Internet Use in 2000 The following pie chart shows the percentage of the population that used the Internet in 2000, broken down further by family income, and based on a survey taken in August 2000.t < $35,000: Internet user 11% 2 $35,000: Nonuser 24% < $35,000: Nonuser 2 $35,000: 30% Internet user 35% (a) Determine the probability that randomly chosen person was an Internet user, given that his or her family income was at least $35,000. (Round your answer to two decimal places.) (b) Based on the data, was a person more likely to be an Internet user if his or her family income was less than $35,000 or $35,000 or more? (Support your answer by citing the relevant conditional probabilities. Round your answers to two decimal places.) ,it can be determined a person is more likely to be an Internet user if his or her By comparing P(Internet user|.2 $35,000) = family income wa v ---Select--- with P (Internet user| < $35,000) = $35,000 or more less than $35,000

Internet Use in 2000 The following pie chart shows the percentage of the population that used the Internet in 2000, broken down further by family income, and based on a survey taken in August 2000.t < $35,000: Internet user 11% 2 $35,000: Nonuser 24% < $35,000: Nonuser 2 $35,000: 30% Internet user 35% (a) Determine the probability that randomly chosen person was an Internet user, given that his or her family income was at least $35,000. (Round your answer to two decimal places.) (b) Based on the data, was a person more likely to be an Internet user if his or her family income was less than $35,000 or $35,000 or more? (Support your answer by citing the relevant conditional probabilities. Round your answers to two decimal places.) ,it can be determined a person is more likely to be an Internet user if his or her By comparing P(Internet user|.2 $35,000) = family income wa v ---Select--- with P (Internet user| < $35,000) = $35,000 or more less than $35,000

A First Course in Probability (10th Edition)

10th Edition

ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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Organ Donors USA Today provided information about a survey of 5100 adult Internet users. Of the respondents, 2346 said they are willing to donate organs after death. In this survey conducted for Donate Life America, 100 adults were surveyed in each state and the District of Columbia, and results were weighted to account for the different state population sizes. a. What percentage of respondents said that they are willing to donate organs after death? b. Based on the poll results, what is the probability of randomly selecting an adult who is willing to donate organs after death? c. What term is used to describe the sampling method of randomly selecting 100 adults from each state and the District of Columbia?
The U.S. Coast Guard maintains a database of the number, source, and location of oil spills in the U.S. navigable and territorial waters. The following is a probability distribution for location of oil spill events. [Source: Statistical Abstract of the United States.] Location Probability Atlantic Ocean 0.008 Pacific Ocean 0.037 Gulf of Mexico 0.233 Great Lakes 0.020 Other Lakes 0.002 Rivers and canals 0.366 Bays and sounds 0.146 Harbors 0.161 Other 0.027 If an oil spill is selected at random from the database, what is the probability: The oil spill occurred in an ocean? The oil spill occurred in a lake or harbor? The oil spill did not occur in a lake, ocean, river, or canal?
he home run percentage is the number of home runs per 100 times at bat. A random sample of 43 professional baseball players gave the following data for home run percentages. 1.6 2.4 1.2 6.6 2.3 0.0 1.8 2.5 6.5 1.8 2.7 2.0 1.9 1.3 2.7 1.7 1.3 2.1 2.8 1.4 3.8 2.1 3.4 1.3 1.5 2.9 2.6 0.0 4.1 2.9 1.9 2.4 0.0 1.8 3.1 3.8 3.2 1.6 4.2 0.0 1.2 1.8 2.4 (a) Use a calculator with mean and standard deviation keys to find and s (in percentages). (For each answer, enter a number. Round your answers to two decimal places.) = x bar =____________ %s =___________________ % (b) Compute a 90% confidence interval (in percentages) for the population mean μ of home run percentages for all professional baseball players. Hint: If you use the Student's t distribution table, be sure to use the closest d.f. that is smaller. (For each answer, enter a number. Round your answers to two decimal places.)lower limit ____________ %upper limit ____________ % (c) Compute a 99% confidence…
The percentage distribution of the number of occupants invehicles crossing the Tacoma Narrows Bridge in Washington is shown in the pie chart.Find each probability. (Source: Washington State Department of Transportation.)(a) Randomly selecting a car with two occupants(b) randomly selecting a car with two or more occupants(c) Randomly selecting a car with between two and five occupants,inclusive One = 55.5% Two = 29.8% Three = 7.6% Four = 4.7% Five = 1.4% Six or more = 1%
Use the frequency distribution, which shows the numbers of voters in millions according to age, find the probability that a voter chosen at random is in the given age range. Not between 18 to 20 years old The probability is:
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Question content area top left Part 1 Use the accompanying bar graph, which shows the highest level of education received by employees of a company, to find the probability that the highest level of education for an employee chosen at random is a doctoratea doctorate. ... Question content area top right Part 1 A bar graph titled Level of Education has a horizontal axis labeled Doctoral, Master's, Bachelor's, Associate's, High School diploma, and Other and a vertical axis labeled Number of employees from 0 to 40 in increments of 5. There are vertical bars, each of which is over a horizontal axis label. The heights of the bars are as follows, where the horizontal axis label is listed first and the height is listed second: Doctoral, 2; Master's, 25; Bachelor's, 32; Associate's, 24; High School diploma, 4; Other, 1. Each bar is labeled with its height. Level of education ABCDEF010203040Number of employeesA:DoctoralB:Master'sC:Bachelor'sD:Associate'sE:High School…
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construct a probability distribution for the data and draw a graph for the distribution. Garage Space The probabilities that a randomly selected home has garage space for 0, 1, 2, or 3 cars are 0.22, 0.33. 0.37, and 0.08, respectively