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In Pennsylvania, the average IQ score is 101.5. The variable is normally distributed and the population standard deviation is 15. A school superintendent claims that the students in her school district have an IQ higher than the average of 101.5. She selects a random sample of 30 students and finds the mean of the test scores is 106.4.

Test the claim at α = 0.05

1. State the hypotheses and identify the claim.H0:μ=101.5H1:μ>101.5This is the claim, and this indicates a right-tailed test
2. Find the critical value. For a right-tailed test with α = 0.05, the z-value is +1.65.
3. Compute the test statistic.

Respuesta :

JeanaShupp

Answer with explanation:

Let [tex]\mu[/tex] denotes the population mean.

1. Claim : The students in her school district have an IQ higher than the average of 101.5.

As per given , we have

Null hypothesis : [tex]H_0: \mu=101.5[/tex]

Alternative hypothesis: [tex]H_1: \mu>101.5[/tex]

∵Alternative hypothesis is right-tailed , this indicates a right-tailed test

Also, Population standard deviation =[tex]\sigma=15[/tex] , we use z-test.

sample size = 30

sample mean =[tex]\overline{x}=106.4[/tex]

2. According to the z-table , the critical z-value for the right-tailed test with α = 0.05 is +1.65.

i.e. Critical value = 1.65

3. Test statistic : [tex]z=\dfrac{\overline{x}-\mu}{\dfrac{\sigma}{\sqrt{n}}}[/tex]

[tex]\\\\=\dfrac{106.4-101.5}{\dfrac{15}{\sqrt{30}}}\\\\=\dfrac{4.9}{\dfrac{15}{5.47722557505}}\approx1.79[/tex]

Since the calculated z > Critical  z value , so we reject the null hypothesis.

We conclude that we have sufficient evidence at α = 0.05  to support the school superintendent claim that the students in her school district have an IQ higher than the average of 101.5.

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