Understanding Basic Statistics
7th Edition
ISBN: 9781305254060
Author: Charles Henry Brase, Corrinne Pellillo Brase
Publisher: Cengage Learning
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Chapter 6.1, Problem 6P
Statistical Literacy Consider the
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30. An individual who has automobile insurance from a certain company is randomly selected. Let Y be the num- ber of moving violations for which the individual was cited during the last 3 years. The pmf of Y isy | 1 2 4 8 16p(y) | .05 .10 .35 .40 .10
a.Compute E(Y).b. Suppose an individual with Y violations incurs a surcharge of $100Y^2. Calculate the expected amount of the surcharge.
24. An insurance company offers its policyholders a num- ber of different premium payment options. For a ran- domly selected policyholder, let X = the number of months between successive payments. The cdf of X is as follows:
F(x)=0.00 : x < 10.30 : 1≤x<30.40 : 3≤ x < 40.45 : 4≤ x <60.60 : 6≤ x < 121.00 : 12≤ x
a. What is the pmf of X?b. Using just the cdf, compute P(3≤ X ≤6) and P(4≤ X).
59. At a certain gas station, 40% of the customers use regular gas (A1), 35% use plus gas (A2), and 25% use premium (A3). Of those customers using regular gas, only 30% fill their tanks (event B). Of those customers using plus, 60% fill their tanks, whereas of those using premium, 50% fill their tanks.a. What is the probability that the next customer will request plus gas and fill the tank (A2 B)?b. What is the probability that the next customer fills the tank?c. If the next customer fills the tank, what is the probability that regular gas is requested? Plus? Premium?
Chapter 6 Solutions
Understanding Basic Statistics
Ch. 6.1 - Statistical Literacy Which of the following are...Ch. 6.1 - Statistical Literacy Which of the following are...Ch. 6.1 - Statistical Literacy Consider each distribution....Ch. 6.1 - Statistical Literacy At State College all classes...Ch. 6.1 - Statistical Literacy Consider two discrete...Ch. 6.1 - Statistical Literacy Consider the probability...Ch. 6.1 - Basic Computation: Expected Value and Standard...Ch. 6.1 - Basic Computation: Expected Value For a...Ch. 6.1 - Critical Thinking: Simulation We can use the...Ch. 6.1 - Marketing: Age What is the age distribution of...
Ch. 6.1 - Marketing: Income What is the income distribution...Ch. 6.1 - History: Florence Nightingale What was the age...Ch. 6.1 - Fishing: Trout The following data are based on...Ch. 6.1 - Criminal Justice: Parole USA Today reported that...Ch. 6.1 - Fundraiser: Hiking Club The college hiking club is...Ch. 6.1 - Spring Break: Caribbean Cruise The college student...Ch. 6.1 - Expected Value: Life Insurance Jim is a...Ch. 6.1 - Expected Value: Life Insurance Sara is a...Ch. 6.1 - Expand Your Knowledge: Linear Functions and...Ch. 6.1 - Expand Your Knowledge: Linear Functions and...Ch. 6.1 - Expand Your Knowledge: Linear Functions and...Ch. 6.2 - Statistical Literacy What does the random variable...Ch. 6.2 - Statistical Literacy What does it mean to say that...Ch. 6.2 - Statistical Literacy For a binomial experiment,...Ch. 6.2 - Statistical Literacy In a binomial experiment, is...Ch. 6.2 - Interpretation Suppose you are a hospital manager...Ch. 6.2 - Interpretation From long experience a landlord...Ch. 6.2 - Critical Thinking In an experiment, there are n...Ch. 6.2 - Critical Thinking In a carnival game, there are...Ch. 6.2 - Critical Thinking According to the college...Ch. 6.2 - Critical Thinking: Simulation Central Eye Clinic...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - In each of the following problems, the binomial...Ch. 6.2 - Psychology: Deceit Aldrich Ames is a convicted...Ch. 6.2 - Hardware Store: Income Trevor is interested in...Ch. 6.2 - Psychology: Myers-Briggs Approximately 75% of all...Ch. 6.2 - Business Ethics: Privacy Are your finances, buying...Ch. 6.2 - Business Ethics: Privacy According to the same...Ch. 6.2 - Health Care: Office Visits What is the age...Ch. 6.2 - Binomial Distribution Table: Symmetry Study the...Ch. 6.3 - Statistical Literacy What does the expected value...Ch. 6.3 - Statistical Literacy Consider two binomial...Ch. 6.3 - Basic Computation: Expected Value and Standard...Ch. 6.3 - Basic Computation: Expected Value and Standard...Ch. 6.3 - Critical Thinking Consider a binomial distribution...Ch. 6.3 - Criticai Thinking Consider a binomial distribution...Ch. 6.3 - Binomial Distribution: Histograms Consider a...Ch. 6.3 - Binomial Distributions: Histograms Figure 6-6...Ch. 6.3 - Critical Thinking Consider a binomial distribution...Ch. 6.3 - Critical Thinking Consider a binomial distribution...Ch. 6.3 - Prob. 11PCh. 6.3 - Quality Control: Syringes The quality-control...Ch. 6.3 - Private Investigation: Locating People Old Friends...Ch. 6.3 - Prob. 14PCh. 6.3 - Education: Illiteracy USA Today reported that...Ch. 6.3 - Rude Drivers: Tailgating Do you tailgate the car...Ch. 6.3 - Criminal Justice: ParoleUSA Today reports that...Ch. 6.3 - Criminal Justice: Jury Duty Have you ever tried to...Ch. 6.3 - Law Enforcement: Property Crime Does crime pay ?...Ch. 6.3 - Focus Problem: Personality Types We now have the...Ch. 6.3 - Criminal Justice: Convictions Innocent until...Ch. 6.3 - Critical Thinking Let r be a binomial random...Ch. 6.3 - Expand Your Knowledge: Geometric Probability...Ch. 6.3 - Expand Your Knowledge: Geometric Distribution;...Ch. 6.3 - Expand Your Knowledge: Geometric Distribution;...Ch. 6 - Statistical Literacy What are the requirements for...Ch. 6 - Statistical Literacy List the criteria for a...Ch. 6 - Critical Thinking For a binomial probability...Ch. 6 - Critical Thinking Consider a binomial experiment....Ch. 6 - Probability Distribution: Auto Leases Consumer...Ch. 6 - Ecology: Predator and Prey Isle Royale. an island...Ch. 6 - Insurance: Auto State Farm Insurance studies show...Ch. 6 - Quality Control: Pens A stationery store has...Ch. 6 - Criminal Justice: Inmates According to Harper's...Ch. 6 - Airlines: On-Time ArrivalsConsumer Reports rated...Ch. 6 - Prob. 11CRCh. 6 - Restaurants: Reservations The Orchard Caf has...Ch. 6 - College Lire: Student Government The student...Ch. 6 - Although tables of binomial probabilities can be...Ch. 6 - Prob. 2UTACh. 6 - Although tables of binomial probabilities can be...Ch. 6 - Prob. 4UTACh. 6 - Although tables of binomial probabilities can be...Ch. 6 - Although tables of binomial probabilities can be...Ch. 6 - Prob. 7UTACh. 6 - The Hill of Tara is located in south-central...Ch. 6 - Prob. 2CRPCh. 6 - Prob. 3CRPCh. 6 - The Hill of Tara is located in south-central...Ch. 6 - The Hill of Tara is located in south-central...Ch. 6 - The Hill of Tara is located in south-central...Ch. 6 - The Hill of Tara is located in south-central...
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- 38. Possible values of X, the number of components in a system submitted for repair that must be replaced, are 1, 2, 3, and 4 with corresponding probabilities .15, .35, .35, and .15, respectively. a. Calculate E(X) and then E(5 - X).b. Would the repair facility be better off charging a flat fee of $75 or else the amount $[150/(5 - X)]? [Note: It is not generally true that E(c/Y) = c/E(Y).]arrow_forward74. The proportions of blood phenotypes in the U.S. popula- tion are as follows:A B AB O .40 .11 .04 .45 Assuming that the phenotypes of two randomly selected individuals are independent of one another, what is the probability that both phenotypes are O? What is the probability that the phenotypes of two randomly selected individuals match?arrow_forward53. A certain shop repairs both audio and video compo- nents. Let A denote the event that the next component brought in for repair is an audio component, and let B be the event that the next component is a compact disc player (so the event B is contained in A). Suppose that P(A) = .6 and P(B) = .05. What is P(BA)?arrow_forward
- 26. A certain system can experience three different types of defects. Let A;(i = 1,2,3) denote the event that the sys- tem has a defect of type i. Suppose thatP(A1) = .12 P(A) = .07 P(A) = .05P(A, U A2) = .13P(A, U A3) = .14P(A2 U A3) = .10P(A, A2 A3) = .011Rshelfa. What is the probability that the system does not havea type 1 defect?b. What is the probability that the system has both type 1 and type 2 defects?c. What is the probability that the system has both type 1 and type 2 defects but not a type 3 defect? d. What is the probability that the system has at most two of these defects?arrow_forwardThe following are suggested designs for group sequential studies. Using PROCSEQDESIGN, provide the following for the design O’Brien Fleming and Pocock.• The critical boundary values for each analysis of the data• The expected sample sizes at each interim analysisAssume the standardized Z score method for calculating boundaries.Investigators are evaluating the success rate of a novel drug for treating a certain type ofbacterial wound infection. Since no existing treatment exists, they have planned a one-armstudy. They wish to test whether the success rate of the drug is better than 50%, whichthey have defined as the null success rate. Preliminary testing has estimated the successrate of the drug at 55%. The investigators are eager to get the drug into production andwould like to plan for 9 interim analyses (10 analyzes in total) of the data. Assume thesignificance level is 5% and power is 90%.Besides, draw a combined boundary plot (OBF, POC, and HP)arrow_forwardPlease provide the solution for the attached image in detailed.arrow_forward
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