Problems about complements:
1. a. If I spin 25 pennies, and 14 land heads up, what percentage of heads did I get?
b. What percentage tails did I get?
2. a. If I roll a normal die 20 times, and I get "6" 5 times, what percentage of the rolls were 6?
b. What percentage of the rolls were less than 6?
3. I have some red, blue and green beads in a bag. I did the following experiment 20 times: I took out three beads, and recorded if at least two were the same color. 70% of the time at least two were the same color. What happened the other 30% of the time?
4. I rolled two dice, and recorded whether I got the same number on both dice or not. 15% of the time, I got the same number on both dice. What happened the other 85% of the time?
The Birthday problem and similar stuff
Important ideas in the birthday problem:
Some problems:
The birthday problem itself:
5. What computation would you do to figure out for a group of 8 people what the probability is that two people have the same birthday? (just write out the mulitplication, don't crunch the numbers) (assume 366 equally likely days per year)
6. In a group of 30, is it the probability more or less than 50% that (at least) two people will have the same birthday?
The variations will not appear on Tuesday's quiz, but will reappear after Tuesday's class. Variations:
7. In a group of 8 people, what is the probability that two people's birthdays are in the same month?
8. In a group of 6 people, what is the probability that two people's birthday's are in the same month?