Answer to Question #301627 in Statistics and Probability for AAA

Question #301627

A Population Has A Mean Of 73.5 And A Standard Deviation Of 2.5

Expert's answer

Let "X_1, X_2, ..., X_n" be a random sample from a distribution with mean "\\mu" and variance "\\sigma^2". Then by the Central Limit Theorem if "n" is sufficiently large, "\\bar{X}" has approximately a normal distribution with "\\mu_{\\bar{X}}=\\mu" and "\\sigma^2_{\\bar{X}}=\\sigma^2\/n."

The Central Limit Theorem can generally be used if "n>30."

Given "\\mu=73.5, \\sigma=2.5, n=30."

Assume "\\bar{X}\\sim N(\\mu, \\sigma^2\/n)"

"\\mu_{\\bar{X}}=\\mu=73.5"

"\\sigma_{\\bar{X}}=\\sigma\/\\sqrt{n}=2.5\/\\sqrt{30}\\approx0.4564"

"P(\\bar{X}<72)=P(Z<\\dfrac{72-73.5}{2.5\/\\sqrt{30}})"

"\\approx P(Z<-3.2863)\\approx0.0005"

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Answer to Question #301627 in Statistics and Probability for AAA

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