profili zapadalności aktywów i wymagalności zobowiązań finansowych. Na poszczególne dni bilansowe Grupa posiadała następujące niewykorzystane kwoty limitów kredytowych oraz faktoringowych:
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W ramach limitu w wysokości 127mln785tys z kredytu korzysta również Spółka zależna.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poza wyżej wymienionymi kredytami zaciągniętymi w bankach, Grupa wykorzystuje również pożyczki udzielone przez akcjonariuszy, szczegóły w nocie 20.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poniższa tabela przedstawia umowne terminy wymagalności niepochodnych zobowiązań Grupy na dzień 31 grudnia 2019. Obejmują przepływy pieniężne zarówno z odsetek, jak i z kapitału. Umowny termin wymagalności wyznaczono jako najwcześniejszy możliwy termin żądania spłaty od Grupy.
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Poniższa tabela przedstawia prognozowane terminy zapadalności aktywów finansowych Grupy na dzień 31 grudnia 2020 nie będących instrumentami pochodnymi. Obejmują przepływy pieniężne zarówno z odsetek, jak i z kapitału.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Kwoty podane powyżej zarówno dla aktywów i zobowiązań finansowych z oprocentowaniem zmiennym mogą ulec zmianie w przypadku zmian stóp procentowych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549885")
    • h2 (dir="ltr")
    • span: 29. Transakcje z jednostkami powiązanymi
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Transakcje między Spółką dominującą a jej jednostkami zależnymi będącymi stronami powiązanymi zostały wyeliminowane w trakcie konsolidacji i nie wykazano ich w niniejszej nocie. Szczegółowe informacje o transakcjach między Grupą a pozostałymi stronami powiązanymi przedstawiono poniżej.
    • p (class="pt-Normalny-000136", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Transakcje z jednostkami powiązanymi osobowo z członkami Zarządu, Rady Nadzorczej oraz transakcje z członkami Zarządu jednostek zależnych
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000142")
      • img (alt="image", 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")
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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Transakcje handlowe z Członkami Zarządu i Radą Nadzorczą oraz wynagrodzenia Członków Zarządu i Rady Nadzorczej
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-paragraph", dir="ltr")
    • p (class="pt-paragraph", dir="ltr")
    • span (class="pt-normaltextrun"): (i)Program Motywacyjny na lata 2016-2018.
    • p (class="pt-paragraph", dir="ltr")
    • p (class="pt-paragraph", dir="ltr")
    • span (class="pt-normaltextrun"): (ii)Program Motywacyjny na lata 2019 – 2021.W dniu 9 kwietnia 2019 r. Rada Nadzorcza uchwałą nr 14 przyjęła Regulamin Programu Motywacyjnego dla Członków Zarządu Auto Partner S.A. na okres 2019 – 2021 roku, którego celem jest stworzenie mechanizmów motywujących do działań zapewniających długoterminowy wzrost wartości Spółki, stabilizację kadry menedżerskiej Spółki oraz wprowadzenie mechanizmu wynagradzania za ich wkład we wzrost wartości Spółki. Adresatami Programu są Członkowie Zarządu: Andrzej Manowski, Piotr Janta i Michał Breguła, przy czym mandat Pana Michała Breguły wygasł w dniu 7 września 2019 r. tj. w trakcie trwania okresu referencyjnego. Łączna kwota premii wypłaconych zgodnie z zasadami określonymi w Regulaminie nie przekroczy 5.360.000,00 PLN w całym okresie trwania Programu tj. od 2019 do 2021 roku.
    • span (class="pt-eop")
    • span (class="pt-normaltextrun"): W dniu 30 maja 2019 r. Zgromadzenie Wspólników Maxgear Sp. z o.o. uchwaliło Regulamin Programu Motywacyjnego dla Członków Zarządu Maxgear Sp. z o.o.: Grzegorza Pala oraz Arkadiusza Cieplaka na zasadach analogicznych jak w Regulaminie dla Członków Zarządu Auto Partner S.A. Łączna kwota premii wypłaconych zgodnie z zasadami określonymi w Regulaminie dla Członków Zarządu Maxgear Sp. z o.o. nie przekroczy kwoty 2.640.000,00 PLN w całym okresie trwania Programu tj. od 2019 do 2021 roku.
    • span (class="pt-eop")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Rada Nadzorcza Auto Partner S.A. oraz Zgromadzenie Wspólników Maxgear Sp. z o.o. doprecyzowując zapisy Regulaminu Programu Motywacyjnego, ustaliła iż premia wypłacana uprawnionym Członkom Zarządu Spółki na podstawie w/w/ Regulaminów Programu Motywacyjnego dla Członków Zarządu Auto Partner S.A. oraz Członów Zarządu Maxgear Sp. z o.o., będzie wyliczana na podstawie danych finansowych nieuwzględniających wpływu MSSF16 (Leasing) w odniesieniu do umów zaklasyfikowanych jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17, tzn.:
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - amortyzacji skorygowanej o wartość amortyzacji wynikającej z umów zaklasyfikowanych od 1 stycznia 2019 jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17,
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - zobowiązań leasingowych skorygowanych o wartość zobowiązań leasingowych rozpoznanych z umów zaklasyfikowanych od 1 stycznia 2019 jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17,
    • p (class="pt-Podstawowy", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - zysku operacyjnego EBIT skorygowanego o wpływ sposobu ujęcia w wyniku kosztów wynikających z umów zaklasyfikowanych od 1 stycznia 2019 jako leasing finansowy wg MSSF 16, które wcześniej nie były traktowane jako leasing finansowy wg MSR 17.
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Pożyczki udzielone Grupie przez Członków Zarządu, Rady Nadzorczej i akcjonariuszy
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-000006", id="_Toc67549886")
    • h2 (dir="ltr")
    • span: 30. Zobowiązania warunkowe, przyszłe zobowiązania umowne, udzielone i otrzymane poręczenia oraz aktywa warunkowe
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000136", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Udzielone i otrzymane poręczenia i gwarancje
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Gwarancje bankowe:
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - gwarancja bankowa z dnia 01.03.2019 nr KLG57699IN19 dotycząca umowy najmu z dnia 15 lutego 2019 lokalu usługowo-magazynowego na kwotę 42tys. PLN, ważna do 6 maja 2024 roku, udzielona w ramach limitu umowy z ING Bank Śląski S.A., nota 20
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - gwarancja bankowa z dnia 18.10.2019 nr DOK3617GWB19KW dotycząca umowy dystrybucji wraz z późniejszymi aneksami, na kwotę 2mln PLN, ważna do 31 maja 2022 roku, udzielona w ramach limitu umowy z Santander Bank Polska S.A., nota 20
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - gwarancja bankowa z dnia 27.07.2020 nr DOK2419GWB20AR dotycząca umowy najmu nieruchomości w Bieruniu, na kwotę 652 tys. EUR, ważna do 31 sierpnia 2023 roku, udzielona w ramach limitu umowy z Santander Bank Polska S.A., nota 20
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - gwarancja bankowa z dnia 27.07.2020 nr DOK2418GWB20TI dotycząca umowy najmu nieruchomości w Pruszkowie, na kwotę 190 tys. EUR, ważna do 31 sierpnia 2023 roku, udzielona w ramach limitu umowy z Santander Bank Polska S.A., nota 20.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - gwarancja bankowa z dnia 01.10.2020 nr DOK3227GBW20TI dotycząca umowy autoryzowanej dystrybucji, na kwotę 2mln500tys PLN, ważna do 31 grudnia 2020 roku, udzielona w ramach limitu umowy z Santander Bank Polska S.A., nota 20
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Aktywa warunkowe
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa posiada następujące aktywa warunkowe:
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zawarła polisy ubezpieczeniowe od kradzieży z włamaniem i rabunkiem oraz od ognia i innych żywiołów posiadanych towarów, w związku z tym w przypadku ziszczenia się tych zdarzeń Grupa otrzyma stosowne odszkodowania od ubezpieczyciela.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Grupa zawarła polisę ubezpieczeniową od ryzyka kredytu kupieckiego udzielonego niektórym klientom krajowym oraz zagranicznym. Na mocy polisy Grupie przysługuje odszkodowanie za ubezpieczone i niezapłacone należności.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Zobowiązania podatkowe
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Obowiązujące w Polsce przepisy podatkowe podlegają częstym zmianom, powodując istotne różnice w ich interpretacji i istotne wątpliwości w ich stosowaniu. Organy podatkowe posiadają instrumenty kontroli umożliwiające im weryfikację podstaw opodatkowania (w większości przypadków w okresie poprzednich 5 lat obrotowych), oraz nakładanie kar i grzywien. Od 15 lipca 2016 roku Ordynacja Podatkowa uwzględnienia także postanowienia Ogólnej Klauzuli Zapobiegającej Nadużyciom (GAAR), która ma zapobiegać powstawaniu i wykorzystywaniu sztucznych struktur prawnych tworzonych w celu uniknięcia opodatkowania. Klauzulę GAAR należy stosować tak w odniesieniu do transakcji dokonanych po jej wejściu w życie, jak i do transakcji, które zostały przeprowadzone przed wejściem w życie klauzuli GAAR, ale dla których po dacie wejścia klauzuli w życie korzyści były lub są nadal osiągane. W konsekwencji ustalenie zobowiązań podatkowych może wymagać istotnego osądu, w tym dotyczącego transakcji już zaistniałych, a kwoty obciążeń podatkowych prezentowane i ujawniane w sprawozdaniach finansowych mogą się zmienić w przyszłości w wyniku kontroli organów podatkowych.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000163"): Zawarte umowy
    • p (class="pt-000006", id="_Hlk65496155")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Spółka dominująca zawarła w 2020 roku umowy zaklasyfikowane jako leasing zgodnie z MSSF 16, których zobowiązania nie zostały ujawnione na dzień bilansowy ze względu na brak udostępnienia do 31 grudnia 2020 składników aktywów do użytkowania przez Spółkę, a będących przedmiotem tych umów, wartość zobowiązania to 16mln622tys. Aktywa będące przedmiotem umowy to automatyka magazynowa, sprzęt IT, samochód.
    • p (class="pt-Normalny-000183", dir="ltr")
    • p (class="pt-000006", id="_Toc67549887")
    • h2 (dir="ltr")
    • span: 31. Wynagrodzenie Biegłego Rewidenta
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 23 marca 2018 roku Rada Nadzorcza podjęła uchwałę w sprawie wyboru Deloitte Audyt Spółka z ograniczoną odpowiedzialnością sp. k. z siedzibą w Warszawie, al. Jana Pawła II 19 jako podmiotu uprawnionego do:
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - dokonania przeglądu sprawozdań finansowych Spółki i skonsolidowanych sprawozdań finansowych Grupy za I półrocza 2018, 2019, 2020 i 2021 rok
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): - przeprowadzenia badania sprawozdania finansowego Spółki i skonsolidowanego sprawozdania finansowego Grupy za lata 2018, 2019, 2020 i 2021 rok.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Umowa została podpisana 30 lipca 2018 roku.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Deloitte Audyt Spółka z ograniczoną odpowiedzialnością Spółka komandytowa jest wpisana od 7 lutego 1995 r. na listę podmiotów uprawnionych do badania sprawozdań finansowych, prowadzoną przez Krajową Izbę Biegłych Rewidentów, pod numerem ewidencyjnym 73.
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Wynagrodzenie netto audytora badającego sprawozdanie w latach 2018 i 2019 przedstawia się następująco:
    • p (class="pt-Normalny-000132", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", src="data:image/png;base64,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")
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-000006", id="_Toc67549888")
    • h2 (dir="ltr")
    • span: 32. Stan zatrudnienia w Grupie
    • p (class="pt-Normalny", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000003")
      • img (alt="image", 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")
    • p (class="pt-Podstawowy-000184", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): Różnice w stanie zatrudnienia w obszarach Zarząd i Administracja oraz Sprzedaż i Marketing w stosunku do stanu na dzień 31.12.2019 r. wynikają z nowej klasyfikacji stanowisk pracy we wdrożonym w Spółce nowym systemie kadrowo–płacowym.
    • p (class="pt-Normalny", dir="ltr")
    • p (class="pt-000006", id="_Toc67549889")
    • h2 (dir="ltr")
    • span: 33. Zdarzenia po dniu bilansowym
    • p (class="pt-Normalny-000132", dir="ltr")
    • p (class="pt-Normalny-000133", dir="ltr")
    • span (class="pt-normaltextrun-000185"): W dniu 11 stycznia 2021 r. Emitent zawarł umowę z firmą Global One Automotive GmbH z siedzibą we Frankfurcie, której udzielił firmie Global One pożyczki w wysokości 525.000,00 EUR. Oprocentowanie pożyczki wynosi 4,5%. Umowa została zawarta na czas określony do dnia 18 czerwca 2021 r. Emitent posiada 6,66% udziałów w firmie Global One Automotive GmbH z tytułu uczestnictwa w Międzynarodowej Grupie Zakupowej, do której należy od 2017 r.
    • span (class="pt-eop-000186")
    • p (class="pt-Normalny-000187", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000147"): W dniu 26 lutego 2021 r. Emitent złożył wniosek do Wojewódzkiego Urzędu Pracy w Katowicach o przyznanie dofinansowania wynagrodzenia pracowników nieobjętych przestojem, przestojem ekonomicznym albo obniżonym wymiarem czasu pracy, w związku ze spadkiem obrotów gospodarczych w następstwie wystąpienia COVID-19. Wniosek został złożony na podstawie art. 15g ustawy z dnia 2 marca 2020 r. o szczególnych rozwiązaniach związanych z zapobieganiem, przeciwdziałaniem i zwalczaniem COVID-19, innych chorób zakaźnych oraz wywołanych nimi sytuacji kryzysowych (Dz.U. z 2020r., poz. 374 ze zm.). Wnioskowana kwota: 11 240 302,08 zł, w tym: dofinansowanie składek na ubezpieczenie społeczne: 1 648 794,12 zł, dofinansowanie wynagrodzeń pracowników: 9 591 507,96 zł. W dniu 16 marca 2021 r. na rachunek bankowy Spółki wpłynęła kwota 7 493 534,72 zł z tytułu I i II transzy w/w dofinansowania. Zgodnie ze złożonym wnioskiem Spółka otrzyma jeszcze jedną transzę w wysokości około 3 746 767 zł z tego samego tytułu. Jednak końcowa decyzja co do ostatecznej wysokości dofinansowania oraz jego ewentualnego zwrotu zostanie podjęta po całkowitym rozliczeniu wniosku tj. w terminie do 30 maja 2021 r. lub w ciągu 30 dni od daty otrzymania ostatniej transzy oraz po ewentualnym przeprowadzeniu urzędowych kontroli w zakresie objętym dofinansowaniem.
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    • p (class="pt-000006", id="_Hlk67511583")
    • p (class="pt-Normalny-000187", dir="ltr")
    • span (class="pt-Domylnaczcionkaakapitu-000130"): W dniu 15 marca 2021 r. Zarząd Emitenta podjął uchwałę w przedmiocie wniosku do Zwyczajnego Walnego Zgromadzenia dot. wypłaty dywidendy za rok obrotowy 2020. Zgodnie z podjętą uchwałą Zarząd rekomenduje wypłatę dywidendy dla akcjonariuszy Spółki w kwocie 13 062 000 złotych (słownie: trzynaście milionów sześćdziesiąt dwa tysiące złotych) tj. po 0,10 zł (słownie: dziesięć groszy) na jedną akcję. Pozostałą część zysku netto za rok obrotowy 2020 Zarząd rekomenduje przeznaczyć na kapitał zapasowy Spółki. Rada Nadzorcza na posiedzeniu w dniu 30 marca 2021 r. mocą uchwały nr 3 pozytywnie zaopiniowała w/w wniosek. Powyższa rekomendacja zostanie przedstawiona Zwyczajnemu Walnemu Zgromadzeniu.
    • p (class="pt-Normalny-000133", dir="ltr")
    • p (class="pt-000006", id="_Toc67549890")
    • h2 (dir="ltr")
    • span: 34. Wpływ pandemii COVID-19 na działalność Grupy
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    • span (class="pt-Domylnaczcionkaakapitu-000130"): W związku z aktualną sytuacją związaną z rozprzestrzenianiem się pandemii COVID-19 na świecie Emitent jako główne czynniki ryzyka, które jego zdaniem mogą mieć wpływ na wyniki finansowe Grupy w perspektywie kolejnych okresów na chwilę obecną zdefiniował:
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    • span (class="pt-000150"): 
    • span (class="pt-Domylnaczcionkaakapitu-000130"): ryzyko spadku siły nabywczej konsumenta (z drugiej strony w takiej sytuacji więcej ludzi będzie jeździło starszymi autami, a więc popyt na towary Grupy wzrośnie) oraz ograniczenie jego mobilności związane z procesami regulującymi przemieszczanie się ludności,
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    • span (class="pt-000150"): 
    • span (class="pt-Domylnaczcionkaakapitu-000130"): ryzyko utrudnień na granicach międzypaństwowych, które może mieć wpływ na utrudnienia w transporcie do zagranicznych klientów.
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    • span: 35. Zatwierdzenie rocznego skonsolidowanego sprawozdania finansowego przez Zarząd
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    • span (class="pt-Domylnaczcionkaakapitu-000130"): Roczne skonsolidowane sprawozdanie finansowe Grupy zostało zatwierdzone do publikacji przez Zarząd dnia 30 marca 2021 roku.
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    • span (class="pt-Domylnaczcionkaakapitu-000191"): Aleksander Górecki – Prezes Zarządu
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    • span (class="pt-Domylnaczcionkaakapitu-000130"): Andrzej Manowski – Wiceprezes Zarządu
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    • span (class="pt-Domylnaczcionkaakapitu-000191"): Piotr Janta – Wiceprezes Zarządu
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    • span (class="pt-Domylnaczcionkaakapitu-000130"): Kamila Obłodecka-Pieńkosz – Główna Księgowa
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      • SigningTime: 2021-03-30T13:48:03Z
      • SigningCertificate
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        • DigestMethod (Algorithm="http://www.w3.org/2001/04/xmlenc#sha256")
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        • IssuerSerial
        • X509IssuerName: 2.5.4.97=#0C10564154504C2D35313730333539343538,CN=Certum QCA 2017,O=Asseco Data Systems S.A.,C=PL
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  • SignatureMethod (Algorithm="http://www.w3.org/2001/04/xmldsig-more#rsa-sha256")
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  • X509Data
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      • SigningTime: 2021-03-30T14:33:12Z
      • SigningCertificate
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