A tabela a seguir mostra os números de processos novos de du...
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Q448892
Raciocínio Lógico
A tabela a seguir mostra os números de processos novos de duas câmaras criminais hipotéticas A e B, nas duas primeiras semanas de um determinado mês.
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questão](data:image/png;base64,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)
Sorteado um desses processos ao acaso, verificou-se que ele é um processo da Semana 2.
A probabilidade de o processo sorteado ser da Câmara B é:
Sorteado um desses processos ao acaso, verificou-se que ele é um processo da Semana 2.
A probabilidade de o processo sorteado ser da Câmara B é: