Test 3a PDF

Summary

This document includes multiple-choice questions on probability and statistics concepts in math with various problem-solving scenarios and calculations.

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Exam

Name___________________________________

MULTIPLE CHOICE. Choose the one alternative that best completes the statement or answers the question.

1) The braking time of a car. Identify the given random variable as being discrete or continuous. 1)
A) Discrete B) Continuous

2) Find the standard deviation, σ, for the binomial distribution which has the stated values of n 2)
and p. Round your answer to the nearest hundredth.
n = 503; p = 0.7
A) σ = 13.55 B) σ = 10.28 C) σ = 7.87 D) σ = 14.40

3) Find the mean, μ, for the binomial distribution which has the stated values of n and p. Round 3)
answer to the nearest tenth. n = 676; p = 0.7
A) μ = 474.5 B) μ = 474.9 C) μ = 473.2 D) μ = 471.7

4) Find the standard deviation, σ, for the binomial distribution which has the stated values of n 4)
and p. Round your answer to the nearest hundredth.
n = 38; p = 2/5
A) σ = 13.55 B) σ = 14.40 C) σ = 10.28 D) σ = 7.87

5) Mars, Inc. claims that 20% of its M&M plain candies are orange. A sample of 100 such candies is 5)
randomly selected. Find the mean and standard deviation for the number of orange candies in
such groups of 100.
A) μ = 20, σ = 4.0 B) μ =.020, σ =.20
C) μ = 20, σ =.20 D) μ =.20, σ = 4.0

6) The accompanying table shows the probability distribution for x, the number that shows up 6)
when a loaded die is rolled.

x P(x)
1 0.14
2 0.16
3 0.12
4 0.14
5 0.13
6 0.31

A) μ = 3.8 B) μ = 0.2 C) μ = 3.5 D) μ = 3.9

7) On a multiple choice test with 17 questions, each question has four possible answers, one of 7)
which is correct. For students who guess at all answers, find the mean for the number of correct
answers.
A) 4.3 questions B) 8.5 questions C) 12.8 questions D) 5.7 questions

8) A die is rolled nine times and the number of times that two shows on the upper face is counted. 8)
If this experiment is repeated many times, find the mean for the number of twos.
A) 3 twos B) 2.25 twos C) 7.5 twos D) 1.5 twos

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 9) In a Gallup poll of randomly selected adults, 66% said that they worry about identity theft. For a 9)
group of 1013 adults, the mean of those who do not worry about identify theft is closest to
________.
A) 669 adults B) 34 adults C) 344 adults D) 66 adults

10) Assume that a procedure yields a binomial distribution with a trial repeated n = 30 times. Use 10)
the binomial probability formula to find the probability of x = 5 successes given the probability p
= 1/5 of success on a single trial. Round to three decimal places.
A) 0.067 B) 0.198 C) 0.172 D) 0.421

11) A die is rolled nine times and the number of times that two shows on the upper face is counted. 11)
If this experiment is repeated many times, find the mean for the number of twos.
A) 7.5 twos B) 3 twos C) 1.5 twos D) 2.25 twos

12) According to a college survey, 22% of all students work full time. Find the mean for the number 12)
of students who work full time in samples of size 16.
A) 2.8 students B) 0.2 students C) 3.5 students D) 4.0 students

13) Determine whether the given procedure results in a binomial distribution. If not, state the reason 13)
why. Rolling a single die 53 times, keeping track of the "fives" rolled.
A) Not binomial: there are more than two outcomes for each trial.
B) The procedure results in a binomial distribution.
C) Not binomial: there are too many trials.
D) Not binomial: the trials are not independent.

14) A tennis player makes a successful first serve 51% of the time. If she serves 9 times, what is the 14)
probability that she gets exactly 3 successful first serves in? Assume that each serve is
independent of the others.
A) 0.154 B) 0.00184 C) 0.0635 D) 0.133

15) A test consists of 10 true/false questions. To pass the test a student must answer at least 6 15)
questions correctly. If a student guesses on each question, what is the probability that the
student will pass the test? Round to three decimal places.
A) 0.828 B) 0.205 C) 0.377 D) 0.172

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16) The following table describes the results of roadworthiness tests of Ford Focus cars that are three 16)
years old (based on data from the Department of Transportation). The random variable x
represents the number of cars that failed among six that were tested for roadworthiness:

x P(x)
0 0.377
1 0.399
2 0.176
3 0.041
4 0.005
5 0+
6 0+

Find the probability of getting three or more cars that fail among six cars tested.
A) 0.046 B) 0.005 C) 0.222 D) 0.048

17) A bank's loan officer rates applicants for credit. The ratings are normally distributed with a 17)
mean of 200 and a standard deviation of 50. If an applicant is randomly selected, find the
probability of a rating that is between 200 and 275.
A) 0.9332 B) 0.4332 C) 0.0668 D) 0.5

18) If z is a standard normal variable, find P(z > 0.97). 18)
A) 0.1922 B) 0.8340 C) 0.1660 D) 0.1685

19) In a population of 210 women, the heights of the women are normally distributed with a mean 19)
of 64.4 inches and a standard deviation of 2.9 inches. If 36 women are selected at random, find
the mean μ and standard deviation σ of the population of sample means. Assume that the
x x
sampling is done without replacement and use a finite population correction factor.
A) 64.4 inches, 0.44 inches B) 64.4 inches, 2.07 inches
C) 58.8 inches, 2.65 inches D) 64.4 inches, 2.9 inches

20) Scores on a test are normally distributed with a mean of 63.2 and a standard deviation of 11.7. 20)
Find P81, which separates the bottom 81% from the top 19%.
A) 73.5 B) 0.88 C) 66.6 D) 0.291

21) If z is a standard normal variable, find the probability: P(-0.73 < z < 2.27) 21)
A) 0.7557 B) 0.2211 C) 1.54 D) 0.4884

22) A coin is tossed 20 times. A person who claims to have extrasensory perception is asked to 22)
predict the outcome of each flip in advance. She predicts correctly on 14 tosses. What is the
probability of being correct 14 or more times by guessing? Does this probability seem to verify
her claim? Use the normal distribution to approximate the desired probability.
A) 0.4418, no B) 0.0582, no C) 0.4418, yes D) 0.0582, yes

23) The weights of college football players are normally distributed with a mean of 200 pounds and 23)
a standard deviation of 50 pounds. If a college football player is randomly selected, find the
probability that he weighs between 170 and 220 pounds.
A) 0.1554 B) 0.3811 C) 0.0703 D) 0.2257

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24) Find the indicated z score. The graph depicts the standard normal distribution with mean 0 and 24)
standard deviation 1. Shaded area is 0.4483.

A) 0.6736 B) 0.13 C) -0.13 D) 0.3264

25) Find the area of the shaded region. The graph depicts the standard normal distribution with 25)
mean 0 and standard deviation 1.

A) 0.9656 B) 0.4656 C) 0.0344 D) -0.0344

26) Assume that the red blood cell counts of women are normally distributed with a mean of 4.577 26)
million cells per microliter and a standard deviation of 0.382 million cells per microliter. Find the
value closest to the probability that a randomly selected woman has a red blood cell count above
the normal range of 4.2 to 5.4 million cells per microliter.
A) 0.0158 B) 0.0409 C) 0.1611 D) 0.9842

27) An unbiased estimator is a statistic that targets the value of the of the population parameter such 27)
that the sampling distribution of the statistic has a ________ equal to the ________ of the
corresponding parameter.
A) mean; standard deviation B) standard deviation; standard deviation
C) mean; mean D) range; range/4

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Answer Key
Testname: TEST3

1) B
2) B
3) C
4) D
5) A
6) D
7) A
8) D
9) C
10) C
11) C
12) C
13) B
14) A
15) C
16) A
17) B
18) C
19) A
20) A
21) A
22) B
23) B
24) B
25) A
26) A
27) C

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