CQXYM found a rectangle $$$A$$$ of size $$$n \times m$$$. There are $$$n$$$ rows and $$$m$$$ columns of blocks. Each block of the rectangle is an obsidian block or empty. CQXYM can change an obsidian block to an empty block or an empty block to an obsidian block in one operation.

A rectangle $$$M$$$ size of $$$a \times b$$$ is called a portal if and only if it satisfies the following conditions:

• $$$a \geq 5,b \geq 4$$$.
• For all $$$1 < x < a$$$, blocks $$$M_{x,1}$$$ and $$$M_{x,b}$$$ are obsidian blocks.
• For all $$$1 < x < b$$$, blocks $$$M_{1,x}$$$ and $$$M_{a,x}$$$ are obsidian blocks.
• For all $$$1<x<a,1<y<b$$$, block $$$M_{x,y}$$$ is an empty block.
• $$$M_{1, 1}, M_{1, b}, M_{a, 1}, M_{a, b}$$$ can be any type.

Note that corners can be any type

CQXYM wants to know the minimum number of operations he needs to make at least one sub-rectangle a portal.