Answer:
The value of 27, because it’s greater than 26.7 and less than 29.3.
Step-by-step explanation:
You should find the confidence Interval at 95%
The formula to apply is;
C.I= x±z*δ/√n
where C.I is the confidence interval, x is the mean of the sample, z is the z* value from the standard normal distribution for 95% confidence interval, δ is the standard deviation and n is the sample size
Substitute values in the formula
[tex]z*=1.96\\\\[/tex]
Find δ/√n
[tex]=\frac{5}{\sqrt{60} } =0.64549722436\\\\\\[/tex]
Calculate z*δ/√n
[tex]=1.96*0.64549722436=1.2652\\\\\\[/tex]
C.I= 28±1.2652
Upper limit is = 28+1.2652=29.2625
Lower limit is =28-1.2652=26.7348
Solution
The value 27 is within 95% confidence interval because it is greater than 26.7 and less than 29.3
