Respuesta :
Answer:
The probability that the same customer uses coupons given that a customer pays with a debit card is 0.43
Step-by-step explanation:
The Р(A∩В) is obtained below:
Let A be the event that customer uses coupons and B be the event that customer pays with debit card.
From the information,
Р(A) = 0.30
P(B) = 0.35
and Р(B / A) = 0.50
P(A∩B) = P(A) P(B/A)
= 0.30x0.50
= 0.15
The probability that the same customer uses coupons given that a customer pays with a debit card is obtained below:
The required probability is,
P(AIB) = P(A∩B) / Р(В)
= (0.30x 0.50 ) / 0.35
= 0.15 / 0.35
= 0.43
The probability that the same customer uses coupons given that a customer pays with a debit card is 0.43
Answer:
The probability that a customer uses coupons given that the same customer pays with a debit card is P(C I D) = 0.428571 or about 0.43 (approximately 43%).
Step-by-step explanation:
This is a question regarding the concept of conditional probability. The general formula for this is:
[tex] \\ P(A|B) = \frac{P(A \cap B)}{P(B)}[/tex] (1)
We can read the former as the probability of the event A given the event B is the probability that these two events occur simultaneously divided by the probability of event B.
We have to identify the events in the problem. We call the events as follows:
- Event D: pay with a debit card.
- Event C: pay with coupons.
Then, we have the next probabilities extracted from the question:
"If a customer at a particular grocery store uses coupons, there is a 50% probability that the customer will pay with a debit card" or
P(D|C) = 0.50
"Thirty percent of customers use coupons"
P(C) = 0.30
"...and 35% of customers pay with debit cards."
P(D) = 0.35
Then, the question is asking about P(C|D) = ?
Solving the question
Using formula (1) we can say that
[tex] \\ P(C|D) = \frac{P(C \cap D)}{P(D)}[/tex]
[tex] \\ P(D|C) = \frac{P(D \cap C)}{P(C)}[/tex]
Thus
[tex] \\ P(C|D)*P(D) = P(C \cap D)[/tex]
[tex] \\ P(D|C)*P(C) = P(D \cap C)[/tex]
But
[tex] \\ P(C \cap D) = P(D \cap C)[/tex]
Then
[tex] \\ P(C|D)*P(D) = P(D|C)*P(C)[/tex]
Solving the equation for P(C|D)
[tex] \\ P(C|D) = \frac{P(D|C)*P(C)}{P(D)}[/tex]
We already know the values for the right side of the equation and we can finally determine what the probability is. So
[tex] \\ P(C|D) = \frac{0.50*0.30}{0.35}[/tex]
[tex] \\ P(C|D) = \frac{0.15}{0.35}[/tex]
[tex] \\ P(C|D) = \frac{0.15}{0.35} = 0.428571 \approx 0.43[/tex]
Thus, "given that a customer pays with a debit card, the probability that the same customer uses coupons is" 0.428571 (or about 0.43).
