Prove Jensens Inequality, which states that if f is a convex function, then E[f (X)] f

Question:

Prove Jensen’s Inequality, which states that if f is a convex function, then E[f (X)] ≥ f (E[X]) for any random variable X.

Hint: Consider the following Taylor series expansion for f (x) with a remainder term:

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Introduction To Probability Models

ISBN: 9780443187612

13th Edition

Authors: Sheldon M. Ross

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Question Posted: Sep 06, 2024 05:00 AM

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Prove Jensens Inequality, which states that if f is a convex function, then E[f (X)] f

Question:

f(x) = f(a)+ f'(a)(x-a)+f"(c)(x-a)/2

Step by Step Answer:

Introduction To Probability Models

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