Answer:
[tex] s^2_Y = 200^2= 40000[/tex]
Explanation:
Data given
From the info given we have the following conditions:
[tex] \bar Y = 10 \bar X[/tex]
[tex]s^2_x = 100[/tex]
[tex] s_x = 10[/tex]
[tex] CV_x = 10\% = 0.1[/tex]
[tex] CV_y = 20\% = 0.2[/tex]
And we want to find [tex] s^2_y =?[/tex]
Solution to the problem
From the definition of variation coefficient we know this:
[tex] CV_x = 0.1=\frac{S_x}{\bar X} [/tex]
From this condition we can solve for [tex] \bar X[/tex] and we got:
[tex] \bar X = \frac{10}{0.1}=100[/tex]
Now we can find [tex] \bar Y [/tex] like this:
[tex] \bar Y = 10*100 = 1000[/tex]
Now from the definition for coefficient of variation for Y we have:
[tex] CV_y = 0.2=\frac{S_y}{\bar Y} [/tex]
We can solve for [tex] S_y[/tex] and we got:
[tex] S_y = 0.2*1000= 200[/tex]
And finally the variance would be:
[tex] s^2_Y = 200^2= 40000[/tex]
