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Answer:
a. i. Alpha of stock A is 1 and of stock B is 2
ii. Information ratio of stock A is 0.090 and of stock B is 0.1005
iii. Sharpe measure of stock A is 0.3215 and of stock B is 0.2264
iv. Treynor measure of stock A is 5.83 and of stock B is 7.5
b. i. Stock A
ii. Stock B
iii. Stock B
Explanation:
a. i. To calculate Alpha of both Stock A and Stock B we would have to use the following formula:
βα∝p=rp-(rf+βp(rm-rf)
Therefore Alpha stock A= 1
Alpha stock B= 2
ii. To calculate the Information ratio of both Stock A and Stock B we would have to use the following formula:
information ratio=∝p/σep
information ratio stock A=1/11.1=0.090
information ratio stock B=2/19.9=0.1005
iii. To calculate the Sharpe measure of both Stock A and Stock B we would have to use the following formula:
Sharpe measure= Sp=(rp-rf)/σp
Sharpe measure stock A= (1%+1.2(12%-7%))/22.4%
Sharpe measure stock A=0.3125
Sharpe measure stock B= (2%+0.8(12%-7%))/26.5%
Sharpe measure stock B=0.2264
iv. To calculate the Treynor measure of both Stock A and Stock B we would have to use the following formula:
Treynor measure=(rp-rf)βp
Treynor measure of stock A= (1%+1.2(12%-7%))/1.2
Treynor measure of stock A=5.83
Treynor measure of stock B=(2%+0.8(12%-7%))/0.8
Treynor measure of stock B=7.5
B. i. In this circumstance sharpe ratio is helpful in ranking the portfolio of stocks. Stock A performed better than Stock B. Therefore, Stock A is the best choice.
ii. When the stock will be mixed with the rest of the investor’s portfolio you need to see the alpha. Stock B has higher alpha, therefore stock B is the best choice
iii. When theinvestor is analyzing to form an actively managed stock portfolio you need to see the Treynor Measure. Stock B has higher Treynor measure. Therefore Stock B is the best choice.
index-model regression is a type of asset evaluating risks and the returns regarding the stocks and the portfolios. This deals with the securities and the portfolios.
a. i. Alpha of stock A is 1 and of stock, B is 2
ii. Information ratio of stock A is 0.090 and of stock, B is 0.1005
iii. Sharpe measure of stock A is 0.3215 and of stock, B is 0.2264
iv. Treynor measure of stock A is 5.83 and of stock, B is 7.5
b. i. Stock A
ii. Stock B
iii. Stock B
a. i. To calculate the Alpha of both Stock A and Stock B we would have to use the following formula:
βα∝p=rp-(rf+βp(rm-rf)
Therefore, Alpha stock A= 1
Alpha stock B= 2
ii. To calculate the Information ratio of both Stock A and Stock B we would have to use the following formula:
[tex]\text{information ratio}=\frac{∝p}{σep}\\\text{information ratio stock A}=\frac{1}{11.1}=0.090\\\text{information ratio stock} B=\frac{2}{19.9}=0.1005[/tex]
iii. To calculate the Sharpe measure of both Stock A and Stock B we would have to use the following formula:
Sharpe measure= Sp=(rp-rf)/σp
[tex]\text{Sharpe measure stock A}= \frac{1\%+1.2(12\%-7\%}{22.4\%}[/tex]
Sharpe measure stock A=0.3125
[tex]\text{Sharpe measure stock B}= \frac{2\%+0.8(12\%-7\%}{26.5\%}[/tex]
Sharpe measure stock B=0.2264
iv. To calculate the Treynor measure of both Stock A and Stock B we would have to use the following formula:
Treynor measure=(rp-rf)βp
[tex]\text{Treynor measure of stock A}= \frac{1\%+1.2(12\%-7\%}{1.2}[/tex]
Treynor measure of stock A=5.83
[tex]\text{Treynor measure of stock B}=\frac{2\%+0.8(12\%-7\%}{0.8}[/tex]
Treynor measure of stock B=7.5
B. i. In this circumstance, the Sharpe ratio is helpful in ranking the portfolio of stocks. Stock A performed better than Stock B. Therefore, Stock A is the best choice.
ii. When the stock will be mixed with the rest of the investor’s portfolio you need to see the alpha. Stock B has higher alpha, therefore stock B is the best choice
iii. When the investor is analyzing to form an actively managed stock portfolio you need to see the Treynor Measure. Stock B has a higher Treynor measure. Therefore Stock B is the best choice.
To know more about the index-model regression, refer to the link below:
https://brainly.com/question/15404474
