How many ways can we put 14 identical balls into 5 distinct bins if no bin...

How many ways can four distinct balls be placed into four distinct bins so that no...

How many ways can four distinct balls be placed into four distinct bins so that no bin contains more than two balls.

In how many ways can we place n distinct objects into k distinct bins such that...

In how many ways can we place n distinct objects into k distinct bins such that no bin contains more than half of the objects?

How many ways can we put 10 identical red balls and 10 identical blue balls into...

How many ways can we put 10 identical red balls and 10 identical blue balls into 4 distinct urns such that: there is no constraint?    first urn has at least 1 red ball and 2 blue balls? each urn has at least 1 ball? (hint: inclusion-exclusion principle)

In how many ways can 14 distinct red balls and 10 distinct blue balls be placed...

In how many ways can 14 distinct red balls and 10 distinct blue balls be placed in a row such that 1) all red balls are adjacent, 2) all blue balls are adjacent, 3) no two red balls are adjacent?

how many ways are there to choose nineteen identical balls from a pile of red, yellow,...

how many ways are there to choose nineteen identical balls from a pile of red, yellow, blue, and green balls if there can be no more than seven balls of each color?

What is the number ways to put n distinct balls into n+1 boxes, n of which...

What is the number ways to put n distinct balls into n+1 boxes, n of which are identical and the other of which is different (say it is larger than the rest)?

We are given n distinct balls and m distinct boxes. m and n are non-negative integers....

We are given n distinct balls and m distinct boxes. m and n are non-negative integers. Every ball must be placed into a box, but not every box must have a ball in it. Each box can hold any number of balls. Let's also assume that the order in which we put the balls into the boxes does matter. (Ex: assume we have 2 balls, a and b, and 3 boxes, 1 2 and 3. two distinct distributions would be...

Among a set of 5 black balls and 3 red balls in how many ways can...

Among a set of 5 black balls and 3 red balls in how many ways can we select 5 balls so that at least 3 of them are black?

There are 100 identical red balls, 100 identical yellow balls, and 100 identical green balls. In...

There are 100 identical red balls, 100 identical yellow balls, and 100 identical green balls. In how many different ways can we select 25 balls so that the number of red balls is even and the number of yellow balls is odd?

Suppose we want to choose 5 letters, without replacement, from 13 distinct letters. How many ways...

Suppose we want to choose 5 letters, without replacement, from 13 distinct letters. How many ways can this be done, if the order of the choices does not matter? How many ways can this be done, if the order of the choices matters?