Assume that the weight of cereal in a "12.6 ounce box" is N(µ,0.42). The Food and Drug Association (FDA) allows only a small percentage of boxes to contain less than 1…

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asked Jul 19, 2022 75.9k views

1 Answer

Cazlab · Answer 1 · 2022-07-24T22:07:36+0000

Answer:

We reject the null hypothesis and accept the alternate hypothesis, that is, that the mean is less than 13 ounces.

Explanation:

The null hypothesis is:

$H_(0): \mu = 13$

The alternate hypotesis is:

$H_(a): \mu < 13$

The test statistic is:

$z = (X - \mu)/((\sigma)/(√(n)))$

In which X is the sample mean,
$\mu$ is the value tested at the null hypothesis,
$\sigma$ is the standard deviation and n is the size of the sample.

13 is tested at the null hypothesis:

This means that
$\mu = 13$

N(µ,0.42)

This means that the standard deviation is 0.42, that is,
$\sigma = 0.42$

You collect a random sample of n = 35 boxes and find that the sample mean is 12.8.

This means that
n = 35, X = 12.8

Value of the test statistic:

$z = (X - \mu)/((\sigma)/(√(n)))$

z = (12.8 - 13)/((0.42)/(√(35)))

z = -2.82

Pvalue of the test:

The pvalue of the test is the pvalue of z = -2.82.

Looking at the z table, z = -2.82 has a pvalue of 0.0024

0.0024 < 0.01, which means that we reject the null hypothesis and accept the alternate hypothesis, that is, that the mean is less than 13 ounces.