Solution: Minimum One Bit Operations to Make Integers Zero

Explore how to compute the minimum number of specific bit flip operations required to reduce any integer to zero. Understand the mathematical pattern for single and multiple set bits and apply an iterative approach using bitwise operations to solve the problem efficiently.

We'll cover the following...

Statement
Solution
- Time complexity
- Space complexity

Statement

You are given an integer n. Your goal is to reduce it to $0$ by repeatedly performing either of the following bit operations:

Flip the rightmost bit (bit at position $0$ ) of n.
Flip the bit at position $i$ (for $i > 0$ ) only if the bit at position $i - 1$ is $1$ and all bits from position $i - 2$ down to $0$ are set to $0$ .

Determine and return the minimum number of these operations required to reduce n to $0$ .

Constraints:

$0 \leq$ n $\leq 10^9$

Solution

First, we need to analyze how binary numbers can be manipulated using the two allowed operations:

Operation 1: Flip the rightmost (0th) bit at any time.