Respuesta :
Answer:
P(A|B) = 0.231 = 23%
Step-by-step explanation:
A is the event that a randomly selected member of the Labor force is African American, P(A) = 0.12 (given in the question)
Non African-Americans in the labour force, P(A') = 1 - P(A') = 1 - 0.12 = 0.88
B is the event that a member of the labor force is unemployed, P(B) is not directly given, but can be calculated from the given percentages on the question.
Total unemployed people in the labour force = unemployed African American people in the labor force + unemployed people in the labor force that aren't African Americans
African-Americans in the labour force P(A) = 0.12
Non African-Americans in the labour force, P(A') = 0.88
unemployed African Americans in the labor force P(A n B) = 0.11 of the African Americans in the labor force = 0.12 × 0.11 = 0.0132
Unemployed Non-African Americans in the labor force, P(A' n B) = 5% of 0.88 = 0.88 × 0.05 = 0.044
Total unemployed Americans in the labor force, P(B) = P(A n B) + P(A' n B) = 0.0132 + 0.044 = 0.0572
Probability that a person is African American, given that they're unemployed, P(A|B) = (P(A n B))/P(B) = 0.0132/0.0572 = 0.231 = 23%
The probability that a member of the labor force is African American given that the person is unemployed will be 023.
How to calculate probability
From the information given, A is the event that a randomly selected member of the labor force is African American. In this case, P(A) = 0.12.
Therefore, the non African-Americans in the labour force will be:
= 1 - P(A')
= 1 - 0.12
= 0.88
B is the event that a member of the labor force is unemployed. The probability that a person is African American and is unemployed will be:
= 0.0132/0.0572
= 0.231
In conclusion, the probability will be 23% or 0.23.
Learn more about probability on:
https://brainly.com/question/25870256
