There are $N$ sticks. $N$ is an integer greater than zero. I want to divide it among $M$ boys. $M$ is also a positive integer. Partitioning $N$ among $M$ is easy, but doing it as evenly as possible is difficult for me to think through. Can someone suggest an algorithm? Similar questions exist on this site, but I could not find an answer that solves this problem, though it is possible that I overlooked something.
The sticks are all homogeneous, the same in every respect. What I mean by "as evenly as possible" is that if there are 6 sticks and 3 boys, the division algorithm should output 2-2-2. If there are 5 sticks among 3 boys, it should output 1-2-2. The disparity between the minimum stick holder and maximum stick holder should be minimized. Ordering does not matter (e.g. 1-2-2 is the same as 2-1-2).