CF838A Binary Blocks

You are given an image, that can be represented with a $ 2 $ -d $ n $ by $ m $ grid of pixels. Each pixel of the image is either on or off, denoted by the characters "0" or "1", respectively. You would like to compress this image. You want to choose an integer $ k>1 $ and split the image into $ k $ by $ k $ blocks. If $ n $ and $ m $ are not divisible by $ k $ , the image is padded with only zeros on the right and bottom so that they are divisible by $ k $ . Each pixel in each individual block must have the same value. The given image may not be compressible in its current state. Find the minimum number of pixels you need to toggle (after padding) in order for the image to be compressible for some $ k $ . More specifically, the steps are to first choose $ k $ , then the image is padded with zeros, then, we can toggle the pixels so it is compressible for this $ k $ . The image must be compressible in that state.

The first line of input will contain two integers $ n,m $ ( $ 2

Print a single integer, the minimum number of pixels needed to toggle to make the image compressible.

We first choose $ k=2 $ . The image is padded as follows: `

001000

101100

110010

000000

`We can toggle the image to look as follows: `

001100

001100

000000

000000

`We can see that this image is compressible for $ k=2 $ .