"Assume that the paired data came from a population that is normally distributed. Using a 0.05 significance level and d = (x - y), find [tex] \bar{d} [/tex], [tex] s_{d} [/tex], the t-test statistic, and the critical values to test the claim that [tex] \mu_{d} = 0 [/tex]"
You did not attach the data, therefore I can give you the general explanation on how to find the values required and an example of a random paired data.
For the example, please refer to the attached picture.
A) Find [tex] \bar{d} [/tex]
You are asked to find the mean difference between the two variables, which is given by the formula:
[tex]\bar{d} = \frac{\sum (x - y)}{n} [/tex]
These are the steps to follow:
1) compute for each pair the difference d = (x - y)
2) sum all the differences
3) divide the sum by the number of pairs (n)
In our example:
[tex]\bar{d} = \frac{6}{8} = 0.75 [/tex]
B) Find [tex] s_{d} [/tex]
You are asked to find the standard deviation, which is given by the formula:
[tex] s_{d} = \sqrt{ \frac{\sum(d - \bar{d}) }{n-1} } [/tex]
These are the steps to follow:
1) Subtract the mean difference from each pair's difference
2) square the differences found
3) sum the squares
4) divide by the degree of freedom DF = n - 1
In our example:
[tex]s_{d} = \sqrt{ \frac{101.5}{8-1} }[/tex]
= √14.5
= 3.81
C) Find the t-test statistic.
You are asked to calculate the t-value for your statistics, which is given by the formula:
[tex]t = \frac{(\bar{x} - \bar{y}) - \mu_{d} }{SE} [/tex]
where SE = standard error is given by the formula:
[tex]SE = \frac{ s_{d} }{ \sqrt{n} } [/tex]
These are the steps to follow:
1) calculate the standard error (divide the standard deviation by the number of pairs)
2) calculate the mean value of x (sum all the values of x and then divide by the number of pairs)
3) calculate the mean value of y (sum all the values of y and then divide by the number of pairs)
4) subtract the mean y value from the mean x value
5) from this difference, subtract [tex] \mu_{d} [/tex]
6) divide by the standard error
In our example:
SE = 3.81 / √8
= 1.346
The problem gives us [tex] \mu_{d} = 0 [/tex], therefore:
t = [(9.75 - 9) - 0] / 1.346
= 0.56
D) Find [tex] t_{\alpha / 2} [/tex]
You are asked to find what is the t-value for a 0.05 significance level.
In order to do so, you need to look at a t-table distribution for DF = 7 and A = 0.05 (see second picture attached).
We find [tex] t_{\alpha / 2} = 1.895[/tex]
Since our t-value is less than [tex] t_{\alpha / 2}[/tex] we can reject our null hypothesis!!
