Answer:
The critical region is t ≥ t(0.025, 7) = 2.365
Since the calculated value of t= 18.50249 falls in the critical region we reject the null hypothesis and conclude that there is sufficient reason to support the claim of a linear relationship between the two variables.
Step-by-step explanation:
We set up our hypotheses as
H0: β= 0  the two variable X and Y are not related
Ha: β  ≠0. the two variables X and Y are related.
The significance level is set at α =0.05
The test statistic if, H0 is true, is  t= b/s_b
Where  Sb =S_yx/√(∑(X-X`)^2 )
Syx = √((∑(Y-Y`)^2 )/(n-2))
In the given question we have the estimated regression line as y= 0.449x - 30.27
X Y X2 Â Â Â Â Y2 Â Â Â XY
72 3 5184 9 Â Â 216
85 7 7225 49 Â Â 595
91 10 8281 100 Â Â Â 910
90 10 8100 100 Â Â Â 900
88 8 7744 64 Â Â Â 704
98 15 9604 225 Â Â Â 1470
75 4 5625 16 Â Â Â 300
100 15 10000 225 Â Â Â 1500
80 5 6400 25 Â Â Â Â 400 Â Â Â Â
∑779 77 68163 813 6995
Now finding the variances
∑(Y-Y`)^2  = ∑〖Y^2- a〗 ∑Y- b∑XY
           = 813 – (- 30.27)77 - 0.449(6995)
            = 813+2330.79 – 3140.755
            = 3.035
∑(X-X`)^2 =  ∑X^2  – (∑〖X)〗^2 /n
          = 68163 – (779)2/9
          = 736.22
Syx = √((∑(Y-Y`)^2 )/(n-2))  = √(3.035/7) = 0.65846 and
Sb =S_yx/√(∑(X-X`)^2 ) = (0.65846  )/27.13337 = 0.024267
t= b/s_b  = 0.449/ 0.024267 = 18.50249
The critical region is t ≥ t(0.025, 7) = 2.365
Since the calculated value of t= 18.50249 falls in the critical region we reject the null hypothesis and conclude that there is sufficient reason to support the claim of a linear relationship between the two variables.
