You are considering two mutual funds as an investment. The possible returns for the funds are dependent on the state of the economy and are given in the accompanying table.
| State of the Economy | Fund 1 | Fund 2 | ||
| Good | 43 | % | 48 | % |
| Fair | 15 | % | 17 | % |
| Poor | −10 | % | −19 | % |
You believe that the likelihood is 15% that the economy will be good, 53% that it will be fair, and 32% that it will be poor.
a. Find the expected value and the standard deviation of returns for Fund 1. (Round intermediate calculations to at least 4 decimal places and final answers to 2 decimal places.)
b. Find the expected value and the standard deviation of returns for Fund 2. (Round intermediate calculations to at least 4 decimal places and final answers to 2 decimal places.)
c. Which fund will you pick if you are risk averse?
let x and y are outcome of first and 2nd fund
| x | y | f(x,y) | x*f(x,y) | y*f(x,y) | x^2f(x,y) | y^2f(x,y) | xy*f(x,y) |
| 43 | 48 | 0.15 | 6.45 | 7.2 | 277.35 | 345.6 | 309.6 |
| 15 | 17 | 0.53 | 7.95 | 9.01 | 119.25 | 153.17 | 135.15 |
| -10 | -19 | 0.32 | -3.2 | -6.08 | 32 | 115.52 | 60.8 |
| Total | 1 | 11.2 | 10.13 | 428.6 | 614.29 | 505.55 | |
| E(X)=ΣxP(x,y)= | 11.2 | ||||||
| E(X2)=Σx2P(x,y)= | 428.6 | ||||||
| E(Y)=ΣyP(x,y)= | 10.13 | ||||||
| E(Y2)=Σy2P(x,y)= | 614.29 | ||||||
| Var(X)=E(X2)-(E(X))2= | 303.16 | ||||||
| Var(Y)=E(Y2)-(E(Y))2= | 511.6731 | ||||||
a)
expected value =11.20
standard deviation =sqrt(303.16)=17.41
b)
expected value =10.13
standard deviation =sqrt(511.67)=22.62
c)
we should pick fund 1 ; as it has lower standard deviation and higher expected return
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