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Given the summary statistics as follows:

Let n denotes the number of chickens, that is, n=72.

The sample mean is\(\overline x = 1.13\,pecks\)

The sample standard deviation is\(s = 2.21\,pecks\)

Here \(\mu = 7.5\,pecks\) if chickens are expressed to white string.

If the sample size is less than 30 or the population standard deviation is unknown, the t-test statistic is used to test the hypothesis.

a.

The claim is to find if the true mean number of pecks at the blue string is less than\(\mu = 7.5\,pecks\)

From this information, the null and the alternative hypothesis are as follows:

\({H_0}:\mu = 7.5\,pecks\)

i.e., the true mean number of pecks at a blue string is 7.5.

\({H_a}:\mu < 7.5\,pecks\)

i.e., the true mean number of pecks at a blue string is 7.5.

Here, the level of significance\(\alpha = 0.01\)

Here sample size is less than 72 and has the sample standard deviation, and then use 1- sample t test to analyze the data.

Since, the t-test statistic is given by,

\(t = \frac{{\overline x - \mu }}{{\frac{s}{{\sqrt n }}}}\)

Therefore,

\(\begin{aligned}t &= \frac{{1.130 - 7.5}}{{\frac{{2.210}}{{\sqrt {72} }}}}\\ &= \frac{{ - 6.37}}{{0.2605}}\\ &= - 24.45\end{aligned}\)

From the table of t distribution, the tabulated value at a 1% level of significance is 0.000.

Since the calculated value is less than the tabulated value of the test statistic. Therefore, the null hypothesis is rejected, and it may conclude that there is sufficient evidence to support the claim that the true mean number of pecks at blue string is less than\(\mu = 7.5\)pecks.