JEOPARDY!

1. JEOPARDY! Click Once to Begin UNIT 1 REVIEW

2. JEOPARDY! Counting Principles Probability Probability of Independent Events Even MORE probability Set Theory Potpourri 100 100 100 100 100 100 200 200 200 200 200 200 300 300 300 300 300 300 400 400 400 400 400 400 500 500 500 500 500 500

3. The number of different CD’s Ryan has to choose from when he has bought 2 country CD’s, 4 rock CD’s, and 3 rap CD’s.

4. The number of possible combinations of outfits when you bought 5 shirts, 3 pants, and 2 jackets.

5. The number of possible outcomes when you flip 4 coins.

6. The number of jackets you would need to have 24 different combinations of outfits when you have 3 pants and 4 shirts.

7. The number of possible license plates when the license plate contains 2 letters followed by 5 digits. (All combinations are equally likely)

8. The probability of tossing heads on a coin.

9. The probability of drawing a queen of hearts from a deck of cards.

10. The probability rolling a prime number on a dice.

11. The probability of rolling two dice, when added together will equal a sum of 7.

12. The probability of rolling two dice, when added together will equal a number less than five.

13. The P (blue, then red) if a marble is selected and replaced, and then a 2nd marble is selected from a box contains 5 red marbles, 3 blue marbles, and 4 yellow marbles.

14. The P (an even # and tossing a tail) when you roll a fair six-sided number cube and toss a coin.

15. The probability that each lottery machine would produce a 2 when there are 10 balls in each machine numbered 0 – 9 and there are 4 different machines.

16. The P (blue, and then red) if a marble is selected and replaced, and then a 2nd marble is selected from a box containing 5 red marbles, 3 blue marbles, and 4 yellow marbles.

17. The probability of randomly being assigned the I.D. B75 when your middle school I.D. number consists of one letter and two numbers.

18. The P (ace of hearts and king of hearts) when there are 52 cards in a deck and you replace the card after each draw.

19. The P (a face card, then another face card) when there are 52 cards in a deck and you replace the card after each draw.

20. The probability that A and B will occur when A and B are independent events such that P(A) = 1/6 and P (B) = 2/3

21. The probability that A or B will occur when A and B are independent events such that P(A) = 2/9 and P(B) = 4/9

22. Draw a two-Venn diagram labeled A and B.Shade to represent AuB

23. Draw a two-Venn diagram labeled A and B. Shade to represent AnB.

24. The universal set contains the months of the year.Set A = {January, February, March, April and May}What is A’?

25. Draw a three-Venn diagram labeled A,B,&C. Shade to represent (A U B U C)’

26. Draw a three-Venn diagram labeled A, B, & C. Shade to represent AnBnC

27. Draw a tree diagram to represent the possible outcomes for tossing two coins.

28. The first five prime numbers

29. The names of two administrators

30. Draw a tree diagram to represent the total number of possible combinations if you have 2 types of ice cream (vanilla, chocolate), 3 types of toppings (sprinkles, Oreos, chips) and 1 type of syrup (chocolate).

31. Applebee’s wants to have 90 different possible dinner combinations. So far, they are offering 6 appetizers, 5 entrée’s. How many dessert choices would they need to offer to equal 90?