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The Practice of Statistics for AP

David Moore,Daren Starnes,Dan Yates

$Math Studyset Vaia Explanations$ Math

4th Edition · 809 pages

ISBN: 9781319113339

Chapter 12: Q. 9 (page 800)

A random sample of $900$ students at a very large university was asked which social-networking site they used most often during a typical week. Their responses are shown in the table below.
Assuming that gender and preferred networking site are independent, which of the following is the expected count for female and LinkedIn?
$a) 18.85$ $b) 46.11$ $c) 87.00$ $d) 91.65$ $e) 103.35$

Short Answer

Expert verified

The answer is option $e) 103.35$

Step by step solution

01

Given Information

We have been given the total number of students at a very large university is $900$ .

We need to find the expected count for females and LinkedIn.

02

Simplification

When the two factors for a two-way table are independent, the expected value formula is just the number of samples times the two probabilities.

$P (F) = \frac{c_{2}}{n}$ , $P (L) = \frac{r_{3}}{n}$

$m e a n = n \times P (F) \times P (L)$

localid="1650524309687" $m e a n = \frac{c_{2} \times r_{3}}{n}$

where c₂ is column 2 total, r₃ is row 3 total, and n is the grand total. This is taken from the table.

Therefore, $c_{2} = 477$ , $r_{3} = 195$ , $n = 900$ .

$m e a n = \frac{477 \times 195}{900}$ .

On calculating, we get:

m e a n = 103.35

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Most popular questions from this chapter

A distribution of exam scores has mean $60$ and standard deviation $18$ . If each score is doubled, and then $5$ is subtracted from that result, what will be the mean and standard deviation, respectively, of the new scores?

(a) mean $= 115$ and standard deviation $= 31$

(b) mean $= 115$ and standard deviation $= 36$

(c) mean $= 120$ and standard deviation $= 6$

(d) mean $= 120$ and standard deviation $= 31$

(e) mean $= 120$ and standard deviation $= 36$

Confidence intervals and tests for these data use the t distribution with degrees of freedom

(a) 9.29.

(c) 15.

(e) 30.

(b) 14.

(d) 16.

The slope $β$ of the population regression line describes

(a) the exact increase in the selling price of an individual unit when its appraised value increases by $\(1000$

(b) the average increase in the appraised value in a population of units when the selling price increases by \)51000.

(c) the average increase in selling price in a population of units when the appraised value increases by \( 1000.

(d) the average selling price in a population of units when a unit's appraised value is 0.

(e) the average increase in appraised value in a sample of 16 units when the selling price increases by \) 1000.

In a clinical trial $30$ , patients with a certain blood disease are randomly assigned to two groups. One group is then randomly assigned the currently marketed medicine, and the other group receives the experimental medicine. Each week, patients report to the clinic where blood tests are conducted. The lab technician is unaware of the kind of medicine the patient is taking, and the patient is also unaware of which medicine he or she has been given. This design can be described as

(a) a double-blind, completely randomized experiment, with the currently marketed medicine and the experimental medicine as the two treatments.

(b) a single-blind, completely randomized experiment, with the currently marketed medicine and the experimental medicine as the two treatments.

(c) a double-blind, matched pairs design, with the currently marketed medicine and the experimental medicine forming a pair.

(d) a double-blind, block design that is not a matched pairs design, with the currently marketed medicine and the experimental medicine as the two blocks.

(e) a double-blind, randomized observational study.

Determining tree biomass It is easy to measure the “diameter at breast height” of a tree. It’s hard to measure the total “aboveground biomass” of a tree, because to do this you must cut and weigh the tree. The biomass is important for studies of ecology, so ecologists commonly estimate it using a power model. Combining data on $378$ trees in tropical rain forests gives this relationship between biomass $y$ measured in kilograms and diameter x measured in centimeters:

$\hat{\ln y} = - 2.00 + 2.42 \ln x$

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