Respuesta :
a) Let x = first score and y = second score
E[x] = 20.9 and E[y] = 20.9
E[x-y] = E[x] – E[y] = 20.9 – 20.9 = 0
b) Standard deviation
= Var[x-y] = Var[x] + Var [y]
= 4.8^2 + 4.8^2 = 46.08
SD[x-y] = sqrt(Var[x-y])
= sqrt(46.08)
= 6.8
c) Z = +/- (mean-x)/SD = +- (0-6)/6.8 = +/- 0.88
From Z table: P(Z<-0.88 or Z>0.88)
= 2*P(Z>0.88)
= 2*0.1894
= 0.3788
E[x] = 20.9 and E[y] = 20.9
E[x-y] = E[x] – E[y] = 20.9 – 20.9 = 0
b) Standard deviation
= Var[x-y] = Var[x] + Var [y]
= 4.8^2 + 4.8^2 = 46.08
SD[x-y] = sqrt(Var[x-y])
= sqrt(46.08)
= 6.8
c) Z = +/- (mean-x)/SD = +- (0-6)/6.8 = +/- 0.88
From Z table: P(Z<-0.88 or Z>0.88)
= 2*P(Z>0.88)
= 2*0.1894
= 0.3788
Using subtraction of normal variables, it is found that:
a) The expected difference in their scores is 0.
b) The standard deviation in the difference of their scores is 6.7882.
c) 0.3788 = 37.88% probability that the difference in the two students scores is greater than 6.
In a normal distribution with mean [tex]\mu[/tex] and standard deviation [tex]\sigma[/tex], the z-score of a measure X is given by:
[tex]Z = \frac{X - \mu}{\sigma}[/tex]
- It measures how many standard deviations the measure is from the mean.
- After finding the Z-score, we look at the z-score table and find the p-value associated with this z-score, which is the percentile of X.
- When two normal variables are subtracted, the mean is the subtraction of the means, while the standard deviation is the square root of the sum of the variances.
Item a:
- Two values from the same distribution, thus the subtraction of the means is 0, which means that the expected difference in their scores is 0.
Item b:
- The standard deviation is the square root of the sum of the variances, then:
[tex]\sigma = \sqrt{4.8^2 + 4.8^2} = 6.7882[/tex]
The standard deviation in the difference of their scores is 6.7882.
Item c:
- First, we find the z-score when X = 6.
[tex]Z = \frac{X - \mu}{\sigma}[/tex]
[tex]Z = \frac{6 - 0}{6.7882}[/tex]
[tex]Z = 0.88[/tex]
- The difference can be of 6 to both sides, thus we want P(|Z| > 0.88), which is 2 multiplied by the p-value of Z = -0.88.
- Looking at the z-table, Z = -0.88 has a p-value of 0.1894.
- 2 x 0.1894 = 0.3788
0.3788 = 37.88% probability that the difference in the two students scores is greater than 6.
A similar problem is given at https://brainly.com/question/24250158
