Com base na planilha do Excel a seguir, do pacote Microsoft...
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Q2072466
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Com base na planilha do Excel a seguir, do pacote
Microsoft Office, qual o resultado da fórmula:
=MÍNIMO(A1:C2)*CONT.NÚM(B1:C2)+MÁXIMO(B2:C2) ?
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questão](data:image/png;base64,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)
=MÍNIMO(A1:C2)*CONT.NÚM(B1:C2)+MÁXIMO(B2:C2) ?