Find the smallest number whose digits multiply to a given number n
Given a number ‘n’, find the smallest number ‘p’ such that if we multiply all digits of ‘p’, we get ‘n’. The result ‘p’ should have minimum two digits.
Examples:
Input: n = 36 Output: p = 49 // Note that 4*9 = 36 and 49 is the smallest such number Input: n = 100 Output: p = 455 // Note that 4*5*5 = 100 and 455 is the smallest such number Input: n = 1 Output:p = 11 // Note that 1*1 = 1 Input: n = 13 Output: Not Possible
For a given n, following are the two cases to be considered.
Case 1: n < 10 When n is smaller than n, the output is always n+10. For example for n = 7, output is 17. For n = 9, output is 19.
Case 2: n >= 10 Find all factors of n which are between 2 and 9 (both inclusive). The idea is to start searching from 9 so that the number of digits in result are minimized. For example 9 is preferred over 33 and 8 is preferred over 24.
Store all found factors in an array. The array would contain digits in non-increasing order, so finally print the array in reverse order.
1 public static int findSmallest(int n){ 2 if(n < 10) return 10 + n; 3 int out = 0; 4 int pos = 0; 5 for(int i = 9; i > 1; i --){ 6 while(n % i == 0){ 7 n /= i; 8 out += i * Math.pow(10, pos); 9 pos ++; 10 } 11 } 12 return n ==1 ? out : -1; 13 }
posted on 2014-07-16 05:49 Step-BY-Step 阅读(297) 评论(0) 编辑 收藏 举报