# Generate combinations for representing a number

Question:

Given infinite number of quarters (25 cents), dimes (10 cents), nickels (5 cents), and pennies (1 cents), calculate the number of ways of representing n cents.

``````public static int generateComb(int n){
if(n < 0){
return 0;
}
if(n == 0){
return 1;
}

int ways = generateComb(n-25) + generateComb(n-10) + generateComb(n-5) + generateComb(n-1);
return ways;
}
``````

Please tell me if my implementation is correct or not.

• Your algorithm is more of permutation where (1, 5) is different from (5, 1). – Shivam Jan 13 '13 at 2:50
• can you guys suggest a method..? – ASingh Jan 13 '13 at 2:54

One fix would be to insure that no recursive call ever uses a coin larger than the last one used.

Thanks guys..I was able to get it:

``````public static int generateComb(int n, int denom){

int next_denom = 0;
switch(denom){
case 25:
next_denom = 10;
break;
case 10:
next_denom = 5;
break;
case 5:
next_denom = 1;
break;
case 1:
return 1;
}

int ways = 0;
for(int i = 0 ; i*denom <= n ; i++){
ways+= generateComb(n-i*denom, next_denom);
}
return ways;
}
``````

Same approach as your solution but slightly shorter and supports arbitrary denominations.

``````private static int generateComb(int amount, Collection<Integer> denominations) {
if (amount == 0) return 1;
if (denominations.isEmpty()) return 0;

List<Integer> denominationsList = new ArrayList<Integer>(denominations);
Collections.sort(denominationsList, Collections.reverseOrder());

int currentDenomination = denominationsList.remove(0);
int ways = 0;
for (int total = 0; total <= amount; total += currentDenomination) {
ways += generateComb(amount - total, denominationsList);
}

return ways;
}
``````

Another solution -

``````int[] arr = {5, 3 , 1};
int sum = 10;
countNway(arr, sum, 0);

public int countNway(int[] arr, int sum, int start){

if(start>arr.length){
return 0;
}
if(sum==0){
return 1;
}
if(sum<0){
return 0;
}
int result =0;
for(int i= start;i<arr.length;i++){
for(int j = 1; j<=(sum/arr[i]); j++){
result += countNway(arr, sum -arr[i]*j, i+1);
}
}
return result;
}
``````