Question:

Let \( X_1, X_2, \ldots, X_{10} \) be a random sample from the \( \text{Exp}(1) \) distribution. Define
\[W = \max\{ e^{-X_1}, e^{-X_2}, \ldots, e^{-X_{10}} \}.\]
Then the value of \( 22E(W) \) is equal to __________ (answer in integer).

Updated On: Oct 1, 2024

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Correct Answer: 20

Solution and Explanation

The correct Answer is : 20-20(Approx.)

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Let \( X_1, X_2, \ldots, X_{10} \) be a random sample from the \( \text{Exp}(1) \) distribution. Define\[W = \max\{ e^{-X_1}, e^{-X_2}, \ldots, e^{-X_{10}} \}.\]Then the value of \( 22E(W) \) is equal to __________ (answer in integer).

Correct Answer: 20

Solution and Explanation

Top Questions on Sampling Distributions

Questions Asked in IIT JAM MS exam

Let \( X_1, X_2, \ldots, X_{10} \) be a random sample from the \( \text{Exp}(1) \) distribution. Define
\[W = \max\{ e^{-X_1}, e^{-X_2}, \ldots, e^{-X_{10}} \}.\]
Then the value of \( 22E(W) \) is equal to __________ (answer in integer).