In order to test the hypothesis about the cats, the scientists must arrange the cats in the boxes in a specific way. Of course, they would like to test the hypothesis and publish a sensational article as quickly as possible, because they are too engrossed in the next hypothesis about the phone's battery charge.

Scientists have $$$n$$$ boxes in which cats may or may not sit. Let the current state of the boxes be denoted by the sequence $$$b_1, \dots, b_n$$$: $$$b_i = 1$$$ if there is a cat in box number $$$i$$$, and $$$b_i = 0$$$ otherwise.

Fortunately, the unlimited production of cats has already been established, so in one day, the scientists can perform one of the following operations:

• Take a new cat and place it in a box (for some $$$i$$$ such that $$$b_i = 0$$$, assign $$$b_i = 1$$$).
• Remove a cat from a box and send it into retirement (for some $$$i$$$ such that $$$b_i = 1$$$, assign $$$b_i = 0$$$).
• Move a cat from one box to another (for some $$$i, j$$$ such that $$$b_i = 1, b_j = 0$$$, assign $$$b_i = 0, b_j = 1$$$).

It has also been found that some boxes were immediately filled with cats. Therefore, the scientists know the initial position of the cats in the boxes $$$s_1, \dots, s_n$$$ and the desired position $$$f_1, \dots, f_n$$$.

Due to the large amount of paperwork, the scientists do not have time to solve this problem. Help them for the sake of science and indicate the minimum number of days required to test the hypothesis.