If x has a normal distribution with mean mu = 15 and standard deviation sigma = 3, describe the distribution of bar(x) values for sample size n where n = 4, n = 16 and n = 100. How do the bar(x) distributions compare for the various sample sizes?

excefebraxp

excefebraxp

Answered question

2022-09-14

If x has a normal distribution with mean μ = 15 and standard deviation σ = 3, describe the distribution of x ¯ values for sample size n where n = 4, n = 16 and n = 100. How do the x ¯ distributions compare for the various sample sizes?

Answer & Explanation

adwelirlz

adwelirlz

Beginner2022-09-15Added 10 answers

Given:
μ = 15
σ = 3
n 1 = 4
n 2 = 16
n 3 = 100
Central limit theorem: If the sample size is large (30 or more), then the sampling distribution of the sample mean x ¯ is approximately normal with mean μ and standard deviation σ n
The two x ¯ distributions for sample size n=50 and n=100 will all be a normal distribution (since the population distribution is normal) and will have the same mean μ = 15.
The standard deviation will be different for each sample:
n 1 = 4 σ x ¯ = σ n = 3 4 = 1.5
n 2 = 16 σ x ¯ = σ n = 3 16 = 0.75
n 3 = 100 σ x ¯ = σ n = 3 100 = 0.3
Result:
Both have approximately a normal distribution.
Both have the same mean.
Standard deviations are different for each sample (1.5, 0.75, 0.3).

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