A simple random sample of size n=53 is obtained from a population with μ=53 and σ=7. Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why? What is the sampling distribution of x?

No, because the Central Limit Theorem posits that regardless of the shape of the underlying population, the sampling distribution of bar x becomes approximately normal as the sample size (n) increases.

The sampling distribution of x is;

[tex]\mu_{\overline x} = \mu = 53[/tex]

Step-by-step explanation:

Given that:

The sample size n = 53

The population mean μ = 53

The standard deviation σ = 7

The sampling distribution of x is;

[tex]\mu_{\overline x} = \mu = 53[/tex]

Sampling distribution of the standard deviation is:

[tex]\sigma _x =\dfrac{\sigma}{\sqrt{n}}[/tex]

[tex]\sigma _x =\dfrac{7}{\sqrt{53}}[/tex]

[tex]\sigma _x =\dfrac{7}{7.28}[/tex]

[tex]\sigma _x =0.96[/tex]

A simple random sample of size n=53 is obtained from a population with μ=53 and σ=7. Does the population need to be normally distributed for the sampling distribution of x to be approximately normally​ distributed? Why? What is the sampling distribution of x​?

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A simple random sample of size n=53 is obtained from a population with μ=53 and σ=7. Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why? What is the sampling distribution of x?