MedVision ad

Year 11 Permutations (arrangements in a circle) (1 Viewer)

hs17

Member
Joined
Mar 1, 2020
Messages
95
Gender
Female
HSC
2021
3) Bob, Betty, Ben, Brad and Belinda are to be seated at a round table. In how many ways can this be done:

a if there are no restrictions,

b if Betty sits on Bob’s right-hand side,

c if Brad is to sit between Bob and Ben,

d if Belinda and Betty sit apart,

e if Ben and Belinda sit apart, but Betty sits next to Bob?
 

Pedro123

Active Member
Joined
Jun 17, 2019
Messages
106
Gender
Male
HSC
2021
Firstly, label them A,B,C,D,E. The question is intentionally pissing you off. I assume it means the seats at the table are not unique, that is A,B,C,D and E is the same as B,C,D,E and A.
a) This is a simple 4!, since position doesn't matter.
b) By this, I assume it means directly right. As such, there should be 3! ways to do it.
c) If the 3 people are defined, there are only 2 other people to be selected. but, brad and bob can be on either side, so there is actually 2*2 = 4.
d) With this, you can use b). If there are 3! for right, there are 3! for left. This is how many ways someone can sit next to someone. Take this away from 4!
d) Consider here the gaps. Between A and B, there must be one 1 person gap and 1 2 person gap. The 2 person gap must be C and D, which have 2 ways to be positioned. The other gap must only have E. As such, there are 2*2

Take with a pinch of salt though - I may have just been entirely wrong.
 
Last edited:

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top