Respuesta :
Answer:
The range of returns that would be expected to be seen 99 percent of the time is (-25.5%, 38.5%).
Explanation:
Let the random variable X represent the percentage of returns produced by a stock.
The data for the return produced over the past four year is:
S = {13%, -9%, 8%, 14%}
Compute the average return as follows:
[tex]\text{Average Return}=\bar X[/tex]
[tex]=\frac{1}{4}\times [0.13-0.09+0.08+0.14]\\\\=0.065[/tex]
Compute the standard deviation of returns as follows:
[tex]\text{Standard deviation of Returns}(s)=\sqrt{\frac{1}{n-1}\cdot\ \sum(X-\bar X)^{2}}\\\\[/tex]
[tex]=\sqrt{\frac{1}{4-1}\cdot\ [(0.13-0.065)^{2}+(-0.09-0.065)^{2}\\+(0.08-0.065)^{2}+(0.14-0.065)^{2}]}\\\\=0.1066[/tex]
The 99% probability range is given by:
[tex]\text{99 percent range}=\bar X\pm 3\cdot s[/tex]
Compute the range of returns that would be expected to be seen 99 percent of the time as follows:
[tex]\text{99 percent range}=\bar X\pm 3\cdot s[/tex]
[tex]=0.065\pm 3\times 0.1066\\\\=0.065\pm 0.3198\\\\=(-0.2548,0.3848)\\\\\approx (-0.255,0.385)[/tex]
Thus, the range of returns that would be expected to be seen 99 percent of the time is (-25.5%, 38.5%).
