Deck 5: Possibilities and Probabilities

A multiple choice test has 10 questions with 4 choices for each question. The number of ways a student can answer all 10 questions is

Two restaurants are to be built at locations selected from a choice of 11 locations. The number of ways selecting the locations for the two restaurants is

In an 8-horse race, the number of ways that 3 horses can finish first, second, and third (order matters) is given by

The probability of selecting a defective component from 20 components, 3 of which are defective, is $\frac{3}{20}$ . This is an example of

A company employs 40 skilled and 30 unskilled workers. Twenty -five of the skilled workers and 17 of the unskilled are college graduates. If an employee of the company is selected at random, the probability that the person picked will not be a college graduate is

Which of the following is not true of the symbol $\left(\begin{array}{c}11 \\ 3\end{array}\right)$ ?

In the past eight Friday nights, a student has gone to the same rock music club on five occasions. The claim that the probability is $\frac{5}{8}$ that the student will attend the same club next Friday is based on

A student has time to see four films on his vacation. If he is selecting the movies from a total of nine choices, how many ways can he choose the films?

A student has seven items of living room furniture and room for five items in his living room. Assuming that any of the seven items can be placed in any of the five locations, in how many ways can the student arrange his living room with the furniture?

A student can play 0,1 , or 2 hours of racquetball on any given night. Construct a tree diagram to determine the number of ways that in three nights he can play for a total of four hours.

A student can play 0, 1, or 2 hours of racquetball on any given night. Construct a tree diagram to determine the number of ways that in three nights he can play for a total of five hours.

Give the number of ways a student can mark her answers to a multiple choice test if there are eight questions with three choices each.

Give the number of ways a student can mark her answers to a multiple choice test if there are three questions with eight choices each

Give the number of ways a student can mark her answers to a multiple choice test if there are 10 questions with four choices each for the first three questions and five choices each for the next seven questions.

There are six baseball teams in the American League's Eastern division. In how many ways can:}
-three teams finish first, second, and third?

There are six baseball teams in the American League's Eastern division. In how many ways can:}
-all six teams finish first through sixth?

A new campus project requires a committee of 5 students which will include 2 seniors and 3 juniors. There are 6 available seniors and 8 available juniors.
-In how many ways can the juniors be chosen for the committee?

A new campus project requires a committee of 5 students which will include 2 seniors and 3 juniors. There are 6 available seniors and 8 available juniors.
-In how many ways can the required committee be chosen?

A new campus project requires a committee of 5 students which will include 2 seniors and 3 juniors. There are 6 available seniors and 8 available juniors.
-In how many ways can the committee be chosen from the available students if there are no restrictions on the number of juniors or seniors on the committee?

A shipment of 12 television sets contains one that is damaged. In how many ways can an inspector choose 3 of the televisions to inspect so that:
-the defective item is not included?

A shipment of 12 television sets contains one that is damaged. In how many ways can an inspector choose 3 of the televisions to inspect so that:
-the defective item is included?

A balanced die is rolled. Find the probability of getting:
-a value of at least two.

A balanced die is rolled. Find the probability of getting:
-an odd number.

Two cards are drawn from a well-shuffled deck of 52 playing cards.}
-What is the probability of getting two jacks?

Two cards are drawn from a well-shuffled deck of 52 playing cards.}
-What is the probability of getting two clubs?

Two cards are drawn from a well-shuffled deck of 52 playing cards.}
-What is the probability of getting an ace and a king?

A student is planning the music she will play at a party. If she has 15 record albums and wants to select 6 to play, in how many ways can she select the albums if she believes that:
-the order of the records matter?

A student is planning the music she will play at a party. If she has 15 record albums and wants to select 6 to play, in how many ways can she select the albums if she believes that:

-the order of the records does not matter?

If 3 of 16 tax returns contain errors, and 7 of them are randomly chosen for audit, what is the probability that:
-exactly two of the returns with errors are audited?

If 3 of 16 tax returns contain errors, and 7 of them are randomly chosen for audit, what is the probability that:
-all three of the returns with errors are audited?

If 3 of 16 tax returns contain errors, and 7 of them are randomly chosen for audit, what is the probability that:
-none of the returns with errors is audited?

Two vice presidents are to be selected from the division managers in a certain company. If there are 9 division managers, in how many ways can the vice presidents be selected?

After two vice presidents are selected from 9 division managers, 3 other promotions will be granted. From the remaining division managers, how many ways can the new promotions be granted?

Two families, each consisting of a husband, a wife, two sons, and one daughter, are planning to see a movie together and sit together in the same row. In how many ways can they be seated if:
-each family is to sit together?

Two families, each consisting of a husband, a wife, two sons, and one daughter, are planning to see a movie together and sit together in the same row. In how many ways can they be seated if:
-all the males are to sit together and all of the females are to sit together?

Two families, each consisting of a husband, a wife, two sons, and one daughter, are planning to see a movie together and sit together in the same row. In how many ways can they be seated if:
-all of the children are to sit together and all of the adults are to sit together?

How many permutations are there of the letters in the word "distinction"?

In how many ways can 12 persons be arranged in a circle?

A cable TV company has 10 channel offerings. One option is that a subscriber may select any four channels. In how many ways can a subscriber make his/her selection?

I have 11 shirts, but only four hangers. In how many ways can I choose four of the shirts to hang in which the arrangement of the shirts in my closet makes a difference to me?

A group of investors wants to hire a team of 4 accountants and 2 financial planners. If the investors are considering 8 accountants and 5 financial planners:}
-how many six-person teams can be hired under the given conditions?

A group of investors wants to hire a team of 4 accountants and 2 financial planners. If the investors are considering 8 accountants and 5 financial planners:}
-how many six-person teams can be hired if no attention is paid to profession?

An accounting firm is selecting three accounts to audit out of a total of 11 accounts. The number of ways the firm can select the three accounts is given by $11 \cdot 10 \cdot 9$ .

The number of three person committees that can be formed from eight people is the same as the number of three-letter words that can be formed from the letters a, b, c, d, e, f, g, h with no repetitions.

The probability of rolling a three in one roll of an ordinary die is $\frac{1}{6}$ . This is an example of the frequency interpretation of probability.

The expression 7 ! 3 ! is equal to 10 !.

The expression 11 ! is equal to $\frac{12 !}{12}$ .

The number of six-letter words that can be formed from the word OBJECT is 6!

The multiplication of choices principle states that if an experiment is repeated again and again, the proportion of successes will tend to approach the probability that any one outcome will be a success.

A magazine reader wants to subscribe to three magazines from a choice of eight magazines. The number of ways this can be done is $\frac{8 \cdot 7 \cdot 6 \cdot 5 \cdot 4 \cdot 3 \cdot 2 \cdot 1}{3 \cdot 2 \cdot 1}$

The number of seven-digit phone numbers that can be formed that begin with 353 with not all of the last four digits 0 is 94 .

The number of ways that 4 students can be selected from 30 students in a class to fill 4 seats (if order matters) is $\frac{30 \cdot 29 \cdot 28 \cdot 27}{4 \cdot 3 \cdot 2 \cdot 1}$

The number of five-player basketball teams that can be formed from a group of 11 players is _______.

The value of $\left(\begin{array}{l}7 \\ 3\end{array}\right)$ is _______.

The value ${ }_{7} P_{3}$ is _______.

The symbol $\left(\begin{array}{l}20 \\ 13\end{array}\right)$ can be rewritten symbolically as _______.

The probability of selecting a face card in one draw of a card from an ordinary deck is _______.

The factorial notation for ${ }_{7} P_{7}$ is _______.

The factorial notation for ${ }_{8} P_{5}$ is _______.

A restaurant menu has eight main courses, five appetizers, six desserts, and four beverages. The number of ways that a patron can select a meal with one appetizer, one main course, one dessert, and one beverage is _______.

If the president is considering the elimination of seven federal programs but is selecting only three of the seven to eliminate, the number of ways he can select the programs is _______.

A woman who is furnishing her apartment is selecting a sofa, a lounge chair, and a bookcase. If she has five sofas, eight lounge chairs, and three bookcases to choose from, the number of ways that she can select the furniture is _______.