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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 5: Q T5.8. (page 337)

For events A and B related to the same chance process, which of the following statements is true?
(a) If A and B are mutually exclusive, then they must be independent.
(b) If A and B are independent, then they must be mutually exclusive.
(c) If A and B are not mutually exclusive, then they must be independent.
(d) If A and B are not independent, then they must be mutually exclusive.
(e) If A and B are independent, then they cannot be mutually exclusive.

Short Answer

Expert verified

The correct option is (e)

Step by step solution

01

Step 1. Given

There are two events that are related to the same chance process.

02

Step 2. Concept

A and B are independent, then they cannot be mutually exclusive.

03

Step 3. Explanation

Two events occur as a result of the same random process.

Two occurrences are considered independent if the occurrence of one does not affect the occurrence of the other. Furthermore, two mutually exclusive occurrences cannot be predicted to occur at the same moment. As a result, the independent events are unable to be mutually exclusive.

As a result, the correct option is (e).

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Most popular questions from this chapter

Who eats breakfast? Students in an urban school were curious about how many children regularly eat breakfast. They conducted a survey, asking, “Do you eat breakfast on a regular basis?” All $595$ students in the school responded to the survey. The resulting data are shown in the two-way table

below. $7$ Male Female Total Eats breakfast regularly $190 110 300$ Doesn’t eat breakfast regularly $130 165 295 T o t a l 320 275 595$

(a) Who are the individuals? What variables are being measured?

(b) If we select a student from the school at random, what is the probability that we choose

a female?
someone who eats breakfast regularly?
a female who eats breakfast regularly?
a female or someone who eats breakfast

regularly?

Simulation blunders Explain what’s wrong with each of the following simulation designs.

(a) A roulette wheel has $38$ colored slots— $38$ red, $18$ black, and $2$ green. To simulate one spin of the wheel, let numbers $00$ to $18$ represent red, $19$ to $37$

represent black, and $38$ to $40$ represent green.

(b) About $10 %$ of U.S. adults are left-handed. To simulate randomly selecting one adult at a time until you find a left-hander, use two digits. Let $01$ to $10$ represent being left-handed and $11$ to $00$ represent being right-handed. Move across a row in Table D, two digits at a time, skipping any numbers that have already appeared, until you find a number between $01$ and 10. Record the number of people selected.

Fill ’err up! In a recent month, $88 %$ of automobile drivers filled their vehicles with regular gasoline, $2 %$ purchased midgrade gas, and $10 %$ bought premium gas. $17$ Of those who bought regular gas, $28 %$ paid with a credit card; of customers who bought midgrade and premium gas, $34 %$ and $42 %$ , respectively, paid with a credit card. Suppose we select a customer at random.

Draw a tree diagram to represent this situation. What’s the probability that the customer paid with a credit card? Use the four-step process to guide your work.

The casino game craps is based on rolling two dice. Here is the assignment of probabilities to the sum of the numbers on the up-faces when two dice are rolled: pass line bettor wins immediately if either a $7$ or an $11$ comes up on the first roll. This is called a natural. What is the probability of a natural?

(a) $2 / 36$ (c) $8 / 36$ (e) $20 / 36$

(b) $6 / 36$ (d) $12 / 36$

Education among young adults Chooses a young adult (aged $25$ to $29$ ) at random. The probability is $0.13$ that the person chosen did not complete high school, $0.29$ that the person has a high school diploma but no further education, and $0.30$ that the person has at least a bachelor’s degree.

(a) What must be the probability that a randomly chosen young adult has some education beyond high school but does not have a bachelor’s degree? Why?

(b) What is the probability that a randomly chosen young adult has at least a high school education? Which rule of probability did you use to find the

answer?

See all solutions

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