A distribuição de prejuízos financeiros causados por não...
Próximas questões
Com base no mesmo assunto
Ano: 2021
Banca:
CESPE / CEBRASPE
Órgão:
APEX Brasil
Prova:
CESPE / CEBRASPE - 2021 - APEX Brasil - Analista I |
Q1784727
Matemática
A distribuição de prejuízos financeiros causados por não
conformidades em processos de determinada organização é dada
pela tabela a seguir. ![Imagem associada para resolução da questão](data:image/png;base64,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)
Considerando-se essa situação hipotética, é correto afirmar que a média de prejuízos financeiros dessa organização, em reais, equivale a
Considerando-se essa situação hipotética, é correto afirmar que a média de prejuízos financeiros dessa organização, em reais, equivale a