Answer:
(17.6962, 18.5038)
Since 17 does not lie in this interval, we reject the first start was at age 17.
The confidence interval implies we are 95% confident that for large sample sizes, randomly drawn sample mean will fall within this interval.
Step-by-step explanation:
Given that from generation to generation, the mean age when smokers first start to smoke was believed to be 17.
A survey of 40 smokers of the millennial generation was done to see if the mean starting age is now different.
The sample mean is 18.1 with a sample standard deviation of 1.3.
We get mean difference =1.1
Std error = [tex]\frac{1.3}{\sqrt{40} } \\=0.206[/tex]
Z critical value for 95% = 1.96
Margin of error =1.96 ( std error) = 0.40376
Confidence interval
=[tex](18.1-0.4038, 18.1+0.4038)\\= (17.6962, 18.5038)[/tex]
Since 17 does not lie in this interval, we reject the first start was at age 17.
The confidence interval implies we are 95% confident that for large sample sizes, randomly drawn sample mean will fall within this interval.
