1. Julia plays the following game: There is a bag full of 10 chips. There are 3
ID: 2921501 • Letter: 1
Question
1. Julia plays the following game: There is a bag full of 10 chips. There are 3 win- ning chips and 7 losing chips. Julia is allowed to draw 2 chips (without replacement). For each winning chip she pulls out, she wins $2. However, the gaie costs $1.50 to play. (So her actual winnings if she pulls out a single winning chip is only $0.50.) Let X be her winnings. (a) Find the expected value and variance for the random variable N (b) Based on your answer to part (a), should she play the game? (c) What is a fair price for this game? That is, how much should Julia be for this game for the expected value to be 0?Explanation / Answer
a)here P(X= -1.5)=P( both losing chips) =(7/10)*(6/9)=7/15
P(X=0.5)=P( one losing and one winnig chip) =2*(7/10)*(3/9)=7/15
P(X=2.5)=P( both winning chips)=(3/10)*(2/9)=1/15
hence
expected value =$-0.30
and variance =1.4933
b)No as expected value is less then 0; she should not continuw with game
c)
for fair price ; expected value should be 0;
hence fair price =1.5-0.3 =$1.20
please revert for any clarification
x p(x) xP(x) x2P(X) (x-)2 (x-)2P(x) -1.5 7/15 -0.700 1.050 1.440 0.672 0.5 7/15 0.233 0.117 0.640 0.299 2.5 1/15 0.167 0.417 7.840 0.523 total 1 = -0.30 1.583 9.920 2= 1.4933Related Questions
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