We're given a random sample of X_1,X_2,....,X_n from a distribution with a pdf of f(x;theta)=theta^x(1−theta),x=0,1,2,.... and 0<theta<1 Show that that Tn= sum_i=0^n X_i is a complete sufficient statistic for theta.

Barrett Osborn

Barrett Osborn

Answered question

2022-11-02

We're given a random sample of X 1 , X 2 , . . . . , X n from a distribution with a pdf of
f ( x ; θ ) = θ x ( 1 θ ) , x = 0 , 1 , 2 , . . . . and 0 < θ < 1
Show that that T n = i = 0 n X i is a complete sufficient statistic for θ.

Answer & Explanation

Houston Ochoa

Houston Ochoa

Beginner2022-11-03Added 19 answers

X i is a geometric random variable. Thus T n is the number of tails that appear before the nth heads, when repeatedly flipping a coin that has a θ chance of being tails. You can show that the PMF is
P ( T n = k ) = ( n + k 1 k ) θ k ( 1 θ ) n

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