In an experiment, n six-faced normal dic...

In an experiment, n six-faced normal dice are thrown. Find the number of sets of observations which are indistinguishable among themselves.

Text Solution

Verified by Experts

Let number I be obtained `x_(i)` number of times.
So, we have `x_(1)+x_(2)+x_(3)+x_(4)+x_(5)+x_(6)=n`, where `x_(i) ge 0`.
Hence, required number
= Number of non-negative integration solutions of above equation
`=.^(n+6-1)C_(6-1)`
`=.(n+5)C_(5)`

Similar Questions

Explore conceptually related problems

Find the number of distinct throws which can be thrown with n six-faced normal dice,which are indistinguishable among themselves.

A dice is thrown once. Find the probability of getting a prime number .

Two dice are thrown . Find the probability of the following events The product of number on their upper faces is 12.

Two dice are thrown. The number of sample points in the sample space when six does not appear on either dice is

3 dices are thrown,Find the probability of the numbers with the sum of those are 10?

Two dice are thrown simulaneously. Find the probability of getting six as a product.

Two dice are thrown . Find the probability of the following events The sum of the numbers on their upper faces is 15.

. Two dice are thrown together.Find the probability of the same number on both dice

If three six-faced fair dice are thrown together, find the probability that the sum of the numbers appearing on the dice is 12.

In an experiment, n six-faced normal dice are thrown. Find the number of sets of observations which are indistinguishable among themselves.

Text Solution

Similar Questions

Recommended Questions