Homework SourseA sample of n10 observations from Normal distribution yields
A sample of n=10 observations from Normal distribution yields a sample mean \\bar{X}=2.4. Assuming a population standard deviation \\sigma=0.8,
(a) Construct a 95\\% confidence interval for the population mean.
(b) What is the minimum sample size required for estimating the population mean with a margin of error not exceeding 0.4?
Solution
Given that,
sample size (n) = 10
These observations taken from Normal distribution with mean = 2.4 and
population standard deviation () = 0.8
Construct a 95% confidence interval for the population mean(µ).
Xbar - E < µ < Xbar + E
where Xbar = mean = 2.4
E is the margin of error.
E = Zc * /sqrt(n)
Here population standard deviation is known so we use z-interval.
Zc is the critical value for normal distribution.
c is the confidence level = 0.95
a = 1 - c = 1-0.95 = 0.05
a/2 = 0.05/2 = 0.025
This we can find by using EXCEL.
syntax :
=normsdist(probability)
where probability = 1 - a/2
Zc = 1.96
E = Zc * /sqrt(n)
= 1.96 * 0.8 / sqrt(10) = 0.4958
lower limit = Xbar - E = 2.4 - 0.4958 = 1.9042
upper limit = Xbar + E = 2.4 + 0.4958 = 2.8958
The 95% confidence interval for population mean is (1.9042 , 2.8958)
What is the minimum sample size required for estimating the population mean with a margin of error not exceeding 0.4?
Given E = 0.4
We have to calculate n here.
n = [ (Zc * ) / E ]2
n = [(1.96*0.8)/0.4]2 = 10
