USA: +1(669)289-8683 
Sign in
only question 6,7 and 8!
typed answers required.
MATH 464
HOMEWORK 6
SPRING 2013
The following assignment is to be turned in on
Thursday, March 7, 2013.
1. Suppose that in a certain state the license plates have three letters fol-
lowed by 3 numbers. If no letter or number can be repeated, how many
license plates are possible?
2. A club has 50 members. The club need to form two committees, one with
8 members and one with 7 members. How many ways can this be done if
no one is allowed to serve on two committees at the same time?
3. 6 students, 3 boys and 3 girls, line up in random order for a photograph.
What is the probability that the boys and girls alternate?
4. A fair coin is tossed 10 times. What is the probability of 5 heads? What
is the probability of at least 5 heads?
5. I have a television with 50 channels. On a certain evening, 12 are showing
sit-coms, 17 are showing reality shows, 15 are showing movies, and the
remaining 6 are showing something else. If I randomly pick 5 of the channels
and look at what is showing, what is the probability that I see:
a) exactly 2 movies, 1 sit-com, and 2 reality shows?
b) at least one movie?
c) only sit-coms and reality shows?
6. Consider a usual deck of cards. Draw five cards at random. What is the
probability you get:
a) ”four of a kind” or four cards of the same rank?
b) a ”full-house” or three cards of the same rank and two cards of the same
rank?
c) ”three of a kind” or three cards of the same rank, but you do not have a
”full-house”?
7. I have 4 friends and 15 cookies. How many ways are there to:
1
2 SPRING 2013
a) give away all the cookies with no constraints?
b) give away all the cookies making sure every friend gets at least 2 cookies?
c) give away some (or none) of the cookies with no constraints?
8. A round table has n seats. n people are seated at random around the
table. Fred, who is sitting at the table, dislikes two of the people. Let X be
the number of neighbors of Fred whom he dislikes. Find the p.m.f. of X.
(Note that X can only be 0, 1, 2. )
