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A First Course in Probability

Sheldon M. Ross

$Math Studyset 91影视 Explanations$ Math

9th Edition 路 432 pages

ISBN: 9780321794772

Chapter 7: Q.24 (page 360)

Prove the Cauchy-Schwarz inequality, namely,
$(E [X Y])^{2} 鈮� E [X^{2}] E [Y^{2}]$
Hint: Unless $Y = - t X$ for some constant, in which case the inequality holds with equality, it follows that for all $t$ ,
$0 < E [(t X + Y)^{2}] = E [X^{2}] t^{2} + 2 E [X Y] t + E [Y^{2}]$
Hence, the roots of the quadratic equation
$E [X^{2}] t^{2} + 2 E [X Y] t + E [Y^{2}] = 0$
must be imaginary, which implies that the discriminant of this quadratic equation must be negative.

Short Answer

Expert verified

We proved the Cauchy-Schwarz inequality

$(E [X Y])^{2} 鈮� E [X^{2}] E [Y^{2}]$

Step by step solution

01

Given information

Given in the question that, We need to prove the Cauchy-Schwarz inequality

$(E [X Y])^{2} 鈮� E [X^{2}] E [Y^{2}]$

02

Explanation

Let us assume that $E [Y^{2}] 鈮� 0$ , otherwise, we have $Y = 0$ with probability and hence $E [X Y] = 0$ , so the inequality holds.

We have,

$= E [X^{2}] 鈭� 2 \frac{E [X Y]}{E [Y^{2}]} E [X Y] + \frac{(E [X Y])^{2}}{E {[Y^{2}]}^{2}} E [Y]^{2}$

$= E [X^{2}] 鈭� \frac{E [X Y]}{E [Y^{2}]} 鈬�$

$(E [X Y])^{2} 鈮� E [X^{2}] E [Y^{2}]$

03

Final answer

We proved the Cauchy-Schwarz inequality

$(E [X Y])^{2} 鈮� E [X^{2}] E [Y^{2}]$

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Most popular questions from this chapter

If $Y = a X + b$ where a and b are constants, express the moment generating function of $Y$ in terms of the moment generating function of $X$ .

A fair die is successively rolled. Let X and Y denote, respectively, the number of rolls necessary to obtain a 6 and a 5. Find

(a) $E [X]$ ;

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Consider $n$ independent trials, each resulting in any one of $r$ possible outcomes with probabilities $P_{1}, P_{2}, 鈥�, P_{r}$ . Let $X$ denote the number of outcomes that never occur in any of the trials. Find $E [X]$ and show that among all probability vectors $P_{1}, 鈥�, P_{r}, E [X]$ is minimized when $P_{i} = 1 / r, i = 1, 鈥�, r .$

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