You are given a string $$$s$$$ of length $$$n$$$ consisting of characters a and/or b.

Let $$$\operatorname{AB}(s)$$$ be the number of occurrences of string ab in $$$s$$$ as a substring. Analogically, $$$\operatorname{BA}(s)$$$ is the number of occurrences of ba in $$$s$$$ as a substring.

In one step, you can choose any index $$$i$$$ and replace $$$s_i$$$ with character a or b.

What is the minimum number of steps you need to make to achieve $$$\operatorname{AB}(s) = \operatorname{BA}(s)$$$?

Reminder:

The number of occurrences of string $$$d$$$ in $$$s$$$ as substring is the number of indices $$$i$$$ ($$$1 \le i \le |s| - |d| + 1$$$) such that substring $$$s_i s_{i + 1} \dots s_{i + |d| - 1}$$$ is equal to $$$d$$$. For example, $$$\operatorname{AB}($$$aabbbabaa$$$) = 2$$$ since there are two indices $$$i$$$: $$$i = 2$$$ where aabbbabaa and $$$i = 6$$$ where aabbbabaa.