Description: You are given a binary string $$$s$$$ (a binary string is a string consisting of characters 0 and/or 1). Let's call a binary string balanced if the number of subsequences 01 (the number of indices $$$i$$$ and $$$j$$$ such that $$$1 \le i < j \le n$$$, $$$s_i=0$$$ and $$$s_j=1$$$) equals to the number of subsequences 10 (the number of indices $$$k$$$ and $$$l$$$ such that $$$1 \le k < l \le n$$$, $$$s_k=1$$$ and $$$s_l=0$$$) in it. For example, the string 1000110 is balanced, because both the number of subsequences 01 and the number of subsequences 10 are equal to $$$6$$$. On the other hand, 11010 is not balanced, because the number of subsequences 01 is $$$1$$$, but the number of subsequences 10 is $$$5$$$. You can perform the following operation any number of times: choose two characters in $$$s$$$ and swap them. Your task is to calculate the minimum number of operations to make the string $$$s$$$ balanced. Input Format: The only line contains the string $$$s$$$ ($$$3 \le |s| \le 100$$$) consisting of characters 0 and/or 1. Additional constraint on the input: the string $$$s$$$ can be made balanced. Output Format: Print a single integer — the minimum number of swap operations to make the string $$$s$$$ balanced. Note: In the first example, the string is already balanced, the number of both 01 and 10 is equal to $$$1$$$. In the second example, the string is already balanced, the number of both 01 and 10 is equal to $$$6$$$. In the third example, one of the possible answers is the following one: 11010 $$$\rightarrow$$$ 01110. After that, the number of both 01 and 10 is equal to $$$3$$$. In the fourth example, one of the possible answers is the following one: 11001100 $$$\rightarrow$$$ 11001010 $$$\rightarrow$$$ 11000011. After that, the number of both 01 and 10 is equal to $$$8$$$.