54 CHAPTER 2 STRATEGIES FOR INVESTIGATING PROBLEMS
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Since both 3s + 7t and 5s + t are to be integers, (3s + 7t, 5s + t) is a lattice point. Con
sequently, counting the ordered pairs (s,t) with 0 < s, t < 1 such that both 3s+ 7t and
5s + t are integers is equivalent to counting the lattice points inside the parallelogram.
This is easy to do by hand; the answer is 31. •
This problem can be generalized nicely using Pick's Theorem (Problem 2.3.38 on
page 52). See Problem 2.4.22 below.
Pictures Don't Help? Recast the Problem in Other Ways!
The powerful idea of converting a problem from words to pictures is just one aspect of
the fundamental peripheral vision strategy. Open your mind to other ways of reinter
preting problems. One example that you have already encountered was Example 2.1. 7
on page 20, where what appeared to be a sequence of numbers was actually a sequence
of descriptions of numbers. Another example was the locker problem (Example 2.2.3
on page 29) in which a combinatorial question metamorphosed into a number theory
lemma. "Combinatorics � Number Theory" is one of the most popular and produc
tive such "crossovers," but there are many other possibilities. Some of the most spec
tacular advances in mathematics occur when someone discovers a new reformulation.
For example, Descartes' idea of recasting geometric questions in a numeric/algebraic
form led to the development of analytic geometry, which then led to calculus.
Our first example is a classic problem.
Example 2.4.2 Remove the two diagonally opposite comer squares of a chessboard.
Is it possible to tile this shape with thirty-one 2 x 1 "dominos"? (In other words, every
square is covered and no dominos overlap.)
Solution: At first, this seems like a geometric/combinatorial problem with many
cases and subcases. But it is really just a question about counting colors. The two
comers that were removed were both (without loss of generality) white, so the shape
we are interested in contains 32 black and 30 white squares. Yet any domino, once it