Concept explainers
a.
Explain the reason for a negative binomial distribution to be appropriate for a given random variable and define a formula for
a.
Answer to Problem 31P
There are binomial trials with
The formula for probability that Person S makes 12 successful sales is.
Explanation of Solution
Calculation:
There are binomial trials with probability of success
Let n follow a negative binomial distribution that represents the number of contacts needed to get 12th sale.
Probability of success
Probability of failure
Number of successful sales
Negative binomial probability:
The probability that kth success occurs on nth trial is given below:
Here, n is the number of trials in which kth success occurs, k is the number of successes,
The formula for probability that Person S makes 12 successful sales is given below:
Thus, the formula for probability that Person S makes 12 successful sales is
b.
Calculate the given probabilities.
b.
Answer to Problem 31P
The probability that Person S needs 12 contacts to get bonus is 0.0687.
The probability that Person S needs 13 contacts to get bonus is 0.1649.
The probability that Person S needs 14 contacts to get bonus is 0.2144.
Explanation of Solution
Calculation:
The probability that Person S needs 12 contacts to get bonus is given below:
Thus, the probability that Person S needs 12 contacts to get bonus is 0.0687.
The probability that Person S needs 13 contacts to get bonus is given below:
Thus, the probability that Person S needs 13 contacts to get bonus is 0.1649.
The probability that Person S needs 14 contacts to get bonus is given below:
Thus, the probability that Person S needs 14 contacts to get bonus is 0.2144.
c.
Calculate the probability that Person S will require 12 to 14 contacts to get bonus.
c.
Answer to Problem 31P
The probability that Person S will require 12 to 14 contacts to get bonus is 0.4480.
Explanation of Solution
Calculation:
The probability that Person S will require 12 to 14 contacts to get bonus is calculated as follows:
Thus, the probability that Person S will require 12 to 14 contacts to get bonus is 0.4480.
d.
Calculate the probability that Person S will require more than 14 contacts to get bonus.
d.
Answer to Problem 31P
The probability that Person S will require more than 14 contacts to get bonus is 0.5520.
Explanation of Solution
Calculation:
The probability that Person S will require more than 14 contacts to get bonus is calculated follows:
Thus, the probability that Person S will require more than 14 contacts to get bonus is 0.5520.
e.
Calculate the
Calculate the standard deviation of
e.
Answer to Problem 31P
The expected value of
The standard deviation of
Explanation of Solution
Calculation:
The expected value of
Thus, the expected value of
The standard deviation of
Thus, the standard deviation of
Interpretation:
The expected number of contacts that the twelfth sale will occur is 15 with a standard deviation of 1.94.
Want to see more full solutions like this?
Chapter 5 Solutions
Bundle: Understandable Statistics: Concepts And Methods, 12th + Jmp Printed Access Card For Peck's Statistics + Webassign Printed Access Card For ... And Methods, 12th Edition, Single-term
- If a binomial experiment has probability p success, then the probability of failure is ____________________. The probability of getting exactly r successes in n trials of this experiment is C(_________, _________)p (1p)arrow_forwardFlexible Work Hours In a recent survey, people were asked whether they would prefer to work flexible hours----even when it meant slower career advancement----so they could spend more time with their families. The figure shows the results of the survey. What is the probability that three people chosen at random would prefer flexible work hours?arrow_forwardIn Example 8, what is the probability that an employee chosen at random has 30 or more years of service?arrow_forward
- Medicine Out of a group of 9 patients treated with a new drug, 4 suffered a relapse. Find the probability that 3 patients of this group, chosen at random, will remain disease-free.arrow_forwardIn Example 10, researchers selected five people at random from the population. What is the probability that all five people expected much of the workforce to be automated within 50 years?arrow_forwardDividing a Jackpot A game between two pIayers consists of tossing coin. Player A gets a point if the coin shows heads, and player B gets a point if it shows tails. The first player to get six points wins an $8000 jackpot. As it happens, the police raid the place when player A has five points and B has three points. After everyone has calmed down, how should the jackpot be divided between the two players? In other words, what is the probability of A winning (and that of B winning) if the game were to continue? The French mathematicians Pascal and Fermat corresponded about this problem, and both came to the same correct conclusion (though by very different reasoning's). Their friend Roberval disagreed with both of them. He argued that player A has probability of Winning, because the game can end in the four ways H, TH, TTH, TTT, and in three of these, A wins. Roberval’s reasoning was wrong. Continue the game from the point at which it was interrupted, using either a coin or a modeling program. Perform this experiment 80 or more times, and estimate the probability that player A wins. Calculate the probability that player A wins. Compare with your estimate from part (a).arrow_forward
- College AlgebraAlgebraISBN:9781305115545Author:James Stewart, Lothar Redlin, Saleem WatsonPublisher:Cengage LearningAlgebra & Trigonometry with Analytic GeometryAlgebraISBN:9781133382119Author:SwokowskiPublisher:Cengage
- Holt Mcdougal Larson Pre-algebra: Student Edition...AlgebraISBN:9780547587776Author:HOLT MCDOUGALPublisher:HOLT MCDOUGALCollege Algebra (MindTap Course List)AlgebraISBN:9781305652231Author:R. David Gustafson, Jeff HughesPublisher:Cengage Learning