Ok some attempts.
1983 7i)
A city council consists of 6 Liberal and 5 Labor aldermen, from whom a committee of 5 members is chosen at random. What is the probability that the Liberals have a majority on the committee?
_____
Pr(lib majority) = Pr ( 3+4+5 liberals)
1. ways of picking 3 libs and 2 lab ... C(6,3)C(5,2)
2. ways of picking 4 libs and 1 lab ... C(6,4)C(5,1)
3. ways of picking 5 libs and no labs ... C(6,5)
ways of picking any committee of 5 ... C(11,5)
therefore Pr(majority libs) =
1985 8i)
a) In how many ways can 4 persons be grouped into two pairs to play a set of doubles tennis?
b) The eight members of a tennis club meet to play two simultaneous sets of doubles tennis on two separate but otherwise identical courts. In how many different ways can the members of the club be selected for these two sets of tennis?
_______
I drew a court lol anyway
a)
1. Choose first pair...C(4,2)
2. Choose 2nd pair...C(2,2)
3. Each side is identical so divide by 2!
Ways =
b)
I drew 2 courts.
1. Choose 1st pair ... C(8,2)
2. Choose 2nd pair ... C(6,2)
3. Choose 3rd pair ... C(4,2)
4. Choose last pair ... C(2,2)
5. Each court is identical ... divide by 2!
6. Each side is identical ... divide by 2!
Ways =
1986 8ii)
A committee of 4 women and 3 men are to be seated at random around a circular table with 7 seats. What is the probability that all the women will be seated together?
____
Consider a table with all of them.
1. Fix one man.
2. Group women together
3. Arrange 2 un-fixed men and the group of women ... 3!
4. Order the women (lol)... 4!
5. Total ways of arranging women together = 4!3!
6. Total ways of arranging 7 people ... 6!
7. Pr(women together) =
Don't judge me
