Answered: II. Let X be a discrete random variable… | bartleby

College Algebra

College Algebra

7th Edition

ISBN:9781305115545

Author:James Stewart, Lothar Redlin, Saleem Watson

Publisher:James Stewart, Lothar Redlin, Saleem Watson

Chapter9: Counting And Probability

Section9.4: Expected Value

Problem 20E

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Question

II. Let X be a discrete random variable with possible values xi, i=1,2,.., and p(xi)=P(X=xi) is called
the probability distribution function of X. We have > p(x,)=.
The expected value,
also called expectation, average, or mean, of X is defined as u= E(X)=,
For any function g(x), x=1,2,3,.., E(g(x)) =.
. The variance of
X: Var(X)=
Since we have
E(X – µ)²
= E(X² – 2µX + µ)
= EX² – 2µEX + µ²
= EX² – (EX)²
the variance of X: Var(X)=.

Expert Solution

Step 1

The given statements can be completed as follows,

Let X be a discrete random variable with possible values xi, i=1,2,3..., and p(xi)=P(X=xi) is called the probability distribution function of X. We have $\sum_{i} p (x_{i}) = 1$ . The expected value, also called expectation, average or mean, of X is defined as $μ = E (X) = \sum_{i} x_{i} p (x_{i})$ . For any function $g (x)$ , x=1,2,3, $E (g (x)) = \sum_{i} g (x_{i}) p (x_{i})$ . The variance of X: $V a r (X) = \underset{}{E [{(X - μ)}^{2}] =} \sum_{i} {(x_{i} - μ)}^{2} p (x_{i})$ .

Since we have

$\begin{array}{rcl} E [{(X - μ)}^{2}] & = & E (X^{2} - 2 μ X + μ^{2}) \\ = & E (X^{2}) - 2 μ E (X) + μ^{2} \\ = & E (X^{2}) - {[E (X)]}^{2} \end{array}$

the variance of X : $V a r (x) = E (X^{2}) - {[E (X)]}^{2}$ .

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