64 CHAPTER 3 TACTICS FOR SOLVING PROBLEMS
The small square obviously has half the area of the larger! -The simplest geometric symmetries are rotational and reflectional. Always check
to see if rotations or reflections will impose order on your problem. The next example
shows the power of imposing reflectional symmetry.
Example 3.1. 5 Your cabin is two miles due north of a stream that runs east-west. Your
grandmother's cabin is located 12 miles west and one mile north of your cabin. Every
day, you go from your cabin to Grandma's, but first visit the stream (to get fresh water
for Grandma). What is the length of the route with minimum distance?
Solution: First, draw a picture! Label your location by Y and Grandma's byG. Certainly, this problem can be done with calculus, but it is very ugly (you need
to differentiate the sum of two radicals, for starters). The problem appears to have no
symmetry in it, but the stream is practically begging you to reflect across it! Draw asample path (shown below as Y A followed by AG) and look at its reflection. We call
the reflections of your house and Grandma's house y' and G', respectively.
G
--------�-=�------��--------------Stream
G'
While you are carrying water to Grandma, your duplicate in an alternate universeis doing the same, only south of the stream. Notice that AG = AG' , so the length of
your path would be unchanged if you visited the reflected Grandma instead of the realone. Since the shortest distance between two points is the straight line Y BG', the op
timal path will be Y B followed by BG. Its length is the same as the length of Y BG',
which is just the hypotenuse of a right triangle with legs 5 and 12 miles. Hence our
answer is 13 miles. _When pondering a symmetrical situation, you should always focus briefly on the
"fixed" objects that are unchanged by the symmetries. For example, if something is
symmetric with respect to reflection about an axis, that axis is fixed and worthy of
study (the stream in the previous problem played that role). Here is another example,
a classic problem that exploits rotational symmetry along with a crucial fixed point.