Final answer:
The probability that the first legitimate e-mail is the fifth one checked, given a 90% spam rate, is 0.06561.
Step-by-step explanation:
To solve this problem, we need to understand the concept of geometric distribution. In this case, the event of interest is finding the first legitimate email, with a success probability of 10% (since 90% are spam). We want to find the probability that it occurs on the fifth check (meaning four failures followed by one success).
Here's how to calculate the probability:
1. Probability of a single check:
Success (finding a legitimate email): 10% or 0.1
Failure (finding spam): 90% or 0.9
2. Probability of four failures followed by one success:
The desired probability is the product of the probability of four failures followed by the probability of one success:
Probability of four failures: 0.9 × 0.9 × 0.9 × 0.9 = 0.6561
3. Probability of the first legitimate email being the fifth message:
This is essentially the product of the four failure probabilities and the success probability:
Probability = 0.6561 × 0.1 = 0.06561
Therefore, the probability that the first legitimate email the system administrator finds is the fifth message she checks is approximately 0.0656 or 6.56% rounded to four decimal places.