Let Y be a continuous random variable with pdf f (y) = 6e-6y, 0 < y < 0, and 0 el sewhere. The moment generating function of Y is m(t) = ( 1 – t )-1 O m(t) = ( 6 – t)-10 m(t) = 3( 3 – 2t)-1 m(t) = (1 – 6t)-1O m/t) - 6LA +)-1

Let Y be a continuous random variable with pdf f (y) = 6e-6y, 0 < y < 0, and 0 el sewhere. The moment generating function of Y is m(t) = ( 1 – t )-1 O m(t) = ( 6 – t)-10 m(t) = 3( 3 – 2t)-1 m(t) = (1 – 6t)-1O m/t) - 6LA +)-1

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter4: Eigenvalues And Eigenvectors

Section4.6: Applications And The Perron-frobenius Theorem

Problem 70EQ

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Question

m(t) = 3(3 - 2t)-1 O
Let Y be a continuous random
variable with pdf
f (y) = 6e-6y, 0 < y < 0, and 0 elsewhere.
The moment generating function
of Y is
m(t) = ( 1 – t)-1O
m(t) = ( 6 – t )-1 O
m(t) = 3( 3 - 2t)-1
m(t) = (1 - 6t)-1O
m(t) = 6( 6 – t )~1 O
m(t) = 6( 1- 6t)-1 O

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