Answer:
The degrees of freedom are given by:
[tex] df = n_A +n_B -2 = 18 +15-2= 31[/tex]
And the 90% confidence interval for this case is:
[tex] -1.90 \leq \mu_A -\mu_B \leq 0.13[/tex]
And for this case since the confidence interval contains the value 0 we can conclude that:
A. We are 90% confident that, on average, there is no difference in operating hours between toothbrushes from Company A compared to those from Company B.
Step-by-step explanation:
We know the following info given:
[tex] \bar X_A= 119.7[/tex] sample mean for A
[tex] s_A = 1.74[/tex] sample deviation for A
[tex] n_A = 18[/tex] sample size from A
[tex] \bar X_B= 120.6[/tex] sample mean for B
[tex] s_B = 1.72[/tex] sample deviation for B
[tex] n_B = 15[/tex] sample size from B
The degrees of freedom are given by:
[tex] df = n_A +n_B -2 = 18 +15-2= 31[/tex]
And the 90% confidence interval for this case is:
[tex] -1.90 \leq \mu_A -\mu_B \leq 0.13[/tex]
And for this case since the confidence interval contains the value 0 we can conclude that:
A. We are 90% confident that, on average, there is no difference in operating hours between toothbrushes from Company A compared to those from Company B.
