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Jaqueline Kirby

Jaqueline Kirby

Answered question

2022-06-16

Let X N ( 0 , 1 ) and define
W = { 0 X < 0 X X 0 = X 1 X 0
How can I calculate E [ X | W ] ?
Here's what I have tried so far:
I want to identify this random variable for any value w such that W = w. So I first noticed that
And now all I have to do is to calculate E [ X | W = 0 ] . Since W is neither a continuous or a discrete time variable, Im not sure how to express the conditioned density. Any help would be appreciated.
Thanks in advance.

Answer & Explanation

Bruno Hughes

Bruno Hughes

Beginner2022-06-17Added 24 answers

W = 0 iff X 0. So E ( X | W = 0 ) = E ( X | X 0 ). By symmetry of N ( 0 , 1 ) we have E ( X | X > 0 ) = E ( X | X < 0 ). Also E | X | = E ( X I X > 0 ) + E ( X I X < 0 ). Combine these to get E ( X | W = 0 ) = 1 2 E | X | and E | X | = 2 π

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