find the expected value (μ) of the random variable with the given probability distribution. do not round…

find the expected value (μ) of the random variable with the given probability distribution. do not round your answer.
Answer
Explanation:
Step1: Recall the formula for expected value
The formula for the expected value $\mu$ of a discrete random variable is $\mu=\sum_{i}x_iP(x_i)$.
Step2: Calculate each term $x_iP(x_i)$
- For $x = - 1$ and $P(-1)=0.05$: $(-1)\times0.05=-0.05$
- For $x = 1$ and $P(1)=0.18$: $1\times0.18 = 0.18$
- For $x = 3$ and $P(3)=0.21$: $3\times0.21=0.63$
- For $x = 5$ and $P(5)=0.23$: $5\times0.23 = 1.15$
- For $x = 7$ and $P(7)=0.14$: $7\times0.14=0.98$
- For $x = 9$ and $P(9)=0.19$: $9\times0.19 = 1.71$
Step3: Sum up all the terms
$\mu=-0.05 + 0.18+0.63+1.15+0.98+1.71$ $=-0.05+(0.18 + 0.63)+(1.15+0.98)+1.71$ $=-0.05 + 0.81+2.13+1.71$ $=( - 0.05+0.81)+(2.13+1.71)$ $=0.76+3.84$ $=4.6$
Answer:
$4.6$