Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
Find the 95% confidence interval for the difference between two means based on this information about two samples. Assume indep...Asked by Tracy
Find the 95% confidence interval for the difference between two means based on this information about two samples. Assume independent samples from normal populations. (Use conservative degrees of freedom.) (Give your answers correct to two decimal places.)
Sample Number Mean Std. Dev.
1 27 39 21
2 16 26 35
Lower Limit
Upper Limit
Sample Number Mean Std. Dev.
1 27 39 21
2 16 26 35
Lower Limit
Upper Limit
Answers
Answered by
Eli
xbar1 - xbar2 -+ ta/2 * sqrt(s1^2/n2 + s2^2/n2)
13 -+ 2.02* sqrt(21^2/27 + 35^2 /16))
(-6.47, 32.47)
Answered by
Tracy
Those was not the right answers, the ones that I had got previous was also close to them.
Answered by
Eli
For pooled
sp = (n1-1)s1^2 + (n2-1)s2^2 /(n1+n2-2)
Sqrt(29841/41 )
= 26.978
Confidence interval
The degrees of freedom of t is n1+ n2 -2
xbar1-xbar2 -+ta/2 *sp*sqrt(1/n1 +1/n2))
(39-26)-+ 2.02* 26.978sqrt(1/27+ 1/16))
(-4.19, 30.19)
sp = (n1-1)s1^2 + (n2-1)s2^2 /(n1+n2-2)
Sqrt(29841/41 )
= 26.978
Confidence interval
The degrees of freedom of t is n1+ n2 -2
xbar1-xbar2 -+ta/2 *sp*sqrt(1/n1 +1/n2))
(39-26)-+ 2.02* 26.978sqrt(1/27+ 1/16))
(-4.19, 30.19)
Answered by
Tracy
Thanks, but those are wrong also.
Answered by
Kuai
conservative degrees of freedom, you use small number. Df = 15
(39-26)-+ 2.13* sqrt(21^2/27 + 35^2/16))
13 -+ 2.13*sqrt(4459/48)
13 -+ 20.53
(-7.53, 33.53)
There are no AI answers yet. The ability to request AI answers is coming soon!