Answer: 95% confidence interval would be
[tex](10.5-\dfrac{10.78}{\sqrt{N}},10.5+\dfrac{10.78}{\sqrt{N}})[/tex]
Step-by-step explanation:
Since we have given that
Sample mean = 10.5
Sample variance = 5.5
Sample size = N
We need to find the 95% confidence interval for the mean.
z = 1.96
So, the confidence interval would be
[tex]\bar{x}\pm z\dfrac{\sigma}{\sqrt{n}}\\\\=10.5\pm 1.96\dfrac{5.5}{\sqrt{N}}\\\\=(10.5-\dfrac{10.78}{\sqrt{N}},10.5+\dfrac{10.78}{\sqrt{N}})[/tex]
Hence, 95% confidence interval would be
[tex](10.5-\dfrac{10.78}{\sqrt{N}},10.5+\dfrac{10.78}{\sqrt{N}})[/tex]
