Asked by melanie
Over the last 15 Major League Baseball seasons, the mean # of strikeouts by the American League leader is 258.5. Assuming that the # of strikeouts by the league leader is normally distributed and the st. dev. for all seasons in all leagues is 34.9, find the 82% Confidence Interval and the 93% Confidence Interval for the mean.
I get that the 82% would be 1-.82=.18 & 93% would be 1-.93=.07 and that n=15, x-bar=258.5, & st. dev=34.9. But I'm confused about the formula. Would I be using a t-distribution?
I get that the 82% would be 1-.82=.18 & 93% would be 1-.93=.07 and that n=15, x-bar=258.5, & st. dev=34.9. But I'm confused about the formula. Would I be using a t-distribution?
Answers
Answered by
MathGuru
A t-distribution is sensitive to the size of the sample when considering confidence intervals. If a z-distribution is used instead of a t-distribution with small sample sizes, the confidence interval may be too narrow and the ability to estimate the true population mean may be diminished. So yes, try a confidence interval formula using a t-distribution.
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.