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If Y has a geometric distribution with probability of success p, show that the moment-generating function for Y is pet m(t)= where q =
![6. [-/5 Points] MY NOTES ASK YOUR TEACHER PRACTICE ANOTHER Find the distributions of the random variables](https://dsd5zvtm8ll6.cloudfront.net/si.experts.images/questions/2023/05/646dda4da5be4_909646dda4d8c506.jpg)
If Y has a geometric distribution with probability of success p, show that the moment-generating function for Y is pet m(t)= where q = 1- p. (Assume that 0 < |qe| < 1.) 1- m(t) = E get - ( y -pet y o 1- (ge) get Need Help? Read It ])ar-1 6. [-/5 Points] MY NOTES ASK YOUR TEACHER PRACTICE ANOTHER Find the distributions of the random variables that have each of the following moment generating functions. (a) m(e) = [(-)e + ()] DETAILS WACKERLYSTAT7 3.9.153. The distribution is -Select-, with n= e 2-e The distribution is -Select-, with p= (b) m(t)= (c) m(t) = e(e-1) The distribution is --Select-, with = Need Help? Read It and p =
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Introductory Statistics Exploring The World Through Data
Authors: Robert Gould, Colleen Ryan
2nd Edition
9780321978509, 321978277, 321978501, 978-0321978271
