Chapter 3 Review

Permutations and Combinations

The Addition Rule

The Multiplication Rule

Basic Probability

100

Perform the indicated calculation:

₁₁P₂

110

100

Mutually Exclusive or Not:

A: Randomly select a person who loves cats.

B: Randomly select a person who loves dogs.

Not Mutually Exclusive

100

Independent or Dependent:

Taking a driver's education course and passing the driver's license exam.

Dependent

100

Find the probability of rolling a number less than 8 on a 12-sided die.

0.583

200

Perform the indicated calculation:

₅C₃ ÷ ₁₀C₃

0.083

200

A card is randomly selected from a standard deck of 52 playing cards. Find the probability that the card is red or a queen.

0.538

200

Independent or Dependent:

Tossing a coin 4 times, getting four heads, and tossing it a fifth time and getting a head.

Independent

200

Find the probability of selecting a red card from a standard deck of cards.

0.5

300

Fifteen cyclists enter a race. How many ways can the cyclists finish first, second, and third?

2730

300

A 12-sided die is rolled. Find the probability that the roll results in an odd number or a number less than 4.

0.583

300

A coin is tossed and a die is rolled. Find the probability of tossing a head and then rolling a number that is at least a 3.

0.33

300

A student must choose from 7 classes to take at 8AM, 4 classes to take at 9AM, and 3 classes to take at 10AM. How many ways can the student arrange the schedule?

400

An employer must hire 2 people from a list of 13 applicants. In how many ways can the employer choose to hire the 2 people?

400

A math class has 30 students. Of these, 10 are math majors and and 15 are male. Of the math majors, 8 are male. Find the probability that a randomly selected student is male or a math major.

0.567

400

Your sock drawer has 18 folded pairs of socks, with 8 pairs of white, 6 pairs of black, and 4 pairs of blue. What is the probability that you will first select and remove a black pair, then select either a blue or white pair?

0.235

400

You are planning a three-day trip to Seattle in October. Given that it could be raining or sunny on each day, find the probability that it is sunny all 3 days.

0.125

500

A shipment of 200 calculators contains 3 defective units. What is the probability that a sample of three calculators will have no defective calculators?

0.955

500

Of the cartons produced by the company, 5% have a puncture, 8% have a smashed corner, and 0.4% have both a puncture and a smashed corner. Find the probability that a randomly selected carton has a puncture or a smashed corner.

0.126

500

A doctor gives a patient a 60% chance of surviving bypass surgery after a heart attack. If the patient survives the surgery, then the patient has a 50% chance that the heart heals. Find the probability that the patient survives surgery and the heart heals.

0.3

500

Which of the following is NOT a probability?

A) 35%

B) 3/2

C) 0.879

D) 1/6

B) 3/2