Answer:
The the expected value per roll that Chris will get is:
$ 1.5
Step-by-step explanation:
The outcomes on a six-sided cube which are even are:
{2,4,6}
The outcomes on a six-sided cube which are odd are:
{1,3,5}
Now, we know that the expected value per roll that Chris get from his father is calculated by taking the sum of the product of the price per outcome and the probability of that outcome.
He gets $ 2 for every even number and $ 1 for every odd number.
Now the probability of rolling each number is:
[tex]\dfrac{1}{6}[/tex]
Hence, the expected value is given by:
[tex]E(x)=2\times \dfrac{1}{6}+2\times \dfrac{1}{6}+2\times \dfrac{1}{6}+1\times \dfrac{1}{6}+1\times \dfrac{1}{6}+1\times \dfrac{1}{6}\\\\\\E(x)=\dfrac{2+2+2+1+1+1}{6}\\\\\\E(x)=\dfrac{9}{6}\\\\\\E(x)=\dfrac{3}{2}\\\\E(x)=1.5[/tex]
The expected value is:
$ 1.5
