Answer :
Answer:
(7.7981, 8.5419). The distribution of percentage elongation can be any distribution with finite mean and variance.
Step-by-step explanation:
We have a large sample size n = 56 research cotton samples. Besides, [tex]\bar{x} = 8.17[/tex] and [tex]s = 1.42[/tex]. A 95% large-sample CI for the true average percentage elongation is given by [tex]\bar{x}\pm z_{0.05/2}(s/\sqrt{n})[/tex], i.e., [tex]8.17\pm (1.96)(1.42/\sqrt{56})[/tex] or equivalently (7.7981, 8.5419). The distribution of percentage elongation can be any distribution with finite mean and variance because we have a large sample.