Respuesta :
Answer:
The standard deviation of the scores on a recent exam is 6.
The sample size required is 25.
Step-by-step explanation:
Let X = scores of students on a recent exam.
It is provided that the random variable X is normally distributed.
According to the Empirical rule, 99.7% of the normal distribution is contained in the range, μ ± 3σ.
That is, P (μ - 3σ < X < μ + 3σ) = 0.997.
It is provided that the scores on a recent exam were normally distributed with a range from 51 to 87.
This implies that:
P (51 < X < 87) = 0.997
So,
μ - 3σ = 51...(i)
μ + 3σ = 87...(ii)
Subtract (i) and (ii) to compute the value of σ as follows:
μ - 3σ = 51
(-)μ + (-)3σ = (-)87
______________
-6σ = -36
σ = 6
Thus, the standard deviation of the scores on a recent exam is 6.
The (1 - α)% confidence interval for population mean is given by:
[tex]CI=\bar x\pm z_{\alpha/2}\frac{\sigma}{\sqrt{n}}[/tex]
The margin of error of this interval is:
[tex]MOE = z_{\alpha/2}\frac{\sigma}{\sqrt{n}}[/tex]
Given:
MOE = 2
σ = 6
Confidence level = 90%
Compute the z-score for 90% confidence level as follows:
[tex]z_{\alpha/2}=z_{0.10/2}=z_{0.05}=1.645[/tex]
*Use a z-table.
Compute the sample required as follows:
[tex]MOE = z_{\alpha/2}\frac{\sigma}{\sqrt{n}}\\2=1.645\times \frac{6}{\sqrt{n}}\\n=(\frac{1.645\times 6}{2})^{2}\\n=24.354225\\n\approx 25[/tex]
Thus, the sample size required is 25.
