Respuesta :
Answer:
There is 15% probability that a customer chosen at random holds a VISA card, given that the customer has an American Express card.
[tex]P(VISA \:| \:AE) = 15\%\\[/tex]
Step-by-step explanation:
Number of customers having a Visa card = 1,500
Number of customers having an American Express card = 500
Number of customers having Visa and American Express card = 75
Total number of customers = 1,500 + 500 = 2,000
We are asked to find the probability that a customer chosen at random holds a VISA card, given that the customer has an American Express card.
This problem is related to conditional probability which is given by
[tex]P(A \:| \:B) = \frac{P(A \:and \:B)}{P(B)}[/tex]
For the given problem it becomes
[tex]P(VISA \:| \:AE) = \frac{P(VISA \:and \:AE)}{P(AE)}[/tex]
The probability P(VISA and AE) is given by
P(VISA and AE) = 75/2000
P(VISA and AE) = 0.0375
The probability P(AE) is given by
P(AE) = 500/2000
P(AE) = 0.25
Finally,
[tex]P(VISA \:| \:AE) = \frac{P(VISA \:and \:AE)}{P(AE)}\\\\P(VISA \:| \:AE) = \frac{0.0375}{0.25}\\\\P(VISA \:| \:AE) = 0.15\\\\P(VISA \:| \:AE) = 15\%\\[/tex]
Therefore, there is 15% probability that a customer chosen at random holds a VISA card, given that the customer has an American Express card.
