7.1 Homework: clt (modified r. bloom)

$X$ ~ $N(\text{60},9)$ . Suppose that you form random samples of 25 from this distribution. Let $\overline{X}$ be the random variable of averages. For c - f , sketch the graph, shade the region, label and scale the horizontal axis for $\overline{X}$ , and find the probability.

• a Sketch the distributions of $X$ and $\overline{X}$ on the same graph.
• b $\overline{X}$ ~
• c
• d Find the 30th percentile.
• e
• f
• h Find the minimum value for the upper quartile.

Determine which of the following are true and which are false. Then, in complete sentences, justify your answers.

• a When the sample size is large, the mean of $\overline{X}$ is approximately equal to the mean of $X$ .
• b When the sample size is large, $\overline{X}$ is approximately normally distributed.
• c When the sample size is large, the standard deviation of $\overline{X}$ is approximately the same as the standard deviation of $X$ .

The percent of fat calories that a person in America consumes each day is normally distributed with a mean of about 36 and a standard deviation of about 10. Suppose that 16 individuals are randomly chosen.

Let $\overline{X}=$ average percent of fat calories.

• a $\overline{X}\text{~}$ ______ ( ______ , ______ )
• b For the group of 16, find the probability that the average percent of fat calories consumed is more than 5. Graph the situation and shade in the area to be determined.
• c Find the first quartile for the average percent of fat calories.

Previously, De Anza statistics students estimated that the amount of change daytime statistics students carry is exponentially distributed with a mean of $0.88. Suppose that we randomly pick 25 daytime statistics students.

• a In words, $X=$
• b $X\text{~}$
• c In words, $\overline{X}=$
• d $\overline{X}\text{~}$ ______ ( ______ , ______ )
• e Find the probability that an individual had between $0.80 and $1.00. Graph the situation and shade in the area to be determined.
• f Find the probability that the average of the 25 students was between $0.80 and $1.00. Graph the situation and shade in the area to be determined.
• g Explain the why there is a difference in (e) and (f).

Suppose that the distance of fly balls hit to the outfield (in baseball) is normally distributed with a mean of 250 feet and a standard deviation of 50 feet. We randomly sample 49 fly balls.

• a If $\overline{X}=$ average distance in feet for 49 fly balls, then $\overline{X}\text{~}$ _______ ( _______ , _______ )
• b What is the probability that the 49 balls traveled an average of less than 240 feet? Sketch the graph. Scale the horizontal axis for $\overline{X}$ . Shade the region corresponding to the probability. Find the probability.
• c Find the 80th percentile of the distribution of the average of 49 fly balls.

Question removed from textbook.

Note: Problem has been changed from original version of textbook.

Suppose that the duration of a particular type of criminal trial is known to have a mean of 21 days and a standard deviation of 7 days. We randomly sample 25 trials.

• a Find the probability that the average length of the 25 trials is at least 24 days.
• b Find the 10th percentile for the average length for samples of 25 trials of this type.