Convert a number m to n with minimum operations. The operations allowed are :
- Multiply by 2, i.e., do m = 2 * m
- Subtract 1, i.e., do m = m – 1
Print -1 if it is not possible to convert.
Input : m = 3, n = 11 Output : 3 1st operation: *2 = 3*2 = 6 2nd operation: *2 = 6*2 = 12 3rd operation: -1 = 12-1 = 11 Input : m = 15, n = 20 Output : 6 1st operation: -1 '5' times = 15 + (-1*5) = 10 2nd operation: *2 = 10*2 = 20 Input : m = 0, n = 8 Output : -1 Using the given set of operations 'm' cannot be converted to 'n' Input : m = 12, n = 8 Output : 4
The idea is based on below facts.
1) If m is less than 0 and n is greater than 0, then not possible.
2) If m is greater than n, then we can reach n using subtractions only.
3) Else (m is less than n), we must do m*2 operations. Following two cases arise.
……a) If n is odd, we must do a -1 operation to reach it.
……b) If n is even, we must do a *2 operation to reach it.
int convert(m,n) if (m == n) return 0; // not possible if (m <= 0 && n > 0) return -1; // m is greater than n if (m > n) return m-n; // n is odd if (n % 2 == 1) // perform '-1' return 1 + convert(m, n+1); // n is even else // perform '*2' return 1 + convert(m, n/2);
Note: The list of operations so generated should be applied in reverse order.
m = 3, n = 11 convert(3,11) | --> n is odd: operation '-1' convert(3,12) | --> n is even: operation '*2' convert(3,6) | --> n is even: operation '*2' convert(3,3) | --> m == n return Therefore, the sequence of operations is '*2', '*2', '-1'.
Minimum number of operations : 3
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