# Powers of 3 for a given a positive integer A

Given a positive integer A, return an array of minimum length whose elements are powers of 3 and have the sum of all the elements equal to A.

For input A = 13:

• 30 = 1, 31 = 3, 32 = 9.
• 1 + 3 + 9 = 13.

So A = 13 can be represented as the sum of 1, 3 and 9.

Is there a better way to solve this problem?

public static int[] getSolve(int A) {

List<Integer> binary = new ArrayList<>();
while (A > 0) {
int r = A % 3;
A /= 3;
}

//  System.out.println(binary.toString());
List<Integer> res = new ArrayList<>();
int j = 0;
for (int i = 0; i < binary.size(); i++) {
if (binary.get(i) != 0) {
while (j < binary.get(i)) {
j++;
}
j =0;
}
}
return res.stream().mapToInt(i -> i).toArray();
}
• Since you have an implementation that works and are asking an open-ended question about improvements, this question would be more suitable to Code Review Stack Exchange Oct 27, 2021 at 15:44
• What version of 'better' are you looking for? Are you looking for efficiency or clarity/simplicity/elegance? Those things will definitely be in tension in your solution. Oct 27, 2021 at 20:56

The answer to this question is always the base 3 representation, which is also known as ternary.

My biggest suggestion is that there is no need for your binary data structure. As you are finding the remainders, right there and then you can see whether the remainder is and add the appropriate powers of 3 to your answer.

# For python folks, it can be useful

class Solution: # @param A : integer # @return a list of integers def solve(self, A): bits = [] solution = []

while(A != 0):
bits.append(A % 3);
A = A // 3;

for i in range(len(bits)):
if(bits[i] != 0):
tmp = 0;
while(tmp < bits[i]):
solution.append(pow(3, i));
tmp = tmp + 1
return solution