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42% of the sales force at a large insurance company have laptop computers, 65% have desk computers, and 24% have both. A salesperson is selected at random. What is the probability that he/she has desk computers but not laptop computers?

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Answer:

To find the probability that a randomly selected salesperson has desk computers but not laptop computers, we can use the following information:

P(L): Probability of having a laptop computer = 0.42

P(D): Probability of having a desk computer = 0.65

P(L∩D): Probability of having both laptop and desk computers = 0.24

We need to find the probability that a salesperson has a desk computer but not a laptop computer. This can be represented as P(D∩¬L).

Using the principle of inclusion and exclusion in probability, we can find P(D∩¬L) as follows:

\[ P(D \cap \neg L) = P(D) - P(L \cap D) \]

Now we substitute the given probabilities:

\[ P(D \cap \neg L) = 0.65 - 0.24 \]

\[ P(D \cap \neg L) = 0.41 \]

Therefore, the probability that a randomly selected salesperson has desk computers but not laptop computers is 0.41 or 41%.

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