Final answer:
The probability that a student is taking calculus given that they are on the dean's list is approximately 0.104.
Step-by-step explanation:
To find the probability that a student is taking calculus given that they are on the dean's list, we can use the concept of conditional probability. Let's denote the event of a student taking calculus as C and the event of a student being on the dean's list as D.
From the information given, we know that P(C ∩ D) = 0.027 (the probability that a student takes calculus and is on the dean's list) and P(D) = 0.26 (the probability that a student is on the dean's list).
The formula for conditional probability is P(C|D) = P(C ∩ D) / P(D). Plugging in the values we have, we get:
P(C|D) = 0.027 / 0.26 = 0.1038
Rounding the final answer to 3 decimal places, the probability that the student is taking calculus, given that he or she is on the dean's list, is approximately 0.104.