1 Answer

Miuranga · Answer 1 · 2022-08-24T21:34:57+0000

Answer:

There is not sufficient evidence at the 0.01 level that the bags are underfilled or overfilled

Explanation:

A manufacturer of chocolate chips would like to know whether its bag filling machine works correctly at the 403 gram setting.

This means that the null hypothesis is:

$H_(0): \mu = 403$

Is there sufficient evidence at the 0.01 level that the bags are underfilled or overfilled:

This means that at the alternate hypothesis, we are testing if the mean is different than 403, that is:

$H_(a): \mu \\eq 403$

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.

Value of 403 tested at the null hypothesis:

This means that
$\mu = 403$

A 10 bag sample had a mean of 411 grams with a variance of 121.

This means that
$n = 10, X = 411, \sigma = √(121) = 11$

Value of the test statistic:

$z = (X - \mu)/((\sigma)/(√(n)))$

z = (411 - 403)/((11)/(√(10)))

z = 2.3

Pvalue:

Testing if the mean is different of a value, and z positive, which means that the pvalue is 2 multiplied by 1 subtracted by the pvalue of z = 2.3

Looking at the z-table, z = 2.3 has a pvalue of 0.9893

1 - 0.9893 = 0.0107

2*0.0107 = 0.0214

0.0214 > 0.01, which means that there is not sufficient evidence at the 0.01 level that the bags are underfilled or overfilled

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