How many ways can 7 boys and 4 girls can be seated in a round table if the girls are to be a seated separately 3 marks b seated together 3 marks?

How many ways can 7 boys and 4 girls can be seated in a round table if the girls are to be a seated separately 3 marks b seated together 3 marks?

7*6*5*4=604,800 arrangements. It’s also 7! / 3! Let us seat the boys first.

How many ways can 4 boys and 4 girls line up for a photograph if the boys must alternate with the girls?

2*24*24=1,152 total arrangements to seat 4 boys and 4 girls, alternating boys and girls, into 8 seats.

READ ALSO:   What to do if your boss is trying to get you to quit?

How many ways can 4 girls and 4 boys sit in a row if the boys are to sit together?

=>37440 ways.

How many ways can 4 boys and 4 girls be seated on around table if the girls and boys are to occupy alternate seats?

=144 ways of sitting the girls in which the boys and girls alternate seats.

How many ways in which girls can be seated?

Therefore, the number of ways in which girls can be seated = 5! Alternatevily means one boy sitting to one girl , there are four boys and 5girls , boy cannot occupy first position as it will end up with 2 girls sitting next to each other No of arrangements for 4 boys = 4! No of arrangements for 5 girls = 5!

How many ways can boys and girls sit in the game?

There can be only one arrangement in which boys and girls can sit. but position of individual boy and girls can be changed. similarly boys have 4 slots, so they can be arranged in 4! ways. now, one more thing to consider is that out of 5! arrangements of girls, with each arrangement boys can be arranged in 4! different positions.

READ ALSO:   Who was the best songwriter in The Beatles?

How many ways can 4 girls sit in a row?

In how many ways can 4 girls and 3 boys sit in a row such that just the girls are to sit next to each other? Answer: 288 Please explain how to get this. I understand that we have GGGG => 4 girl… Stack Exchange Network

How many ways can 4 girls be arranged in a group?

Now these girls can be arranged in 4! = 24 ways. Now we have 3 boys who can be made to sit together in 3! = 6 ways. Finally we have Girls (G) and Boys (B) who have to be seated together and they can be seated in 2! = 2 ways (consider 4 girls as one group = G and 3 boys as one group = B)