Math  /  Data & Statistics

QuestionSubmit test
A random sample of 86 eighth grade students' scores on a national mathematics assessment test has a mean score of 284. This test result prompts a state school ad to declare that the mean score for the state's eighth graders on this exam is more than 280 . Assume that the population standard deviation is 35 . At α=0.11\alpha=0.11, is there evidence to support the administrator's claim? Complete parts (a) through (e). (b) Find the standardized test statistic zz. z=1.06z=1.06 (Round to two decimal places as needed.) (c) Find the P -value. PP-value =0.145=0.145 (Round to three decimal places as needed.) (d) Decide whether to reject or fail to reject the null hypothesis. Reject H0\mathrm{H}_{0} Fail to reject H0\mathrm{H}_{0} (e) Interpret your decision in the context of the original claim.
At the 11%11 \% significance level, there 280. \square enough evidence to \square the administrator's claim that the mean score for the state's eighth graders on the exam is more

Studdy Solution

STEP 1

1. The sample size n=86 n = 86 .
2. The sample mean xˉ=284 \bar{x} = 284 .
3. The population standard deviation σ=35 \sigma = 35 .
4. The null hypothesis H0:μ=280 H_0: \mu = 280 .
5. The alternative hypothesis Ha:μ>280 H_a: \mu > 280 .
6. Significance level α=0.11 \alpha = 0.11 .

STEP 2

1. Calculate the standardized test statistic z z .
2. Find the P-value.
3. Decide whether to reject or fail to reject the null hypothesis.
4. Interpret the decision in the context of the original claim.

STEP 3

Calculate the standardized test statistic z z using the formula:
z=xˉμ0σ/n z = \frac{\bar{x} - \mu_0}{\sigma / \sqrt{n}}
where xˉ=284 \bar{x} = 284 , μ0=280 \mu_0 = 280 , σ=35 \sigma = 35 , and n=86 n = 86 .
z=28428035/86 z = \frac{284 - 280}{35 / \sqrt{86}}
z=435/86 z = \frac{4}{35 / \sqrt{86}}
z=1.06 z = 1.06

STEP 4

Find the P-value for z=1.06 z = 1.06 .
The P-value is the probability that Z Z is greater than 1.06 in a standard normal distribution.
P(Z>1.06)=0.145 P(Z > 1.06) = 0.145

STEP 5

Compare the P-value with the significance level α=0.11 \alpha = 0.11 .
Since P=0.145>α=0.11 P = 0.145 > \alpha = 0.11 , we fail to reject the null hypothesis.

STEP 6

Interpret the decision in the context of the original claim.
At the 11% significance level, there is not enough evidence to support the administrator's claim that the mean score for the state's eighth graders on the exam is more than 280.

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