Answer in Statistics and Probability for Amoah Henry #114988

Question #114988

Let X be a continuous r.v with density function f(x) =  |x| 10 0, . Calculate the expected value of X

Expert's answer

Let $X$ be a continuous r.v with density function

f(x) = \begin{cases} {|x|\over 10}, &\text{for}\ -2<x<4 \\ 0 &\text{elsewhere} \end{cases}

Calculate the expected value of $X.$

E(X)=\mu_X=\displaystyle\int_{-\infin}^{\infin}xf(x)dx=

=\displaystyle\int_{-2}^{0}x({-x\over 10})dx+\displaystyle\int_{0}^{4}x({x\over 10})dx=

=\bigg[-{x^3\over 30}\bigg]\begin{matrix} 0 \\ -2 \end{matrix}+\bigg[{x^3\over 30}\bigg]\begin{matrix} 4 \\ 0 \end{matrix}={8\over 30}+{64\over 30}=2.4

$E(X)=2.4$

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