A stock is expected to earn 15 percent in a boom economy and 7 percent in a normal economy. There is a 35 percent chance the economy will boom and a 65.0 percent chance the economy will be normal. What is the standard deviation of these returns?

A. 3.82 PercentB. 4.85 PercentC. 4.97 PercentD. 5.63 Percent.

Question

Business

Frida Hays

26 April, 19:01

A stock is expected to earn 15 percent in a boom economy and 7 percent in a normal economy. There is a 35 percent chance the economy will boom and a 65.0 percent chance the economy will be normal. What is the standard deviation of these returns?

A. 3.82 PercentB. 4.85 PercentC. 4.97 PercentD. 5.63 Percent.

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Answers (1)

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Louis Dalton · Answer 1

A. 3.82

Explanation:

First, find the expected return of the stock;

E (r) = SUM (prob * return)

E (r) = (0.35 * 0.15) + (0.65 * 0.07)

= 0.0525 + 0.0455

=0.098 or 9.8%

Next, use the variance formula to find the stock's standard deviation;

σ² = 0.35 (0.15 - 0.098) ² + 0.65 (0.07 - 0.098) ²

σ² = 0.0009464 + 0.0005096

σ² = 0.001456

As a percentage, it becomes; 0.001456 * 100 = 0.1456%

The variance is therefore 0.1456%

Find standard deviation;

Standard deviation = SQRT (0.001456)

STDEV = 0.03816 or 3.82%