- 1. State whether the following is a probability?
2/3
A) Probability B) Not a Probability
- 2. State whether the following is a probability?
1.65
A) Not a Probability B) Probability
- 3. State whether the following is a probability?
1
A) Not a Probability B) Probability
- 4. State whether the following is a probability?
0.63
A) Not a Probability B) Probability
- 5. State whether the problem is an example of classical, empirical, or subjective probability.
The local high school population is 48% males.
A) Empirical B) Classical C) Subjective
- 6. State whether the problem is an example of classical, empirical, or subjective probability.
The sports reporter said there is a 30% chance that the Broncos win the Super Bowl.
A) Empirical B) Classical C) Subjective
- 7. State whether the problem is an example of classical, empirical, or subjective probability.
The probability of getting a pair in a card game is 1/221.
A) Subjective B) Empirical C) Classical
- 8. State whether the problem is an example of classical, empirical, or subjective probability.
At the animal shelter, 62% of the animals are dogs.
A) Empirical B) Subjective C) Classical
- 9. State whether the problem is an example of classical, empirical, or subjective probability.
The young boy made an educated guess that he was 92% sure he was going to win the video game.
A) Subjective B) Classical C) Empirical
- 10. If one card is drawn from a deck of cards, what is the probability of.... ***Reduce all fractions***
P(getting an ace) =
- 11. If one card is drawn from a deck of cards, what is the probability of.... ***Reduce all fractions***
P(getting a black 8) =
- 12. If one card is drawn from a deck of cards, what is the probability of.... ***Reduce all fractions***
P(getting the complement of a jack) =
- 13. If a die is rolled once, what is the probability of.....
***Reduce all fractions***
P(getting a 1) =
- 14. If a die is rolled once, what is the probability of.....
***Reduce all fractions***
P(getting an even number) =
- 15. If a die is rolled once, what is the probability of.....
***Reduce all fractions***
P(getting the complement of 3)
- 16. Determine whether the event is dependent or independent.
Rolling a die and getting an even number and drawing a red card from a deck of cards.
A) Dependent B) Independent
- 17. Calculate the probability of the event.
***Reduce all fractions***
Rolling a die and getting an even number and drawing a red card from a deck of cards.
- 18. Determine whether the event is dependent or independent.
Drawing a 5 from a deck of cards and rolling a 5 on a die.
A) Dependent B) Independent
- 19. Calculate the probability of the event.
***Reduce all fractions***
Drawing a 5 from a deck of cards and rolling a 5 on a die.
- 20. Determine whether the event is dependent or independent.
Drawing a king from a deck of cards and flipping heads on a coin.
A) Dependent B) Independent
- 21. Calculate the probability of the event.
***Reduce all fractions***
Drawing a king from a deck of cards and flipping heads on a coin.
- 22. Determine whether the event is dependent or independent.
Drawing two cards from a deck of cars without replacement and getting two 3's.
A) Independent B) Dependent
- 23. Calculate the probability of the event.
***Reduce all fractions***
Drawing two cards from a deck of cars without replacement and getting two 3's.
- 24. Determine whether the event is dependent or independent.
Drawing two cards from a deck of cards with replacement and getting an ace and a king.
A) Dependent B) Independent
- 25. Calculate the probability of the event.
***Reduce all fractions***
Drawing two cards from a deck of cards with replacement and getting an ace and a king.
- 26. Calculate the probability of the event.
***Answer should be written as a rounded percent (##.##%)***
After doing a survey, Mrs. Dunlap discovers that 30% of students can raise one eyebrow at a time. If she randomly selects 3 students, what is the probability that all 3 students can raise one eyebrow?
- 27. Calculate the probability of the event.
***Answer should be written as a rounded percent (##.##%)***
During his career, Michael Jordan made 84% of his free throws. If he shot 4 free throws in a row, what is the probability that he would make all 4 free throws?
- 28. In a bag of marbles, there are 2 pink, 4 yellow, and 4 blue marbles. Calculate the following probability...
***Reduce all fractions.***
Picking 2 marbles without replacement, P(Pink ∩ Yellow) =
- 29. In a bag of marbles, there are 2 pink, 4 yellow, and 4 blue marbles. Calculate the following probability...
***Reduce all fractions.***
Picking 2 marbles without replacement, P(Blue ∩ Blue) =
- 30. In a bag of marbles, there are 2 pink, 4 yellow, and 4 blue marbles. Calculate the following probability...
***Reduce all fractions.***
Picking a marble, P(Blue ∩ Yellow) =
- 31. In a bag of marbles, there are 2 pink, 4 yellow, and 4 blue marbles. Calculate the following probability...
***Reduce all fractions.***
Picking 2 marbles with replacement, P(Blue ∩ Yellow) =
- 32. Calculate the probability of the event.
***Answer should be written as a rounded percent (##.##%)***
During his career, Michael Jordan made 84% of his free throws. If he shot 4 free throws in a row, what is the probability that he makes two free throws and misses the last two?
- 33. Compare the two types of "And" probability.
|