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Description: Prove this statement: For a discrete random variable X and constants a and b, E(aX + b) = aE(X) + b. (You'll want to use facts about sums from Calculus 2 here.)

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Prove this statement: For a discrete random variable X and constants a and b, E(aX + b) = aE(X) + b. (You'll want to use facts about sums from Calculus 2 here.)

A First Course in Probability (10th Edition)

10th Edition

ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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Topic Video

Question

Prove this statement: For a discrete random variable X and constants a and b, E(aX + b) = aE(X) + b. (You'll want to use facts about sums from Calculus 2 here.)

Expert Solution

Step 1

Answer:

E(aX + b) = aE(X) + b.

discrete random variable X and constants a and b

Proof:

E(aX + b)=a E(x) + b ......... equation(1)

L.H.S of equation (1) = E ( a x + b )

= $\sum_{}^{} (a x + b) * P (x) . . . . . d e f i n a t o n o f e x p e c t a t i o n$

= $\sum_{}^{} a x P (x) + \sum_{}^{} b P (x)$

= ${a \sum}_{}^{} x P (x) + b \sum_{}^{} P (x) . . . . . . . a n d b a r e c o n s \tan t s$

= a E(x) +b ......[ P(x) = 1 ] and $\sum_{}^{} x P (x) = E (x)$

= R.H.S ..... equation (2)

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