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The Practice of Statistics for AP Examination

Daren Starnes, Josh Tabor

$Math Studyset 魅影直播 Explanations$ Math

6th Edition 路 837 pages

ISBN: 9781319113339

Chapter 6: Q.119 (page 432)

Standard deviations (6.1) Continuous random variables A, B, and C all take values between 0 and 10 . Their density curves, drawn on the same horizontal scales, are shown here. Rank the standard deviations of the three random variables from smallest to largest. Justify your answer.

Short Answer

Expert verified

the standard deviations from smallest to largest is B, C, A.

Step by step solution

01

Given Information

The figures are

02

Simplification

The standard deviation calculates the average departure of the data values from the mean. $渭$ .

This then means that if more number of data values lie closest to $渭$ , then the standard deviation would be smaller.

Because the peak of the density curve is largest at, the standard deviation of B is the least. $渭$ and therefore the most of the data values lie very close to the means $渭$ .

The standard deviation of A is largest, because of the peak of the density curve is the highest at the points furthest from the mean $渭$ and therefore the most of the data values lie far away from the mean $渭$ .

As a result, the standard deviations from lowest to greatest are $B, C, A$ .

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Most popular questions from this chapter

Sally takes the same bus to work every morning. Let $X =$ the amount of time (in minutes) that she has to wait for the bus on a randomly selected day. The probability distribution of $X$ can be modeled by a uniform density curve on the interval from data-custom-editor="chemistry" $0 minutes to 8$ minutes. Define the random variable $V = 60 X$

a. Explain what

V

b. What probability distribution does $V$ have?

Red light! Pedro drives the same route to work on Monday through Friday. His route includes one traffic light. According to the local traffic department, there is a $55 %$ chance that the light will be red on a randomly selected work day. Suppose we choose 10 of Pedro's work days at random and let $Y =$ the number of times that the light is red.

a. Explain why $Y$ is a binomial random variable.

b. Find the probability that the light is red on exactly 7 days.

If Jeff keeps playing until he wins a prize, what is the probability that he has to play the game exactly 5 times?

a. $(0.25)^{5}$

b. $(0.75)^{4}$

c. $(0.75)^{5}$

d. $(0.75)^{4} (0.25)$

e. $(51) (0.75) 4 (0.25) (\begin{array}{l} 5 \\ 1 \end{array}) (0.75)^{4} (0.25)$

If Jeff gets 4 game pieces, what is the probability that he wins exactly 1 prize?

a. 0.25

b. 1.00

c. $(41) (0.25) 3 (0.75) 3 (\begin{array}{l} 4 \\ 1 \end{array}) (0.25)^{3} (0.75)^{3}$

d. $(41) (0.25) 1 (0.75) 3 (\begin{array}{l} 4 \\ 1 \end{array}) (0.25)^{1} (0.75)^{3}$

e. $(0.75)^{3} (0.75)^{1}$

Take a spin An online spinner has two colored regions-blue and yellow. According to the website, the probability that the spinner lands in the blue region on any spin is $0.80$ . Assume for now that this claim is correct. Suppose we spin the spinner $12$ times and let $X =$ the number of times it lands in the blue region. Make a graph of the probability distribution of X. Describe its shape.

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