Practice
3.1 Terminology
In a particular college class, there are male and female students. Some students have long hair and some students have short hair. Write the symbols for the probabilities of the events for Parts A through J of this question. Note that you cannot find numerical answers here. You were not given enough information to find any probability values yet; concentrate on understanding the symbols.
- Let F be the event that a student is female.
- Let M be the event that a student is male.
- Let S be the event that a student has short hair.
- Let L be the event that a student has long hair.
- The probability that a student does not have long hair.
- The probability that a student is male or has short hair.
- The probability that a student is female and has long hair.
- The probability that a student is male, given that the student has long hair.
- The probability that a student has long hair, given that the student is male.
- Of all female students, the probability that a student has short hair.
- Of all students with long hair, the probability that a student is female.
- The probability that a student is female or has long hair.
- The probability that a randomly selected student is a male student with short hair.
- The probability that a student is female.
Use the following information to answer the next four exercises: A box is filled with several party favors. It contains 12 hats, 15 noisemakers, 10 finger traps, and five bags of confetti.
Find P(H).
Find P(N).
Find P(F).
Find P(C).
Find P(B).
Find P(G).
Find P(P).
Find P(R).
Find P(Y).
Find P(O).
Find P(A).
Find P(E).
Find P(F).
Find P(N).
Find P(O).
Find P(S).
What is the probability of drawing a red card in a standard deck of 52 cards?
What is the probability of drawing a club in a standard deck of 52 cards?
What is the probability of rolling an even number of dots with a fair, six-sided die numbered one through six?
What is the probability of rolling a prime number of dots with a fair, six-sided die numbered one through six?
If you land on Y, you get the biggest prize. Find P(Y).
If you land on red, you don’t get a prize. What is P(R)?
Write the symbols for the probability that a player is not an outfielder.
Write the symbols for the probability that a player is an outfielder or is a great hitter.
Write the symbols for the probability that a player is an infielder and is not a great hitter.
Write the symbols for the probability that a player is a great hitter, given that the player is an infielder.
Write the symbols for the probability that a player is an infielder, given that the player is a great hitter.
Write the symbols for the probability that of all the outfielders, a player is not a great hitter.
Write the symbols for the probability that of all the great hitters, a player is an outfielder.
Write the symbols for the probability that a player is an infielder or is not a great hitter.
Write the symbols for the probability that a player is an outfielder and is a great hitter.
Write the symbols for the probability that a player is an infielder.
What is the word for the set of all possible outcomes?
What is conditional probability?
A shelf holds 12 books. Eight are fiction and the rest are nonfiction. Each is a different book with a unique title. The fiction books are numbered one to eight. The nonfiction books are numbered one to four. Randomly select one book.
What is the sum of the probabilities of an event and its complement?
What does P(E|M) mean in words?
What does P(E OR M) mean in words?
3.2 Independent and Mutually Exclusive Events
E and F are mutually exclusive events. P(E) = .4; P(F) = .5. Find P(E∣F).
J and K are independent events. P(J|K) = .3. Find P(J).
U and V are mutually exclusive events. P(U) = .26; P(V) = .37. Find the following:
- P(U AND V) =
- P(U|V) =
- P(U OR V) =
Q and R are independent events. P(Q) = .4 and P(Q AND R) = .1. Find P(R).
3.3 Two Basic Rules of Probability
Use the following information to answer the next 10 exercises: Forty-eight percent of all voters of a certain state prefer life in prison without parole over the death penalty for a person convicted of first-degree murder. Among Latino registered voters in this state, 55 percent prefer life in prison without parole over the death penalty for a person convicted of first-degree murder. Of all citizens in this state, 37.6 percent are Latino.
In this problem, let
- C = citizens of a certain state (registered voters) preferring life in prison without parole over the death penalty for a person convicted of first-degree murder.
- L = registered voters of the state who are Latino.
Suppose that one citizen is randomly selected.
Find P(C).
Find P(L).
Find P(C|L).
In words, what is C|L?
Find P(L AND C).
In words, what is L AND C?
Are L and C independent events? Show why or why not.
Find P(L OR C).
In words, what is L OR C?
Are L and C mutually exclusive events? Show why or why not.
3.4 Contingency Tables
Use the following information to answer the next four exercises: Table 3.16 shows a random sample of musicians and how they learned to play their instruments.
Gender | Self-Taught | Studied in School | Private Instruction | Total |
---|---|---|---|---|
Female | 12 | 38 | 22 | 72 |
Male | 19 | 24 | 15 | 58 |
Total | 31 | 62 | 37 | 130 |
Find P(musician is a female).
Find P(musician is a male AND had private instruction).
Find P(musician is a female OR is self taught).
Are the events being a female musician and learning music in school mutually exclusive events?
3.5 Tree and Venn Diagrams
The probability that a man develops some form of cancer in his lifetime is 0.4567. The probability that a man has at least one false-positive test result, meaning the test comes back for cancer when the man does not have it, is .51. Let C = a man develops cancer in his lifetime; P = a man has at least one false-positive test. Construct a tree diagram of the situation.