Answer:
If the stock's beta is greater than 1.0, then the change in required rate of return will be less than the change in the market risk premium.
Explanation:
1.)
Use Capital Asset Pricing Model (CAPM) formula to find the stock beta;
CAPM r = rf + beta (MRP)
whereby rf = risk free rate
MRP = Market risk premium
Next, plug in the numbers to the formula;
0.08 = 0.03 + beta (0.03)
Subtract 0.03 from both sides;
0.08 - 0.03 = 0.03 beta
0.05 = 0.03beta
Divide both sides by 0.03 to solve for beta;
0.05/0.0.3 = beta
beta = 1.67
2.)
Calculate the new rate of return and find the % change and compare with % change in market risk premium;
r = riskfree + beta(market risk premium)
Market risk premium is given as 8%
r = 0.03 + 1.67(0.08)
r = 0.03 + 0.1336
r = 0.1636 or 16.36% as a percentage
Therefore, the new rate of return is 16.36%
Change in required return = (0.1636- 0.08)/ 0.08] *100 = 104.5%
Change in market risk premium = (0.08- 0.03)/ 0.03] *100 = 166.7%
From the above analysis, if the stock's beta is greater than 1.0, then the change in required rate of return will be less than the change in the market risk premium.
