Given a number N. The task is to reduce the given number N to 1 in the minimum number of steps. You can perform any one of the below operations in each step.

• Operation 1: If the number is even then you can divide the number by 2.
• Operation 2: If the number is odd then you are allowed to perform either (n+1) or (n-1).

You need to print the minimum number of steps required to reduce the number N to 1 by performing the above operations.

Examples:  

Input : n = 15
Output : 5
 15 is odd 15+1=16    
 16 is even 16/2=8     
 8  is even 8/2=4 
 4  is even 4/2=2     
 2  is even 2/2=1     

Input : n = 7
Output : 4
    7->6    
    6->3 
    3->2    
    2->1

Method 1 – 
The idea is to recursively compute the minimum number of steps required.  

• If the number is even, then we are allowed to only divide the number by 2.
• But, when the number is Odd, we can either increment or decrement it by 1. So, we will use recursion for both n-1 and n+1 and return the one with the minimum number of operations.

Below is the implementation of the above approach:

5

The above-mentioned approach has a time complexity of O(2^n). It is possible to reduce this complexity to O(log n). 
Auxiliary Space: O(n), for recursive stack space.

Method 2 – (Efficient Solution)
It is clear with little observation that performing an increment of 1 or a decrement of 1 on an odd number can result in an even number, one of it divisible by 4. For an odd number, the only operation possible is either an increment of 1 or a decrement of 1, most certainly one operation will result in a number divisible by four, this is the optimal choice clearly. 

Algorithm : 
1. Initialize count = 0
2. While number is greater than one perform following steps - 
         Perform count++ for each iteration
         if num % 2 == 0, perform division
         else if num % 4 == 3, perform increment
         else perform decrement (as odd % 4 is either 1 or 3)
3. return count;

5

Time complexity : O(logN)
Auxiliary Space: O(1)