Given a rectangle with width and height, fill it with n squares (n is integer, also given), such that the squares cover as much of the rectangle's area as possible. The size of a single square should be returned.
Ideas?
Given a rectangle with width and height, fill it with n squares (n is integer, also given), such that the squares cover as much of the rectangle's area as possible. The size of a single square should be returned. Ideas? 


Assuming that all the squares are aligned and they are the same size, you can find this by binary searching on the side length of the square:



I know that question was a long time ago, but here is what i though : you have n square you have a rectangle you want to know the size of the square to fill the rectangle for example :
In the end it would just be a function that return the result of this :



Here is my solution The idea is to go on a recursive loop Suppose u start with square_counter =0 While length and breath: // find the biggest possible square Count1 = length/breath // take the floor Square_counted += count1 New balance length = length  count1* breath Now square with Max size possible wrt breath Count2 = breath/length Square_count += count2 Breath = breath  count* length 


The squares do not necessarily have to be oriented the same as the larger rectangle. These sorts of problems are known as packing problems, and finding optimal solutions is notoriously hard. For an excellent treatment in the case when the larger shape into which the For example, Gödel was the first to publish on this subject. He found that a2+a+3+(a1)√2 squares can be packed in a square of side a+1+1/√2 by placing a diagonal strip of squares at a 45 degree angle. For example, And just for fun, I highly recommend you check out Erich's Packing Center. 

