Final answer:
The probability that a person spends more than five minutes shopping for a birthday card is approximately 28.65%. The median time spent is approximately 4.1589 minutes.
Step-by-step explanation:
The question revolves around the use of the exponential distribution to model the time a person spends shopping for a birthday card, with an average time of six minutes. To solve part a, which asks for the probability that a person spends more than five minutes, we will use the exponential distribution formula:
P(X > x) = e-x/λ
Where λ = 1/μ and μ is the average time.
For an average of 6 minutes, λ = 1/6. The probability of spending more than 5 minutes is:
P(X > 5) = e-5/6 = e-5×1/6 ≈ 0.2865 or 28.65%
The median time, b, of an exponential distribution is given by:
median = ln(2)/λ
So the median time spent is:
median = ln(2) × 6 ≈ 4.1589 minutes.