15 identical balls have to be put in 5 d...

15 identical balls have to be put in 5 different boxes. Each box can contain any number of balls. Total number of ways of putting the balls in to the boxes so that each box contains at least 2 balls, is equal to

A

`""^(9)C_(5)`

B

`""^(10)C_(5)`

C

`""^(6)C_(5)`

D

`""^(10)C_(6)`

Text Solution

Verified by Experts

The correct Answer is:

A

Similar Questions

Explore conceptually related problems

From a box containing some red balls and some blue balls the probability of getting a red ball is a/b . What is the probability of getting a blue ball?.

A bag contains 5 black and 6 red balls. Determine the number of ways in which 2 black and 3 red balls can be selected?

One box contains 7 red balls and 5 blue balls. Another box contains 5 yellow and 9 green balls. What is the probability of getting green balls from the second box?

A bag contains 5 red balls and some blue balls. If the probability of drawing a blue ball is double that of red ball, the number of blue balls must be

A bag contains 5 blue and 6 white balls. Determine the number of ways in which 3 blue and 4 white balls can be selected.

One box contains 7 red balls and 5 blue balls. Another box contains 5 yellow and 9 green balls. What is the probability of getting red balls from the first box?

One box contains 7 red balls and 5 blue balls. Another box contains 5 yellow and 9 green balls. What is the probability of getting blue balls from the first box?

15 identical balls have to be put in 5 different boxes. Each box can contain any number of balls. Total number of ways of putting the balls in to the boxes so that each box contains at least 2 balls, is equal to

Text Solution

Similar Questions

Recommended Questions