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For i≥1 , let Xi∼G1/2 be distributed Geometrically with parameter 1/2 . Define Yn=1n−−√∑i=1n(Xi−2) Approximate P(−1≤Yn≤2) with large enough n .

For i≥1 , let Xi∼G1/2 be distributed Geometrically with parameter 1/2 . Define Yn=1n−−√∑i=1n(Xi−2) Approximate P(−1≤Yn≤2) with large enough n .
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For i≥1 , let Xi∼G1/2 be distributed Geometrically with parameter 1/2 . Define Yn=1n−−√∑i=1n(Xi−2) Approximate P(−1≤Yn≤2) with large enough n .

User TigOldBitties
by
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1 Answer

4 votes

Answer:

The answer is "0.68".

Explanation:

Given value:


X_i \sim (G_1)/(2)


E(X_i)=2 \\


Var (X_i)= (1- (1)/(2))/(((1)/(2))^2)\\


= ( (2-1)/(2))/((1)/(4))\\\\= ( (1)/(2))/((1)/(4))\\\\= (1)/(2) * (4)/(1)\\\\= (4)/(2)\\\\=2

Now we calculate the
\bar X \sim N(2, \sqrt{(2)/(n)})\\


\to \frac{\bar X - 2}{\sqrt{(2)/(n)}} \sim N(0, 1)\\


\to \sum^n_(i=1) (X_i - 2)/(n) *\sqrt{(n)/(2)}} \sim N(0, 1)\\\\\to \sum^n_(i=1) (X_i - 2)/(√(2n)) \sim N(0, 1)\\


\to Z_n = (1)/(√(n)) \sum^n_(i=1) (X_i -2) \sim N(0, 2)\\


\to P(-1 \leq X_n \leq 2) = P(Z_n \leq Z) -P(Z_n \leq -1) \\\\


= 0.92 -0.24\\\\= 0.68

User Caridorc
by
7.9k points
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