Concept explainers
The possible outcomes of an experiment involving the roll of a six-sided die are a one-spot, a two-spot, a three-spot, a four-spot, a five-spot, and a six-spot
- (a) Develop a
probability distribution for the number of possible spots. - (b) Portray the probability distribution graphically.
- (c) What is the sum of the probabilities?
a.
Give a probability distribution for the number of possible spots.
Answer to Problem 1SR
The probability distribution for the number of possible spots is as follows:
Number of spots | Probability |
1 | 0.16667 |
2 | 0.16667 |
3 | 0.16667 |
4 | 0.16667 |
5 | 0.16667 |
6 | 0.16667 |
Total | 1 |
Explanation of Solution
The outcomes of the experiment are one-spot, two-spot, three-spot, four-spot, five-spot, and six-pot. Thus, there are 6 possible outcomes. The experiment involves the roll of six-sided die. Hence, each outcome has probability of one-sixth.
The probability distribution for the number of possible spots is as follows:
Number of spots | Probability |
1 | |
2 | |
3 | |
4 | |
5 | |
6 | |
Total | 1 |
Thus, the probability distribution for the number of possible spots is obtained.
b.
Show the probability distribution graphically.
Answer to Problem 1SR
The graph of the probability distribution is as follows:
Explanation of Solution
Step-by-step procedure to plot probability distribution graph using EXCEL:
- Enter the probability values in a column.
- Select the data and go to Insert.
- In Charts, select 2-D Column.
Thus, the probability distribution graph is obtained.
c.
Calculate the sum of the probabilities.
Answer to Problem 1SR
The sum of probabilities is 1.
Explanation of Solution
The sum of probabilities is calculated as follows:
Therefore, the sum of probabilities is 1.
Want to see more full solutions like this?
Chapter 6 Solutions
STAT TECH IN BUSINESS & ECON LL\AC
- In Example 8, what is the probability that an employee chosen at random has 30 or more years of service?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_forwardQuality Control To control the quality of their product, the Bright-Light Company inspects three light bulbs out of each batch of ten bulbs manufactured. If a defective bulb is found, the batch is discarded. Suppose a batch contains two defective bulbs. What is the probability that the batch will be discarded?arrow_forward
- Quality Control To control the quality of their product, the Bright-Light Company inspects three light bulbs out of each batch of ten bulbs manufactured. If a defective bulb is found, the batch is discarded. Suppose a batch contain two defective bulbs. What is the probability that the batch will be discarded?arrow_forwardDividing a JackpotA game between two players consists of tossing a 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 8,000 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 Mathematician Pascal and Fermat corresponded about this problem, and both came to the same correct calculations though by very different reasonings. Their friend Roberval disagreed with both of them. He argued that player A has probability 34 of winning, because the game can end in the four ways H, TH, TTH, TTT and in three of these, A wins. Robervals reasoning was wrong. a Continue the game from the point at which it was interrupted, using either a coin or a modeling program. Perform the experiment 80 or more times, and estimate the probability that player A wins. bCalculate the probability that player A wins. Compare with your estimate from part a.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
- Algebra & Trigonometry with Analytic GeometryAlgebraISBN:9781133382119Author:SwokowskiPublisher:CengageCollege AlgebraAlgebraISBN:9781305115545Author:James Stewart, Lothar Redlin, Saleem WatsonPublisher:Cengage Learning
- College Algebra (MindTap Course List)AlgebraISBN:9781305652231Author:R. David Gustafson, Jeff HughesPublisher:Cengage LearningHolt Mcdougal Larson Pre-algebra: Student Edition...AlgebraISBN:9780547587776Author:HOLT MCDOUGALPublisher:HOLT MCDOUGALAlgebra and Trigonometry (MindTap Course List)AlgebraISBN:9781305071742Author:James Stewart, Lothar Redlin, Saleem WatsonPublisher:Cengage Learning