91Ó°ÊÓ

The sample of 12 ratings is observed from male subjects towards the attractiveness of their female dates. The confidence level is 99%.

The conditions necessary for using any sample data to construct confidence intervals are as follows.

The sample is collected from the population of females that satisfies the condition of a simple random sampling.As the sample size is 12, which is less than 30, the condition for normality will only be satisfied if the data follows a normal distribution. This can be verified from the normal probability plot.

The steps to construct the normality plot are as follows.

1. Draw two axes for the observed values and z-scores.
2. Mark the observations corresponding to the z-scores.
3. Observe if the marks follow a straight-line pattern.

Thus, the assumptions are satisfied.

The degree of freedom is computed as follows.

\(\begin{array}{c}df = n - 1\\ = 12 - 1\\ = 11\end{array}\)

The level of significance corresponding to the 99% confidence level is obtained as

\(\begin{array}{c}\alpha = 1 - 0.99\\ = 0.01\end{array}\).

Use the t-distribution table to obtain the critical value at\(\alpha = 0.01\)and\(df = 11\).

The value is obtained at the intersection of row 11 and column 0.01 (two-tailed area), which is \({t_{\frac{{0.01}}{2}}} = 3.106\).

Let\(X\)be the random variable that denotes the rating of females.

Compute the sample mean.

\(\begin{array}{c}\bar x = \frac{{\sum {{x_i}} }}{n}\\ = \frac{{7 + 8 + 2 + ... + 9}}{{12}}\\ = \frac{{84}}{{12}}\\ = 7\end{array}\)

Calculate the sample variance using the formula\({s^2} = \frac{1}{{n - 1}}\sum\limits_{i = 1}^{12} {{{\left( {{x_i} - \bar x} \right)}^2}} \).

Subsitute\(\sum\limits_{i = 1}^{12} {{{\left( {{x_i} - \bar x} \right)}^2}} = 54\)in the formula\({s^2} = \frac{1}{{12 - 1}}\sum\limits_{i = 1}^{12} {{{\left( {{x_i} - \bar x} \right)}^2}} \). So,

\(\begin{array}{c}{s^2} = \frac{1}{{11}} \times 54\\ = \frac{{54}}{{11}}\end{array}\).

The square root of the sample variance is equal to the sample standard deviation. Thus, the sample standard deviation is given as follows.

\(\begin{array}{c}s = \sqrt {\frac{{54}}{{11}}} \\ = 2.2156\end{array}\).

The margin of error is given by the formula\(E = {t_{\frac{\alpha }{2}}} \times \frac{s}{{\sqrt n }}\).Substitute the respective value obtained from above in the equation and simplify to compute the margin of error. So,

\(\begin{array}{c}E = 3.106 \times \frac{{2.2156}}{{\sqrt {12} }}\\ = 1.9865\end{array}\).

The confidence interval is given as follows.

\(\begin{array}{c}\bar x - E < \mu < \bar x - E\\7 - 1.9865 < \mu < 7 + 1.9865\\5.0135 < \mu < 8.9865\\5.0 < \mu < 9.0\end{array}\).

The 99% confidence interval for the mean attractiveness ratings is between 5.0 and 9.0.

Therefore, the 99% confidence interval for the mean attractiveness of females dated by the male subjects is between 5.0 and 9.0. The ratings do not state the attractiveness of all adult females, as it is specific to the women dated by certain males.