I don't think you got it right.
First, starts with non-overlapping blocks, how many blocks do you have if divide M columns into blocks of size P: M/P blocks (assuming that image size is a multiple of block size). Niow, if you slide these blocks by one column and ignoring edge effects, you get another M/P blocks. How many times can you slide these blocks before you've shifted by the full width of a block: P-1 times. Therefore, for an offest of 1, you'll have: 
blocks (the P-1 shifted blocks plus the orginal unshifted blocks.
blocks (the P-1 shifted blocks plus the orginal unshifted blocks.Now, if you change the shift, and assuming it's a divisor of of the block size, you'll have in total P/S (S: shift) shifts before you've shifted by the full with, so you'll have in total: 
blocks.
blocks.Now all the above assumes that you allow the last block to shift partially out of the image. If not, you'll obviously have the last P-1 blocks you need to remove, so indeed, you'll end up with 
blocks. But for the case where S > 1, you'll need to remove the last 
blocks, so the number of blocks is 
.
blocks. But for the case where S > 1, you'll need to remove the last blocks, so the number of blocks is .Obviously, the same applies to the rows.
