Answer:
The level of risk aversion must be less than 2.27 for the risky portfolio to be preferred to bills.
Step-by-step explanation:
Let U presents utility level. Therefore, we can specify U as follows:
U = E(r) - (0.5 * A * SD^2) ........................... (1)
Where, risky portfolio, we have:
E(r) = expected rate of return = 11%, or 0.11
SD = Standard deviation = 21%, or 0.21
A = Level of risk aversion = ?
Substituting the values into equation (1), we have:
U of risky portfolio = 0.11 - (0.5 * A * 0.21^2)
U of risky portfolio = 0.11 - (A * 0.02205)
Since the T-bills offer a risk-free 6% rate of return, it therefore implies that:
U of T-bill = 6%, 0.06
Therefore, the following must hold for the risky portfolio to be preferred to bills:
U of risky portfolio > U of T-bill ............................. (2)
Substituting the values for the expression above and solve for A, we have:
0.11 - (A * 0.02205) > 0.06
-(A * 0.02205) > 0.06 - 0.11
-(A * 0.02205) > - 0.05
Divide through by -1 and change the inequality sign, we have:
A * 0.02205 < 0.05
A < 0.05 / 0.02205
A < 2.27
Therefore, the level of risk aversion must be less than 2.27 for the risky portfolio to be preferred to bills.