Make all the elements of array even with given operations

Given an array arr[] of positive integers, find the minimum number of operations required to make all the array elements even where:  

1. If there is an odd number, then, increment the element and the next adjacent element by 1.
2. Each increment costs one operation.

Note: If there is any number in arr[] which is odd after all operations, then, print -1.

Examples: 

Input: arr[] = {2, 3, 4, 5, 6} 
Output: 4 
Explanation: 
Add 1 to 3 (at 1st index) and add 1 to its adjacent element 4(2nd index). 
Now the array becomes {2, 4, 5, 5, 6}. 
Add 1 to 5 (at 2nd index) and add 1 to its adjacent element 5(3rd index). 
Now the array becomes {2, 4, 6, 6, 6}. 
The resultant array has all even numbers. 
The total number of operations for 4 increments is 4.

Input: arr[] = {5, 6} 
Output: -1 
Explanation: 
Adding 1 to 5(0th index), then we have to increment 1 to its adjacent element 6(1st index). 
Now the array becomes {6, 7}. 
And we have 1 odd number left after all possible increments. Therefore, we can’t make all array elements even.  

Approach: 
This problem can be solved using Greedy Approach. The following are the steps: 

1. Traverse the given array arr[].
2. If an odd element occurs, then increment that element by 1 to make it even and the next adjacent element by 1.
3. Repeat the above step for all the odd elements for the given array arr[].
4. If all the elements in arr[] are even, then print the number of operations.
5. Else print -1.

Below is the implementation of the above approach: 

4

Time Complexity: O(N) where N is the number of elements in the array.
Auxiliary Space: O(1)