Given:
Percent of people employed from Canada = 54%
Perecent of Canadian employees who hold management positions = 31%
Percent of non-Canadian emloyees who hold management positions = 21%
Where:
C represents the event that an an employee is Canadian, and M represent the event that an employee holds a management position.
Let's solve for the following:
• (a). Express each of the three probabilities listed above as the probability of an event involving C and/or M.
Here, we have:
• P(C) = 54% ==> 0.54
,
• P(M/C) = 31% ==> 0.31
• P(M/C') = 21% ==> 0.21
• (b). What is the probability that a randomly selected employee is not from Canada?
To find the probabilty, we have:
P(not from Canada) = 1 - P(from Canada)
P(C') = 1 - P(C)
P(C') = 1 - 0.54
P(C') = 0.46
Therefore, the probability that a randomly selected employee is not from Canada is 0.46
• (c). What is the probability that a randomly selected employee is from Canada and holds a management position?
Here, we have:
P(C ∩ M) = P(C) x P(M/C)
P(C ∩ M) = 0.54 x 0.31
P(C ∩ M) = 0.1674
Therefore, the probability that a randomly selected employee is from Canada and holds a management position is 0.1674.
• (d). What proportion of employees hold management positions?
Apply the conditional probability formula:
P(M) = P(C' ∩ M) + P(C ∩ M)
P(M) = (P(C') x P(M/C')) + (P(C) x P(M/C))
P(M) = (0.46 x 0.21) + (0.54 x 0.31)
P(M) = 0.0966 + 0.1674
P(M) = 0.264
Therefore, the proportion of employees who hold management positions is 0.264
• (,e). What is the probability that a randomly selected employee is Canadian, or holds a management position, or both?
Apply the formula:
P(C ∪ M) = P(C) + P(M) - P(C ∩ M)
P(C ∪ M) = 0.54 + 0.264 - 0.1674
P(C ∪ M) = 0.6366
Therefore, the probability that a randomly selected employee is Canadian, or holds a management position, or both is 0.6366
• (f,). What proportion of people in management positions are Canadian?
Apply the formula:
Therefore, the proportion of people in management positions are Canadian is 0.634.
ANSWER:
(a).
• P(C) = 54% ==> 0.54
,
• P(M/C) = 31% ==> 0.31
,
• P(M/C') = 21% ==> 0.21
• (b). 0.46
• (c). 0.1674
• (d). 0.264
• (e). 0.6366
• (f). 0.634