Given a risk-free rate of return of 3.7 percent and a market risk premium of 8.8 percent, one of these stocks has an expected return that matches the market’s required rate of return. For the other stock, the expected return does not equal the market’s required rate of return. Expected Stock Beta Return A 0.65 6.80 B 1.22 14.44% For the incorrectly priced stock, according to the SML/CAPM at what rate of return would that stock’s price then be in equilibrium with the market?

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ewomazinoade ewomazinoade · Answer 1 · 2020-08-05T03:29:56+02:00

Answer:

9.42%

Explanation:

According to the CAPM,

market required rate of return = risk free rate + (beta x market risk premium)

for stock A :

3.7% + (0.65 X 8.8%) = 9.42%

The market required rate of return isn't equal to the expected return based on the calculation.

for stock B :

3.7% + (1.22 X 8.8%) = 14.44%

for stock B, they both match

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topeadeniran2 topeadeniran2 · Answer 2 · 2021-11-25T18:41:18+01:00

The market required rate of return will be 9.42%.

According to the information given, the market required rate of return for stock A will be calculated thus:

= Risk free rate + (Beta × Market risk premium)

= 3.7% + (0.65 × 8.8%)

= 9.42%

The market required rate of return for stock B will be calculated thus:

= Risk free rate + (Beta × Market risk premium)

= 3.7% + (1.22 × 8.8%)

= 14.44%

For stock A, the market required rate of return isn't equal to the expected return while it's equal for stock B.

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