Z-score, CDF of sample means

x→Z-score→CDF ***

Set mean μ=100  SD σ=10


Sample size n=10 → SEM=(σ/√n)=_________

                             Probability that a sample's mean would be 
                               this much or greater:
x̄ = 101   z=______   P(x̄≥101)=1-CDF(z)=__________
x̄ = 103   z=______   P(x̄≥103)=1-CDF(z)=__________



Sample size n=30 → SEM=(σ/√n)=_________

x̄ = 101   z=______   P(x̄≥101)=1-CDF(z)=__________  
x̄ = 103   z=______   P(x̄≥103)=1-CDF(z)=__________



Sample size n=100 → SEM=(σ/√n)=_________

x̄ = 101   z=______   P(x̄≥101)=1-CDF(z)=__________
x̄ = 103   z=______   P(x̄≥103)=1-CDF(z)=__________

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Typical kind of questions:

A population with mean μ=89.5 and SD σ=12.8

Sample size n = 10
Standard deviation of the sampling distribution of the mean: SEM =σ/√n=______

A sample mean x̄ = 85   → z=________
How likely is a sample mean x̄≤85    ________
How likely is a sample mean x̄≥85    ________

sample mean x̄ = 95   → z=________
How likely is a sample mean x̄≤95    ________
How likely is a sample mean x̄≥95    ________


Sample size n = 30
Standard deviation of the sampling distribution of the mean: SEM =σ/√n=______

A sample mean x̄ = 85   → z=________
How likely is a sample mean x̄≤85    ________
How likely is a sample mean x̄≥85    ________

sample mean x̄ = 95   → z=________
How likely is a sample mean x̄≤95    ________
How likely is a sample mean x̄≥95    ________