Packing problem

Packing problems are one area where mathematics meets puzzles (recreational mathematics). Many of these problems stem from real-life packing problems.

In a packing problem, you are given

• one or more (usually two-or three-dimensional) containers
• several 'goods', some or all of which must be packed into this container

Usually the packing must be without gaps or overlaps, but in some packing problems the overlapping (of goods with each other and/or with the boundary of the container) is allowed but should be minimised. Hence we can discern several categories of packing problems:

Categories of packing problems

• No gaps or overlaps allowed.
  • many polycube puzzles, polysquare puzzles, and tiling puzzles fit into this category
• Gaps allowed, but no overlaps. Usually the total area of gaps has to be minimised. See below for an example.
• Gaps and overlaps allowed. Here usually the total area of overlaps has to be minimised.

Examples of gaps-but-no-overlaps packing problems

Example 1

This is a classical one, its answer being surprising even for many mathematicians. The problem is to fit as many circles as possible of 1 cm diameter into a strip of dimensions 2 cm x n , where n = 1, 2, 3, ...

Obviously at least 2n circles can fit, but the solution is that if

n > 63,

at least one more circle can fit than the formula 2n suggests. In fact, for every added length of 64, an additional circle can fit.

Example 2

How many spheres (often oranges) of given diameter d can you pack into a box of size a x b x c? This is one of the hardest problems in this category.