Answer: 90% confidence interval would be (6.022,6.986).
Step-by-step explanation:
Since we have given that
Number of students = 361
Sample mean = 6.504
Sample standard deviation = 5.584
Standard error of the mean = 0.294
At 90% confidence level,
So, α = 0.01
So, z = 1.64
Margin of error is given by
[tex]z\times \text{Standard error}\\\\=1.64\times 0.294\\\\=0.48216[/tex]
So, Lower limit would be
[tex]\bar{x}-0.482\\\\=6.504-0.482\\\\=6.022[/tex]
Upper limit would be
[tex]\bar{x}+0.482\\\\=6.504+0.482\\\\=6.986[/tex]
So, 90% confidence interval would be (6.022,6.986).
