Answer:
Step-by-step explanation:The expected value of a function of a random variable is given by the integral of the function times the probability density function of the random variable.
For a normal distribution, the probability density function is given by:
So, the expected value of is given by:
Substituting and into the equation gives:
This integral is not straightforward to solve, but it is a known result that the expected value of an exponential of a normally distributed random variable is:
So, the expected value of where is normally distributed with mean and standard deviation is:
E[Y]=e