Answer:
i think its D. C. or E. I'm not that great in math im kind of struggling thru it
Answer:
D)
Step-by-step explanation:
Let's start writing the data from the exercise.
The random variables are :
X : '' Weight of fleece produced by a sheep from Northern Farm ''
Y : '' Weight of fleece produced by a sheep from Western Farm ''
W : '' Total weight of fleece from 10 randomly selected sheep from Northern Farm and 15 randomly selected sheep from Western Farm ''
Let's use μ to denote mean, σ to denote standard deviation and VAR to denote variance.
In the exercise :
μ(X) = 14.1 pounds
σ(X) = 1.3 pounds
μ(Y) = 6.7 pounds
σ(Y) = 0.5 pounds
The equation that represents W is
[tex]W=10X+15Y[/tex]
Let's suppose that we have two random variables X1 and X2. Let's also assume that X1 and X2 are independent. If we have the following linear combination of the random variables :
aX1 + bX2
The variance of the linear combination is :
[tex]VAR(aX1+bX2)=a^{2}VAR(X1)+b^{2}VAR(X2)[/tex]
Applying this to the exercise :
[tex]VAR(W)=VAR(10X+15Y)=10^{2}VAR(X)+15^{2}VAR(Y)[/tex] (I)
We know that VAR(X) = σ²(X) ⇒
[tex]VAR(X)=(1.3pounds)^{2}[/tex]
And also
[tex]VAR(Y)=(0.5pounds)^{2}[/tex]
If we replace in (I) ⇒
[tex]VAR(W)=(10)^{2}(1.3)^{2}+(15)^{2}(0.5)^{2}[/tex]
Given that we find the variance of W, If we want to obtain the standard deviation we need to apply square root to the variance of W ⇒
σ(W) = [tex]\sqrt{(10)^{2}(1.3)^{2}+(15)^{2}(0.5)^{2}}[/tex]
Finally, the correct option is D)
