Question #301627

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


1
Expert's answer
2022-02-24T05:43:20-0500

Let X1,X2,...,XnX_1, X_2, ..., X_n be a random sample from a distribution with mean μ\mu and variance σ2\sigma^2. Then by the Central Limit Theorem if nn is sufficiently large, Xˉ\bar{X} has approximately a normal distribution with μXˉ=μ\mu_{\bar{X}}=\mu and σXˉ2=σ2/n.\sigma^2_{\bar{X}}=\sigma^2/n.

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

A.

Given μ=73.5,σ=2.5,n=30.\mu=73.5, \sigma=2.5, n=30.

Assume XˉN(μ,σ2/n)\bar{X}\sim N(\mu, \sigma^2/n)

μXˉ=μ=73.5\mu_{\bar{X}}=\mu=73.5

σXˉ=σ/n=2.5/300.4564\sigma_{\bar{X}}=\sigma/\sqrt{n}=2.5/\sqrt{30}\approx0.4564

B.


P(Xˉ<72)=P(Z<7273.52.5/30)P(\bar{X}<72)=P(Z<\dfrac{72-73.5}{2.5/\sqrt{30}})

P(Z<3.2863)0.0005\approx P(Z<-3.2863)\approx0.0005




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