Lets do it with an example **20 choose 5**

Since `20 choose 5`

is defined as `20! / ( 5! * (20-5)! )`

We could use `memoization`

to store those factorial computations so we don't have to continually re-compute them under our recursion.

So:

```
//STORING FACTORIAL COMPUTATIONS
private Map<Integer,Long> factorialMap = new HashMap<Integer,Long>();
public Long getFactorial(int number) {
//CHECK IF I ALREADY COMPUTED THIS FACTORIAL
Long val = factorialMap.get(number);
if(val != null) {
//GOT IT!
return val;
} else {
//NEED TO COMPUTE!
val = getFactorialRecursive(number);
//STORING IT TO SAVE COMPUTATION FOR LATER
factorialMap.put(number, val);
return val;
}
}
//RECURSIVE FUNCTION TO COMPUTE FACTORIAL
public Long getFactorialRecursive(int number) {
if(number < 2) {
return 1L;
} else {
return number * getFactorialRecursive(number-1);
}
}
//ACTUAL CALL TO "20 choose 5"
public Long combination(int fromVal, int chooseVal) {
return getFactorial(fromVal)/(getFactorial(chooseVal)*getFactorial(fromVal-chooseVal));
}
```

`binomial coefficient`

. Here is code penguin.ewu.edu/cscd320/Topic/Strategies/DynamicPgming/… – halex Oct 6 '12 at 21:50