Lesson 35: Complex Numbers in Geometry
Example 1
The median of a triangle is a line from one vertex of a
triangle to the midpoint of its opposite side. Each triangle
has three medians.
Use complex numbers to prove that the medians of a triangle
DUHVXUHWREHFRQFXUUHQWͼWKDWLVDUHVXUHWRSDVVWKURXJKD
FRPPRQSRLQWͽ$OVRVKRZWKDWWKHFRPPRQSRLQWRI
intersection is^13 DORQJHDFKPHGLDQͼ6HHFigure 35.1ͽ
Solution
&RQVLGHUDWULDQJOHABC with A, B, and C regarded as complex numbers. Then, the midpoints of its sides are
MNO BC 222 ,,.C A AB
Let P be the point^13 along the median MA. We have
PM MAM 33333233112121 JJJK AM M A ©¹ ̈ ̧§·BC AABC.
Let Q be the point^13 along the median NB. We have
QN NBN 33 33323311 212 1JJJK BN N B ©¹ ̈ ̧§·AC BABC.
Let R be the point^13 along the median OC. We have
RO OCO 33333233 11212 1JJJK CO O C ©¹ ̈ ̧§·AB CABC.
These are all the same point!
Study Tip
x This lesson is purely optional. There are no recommended study tips for this lesson other than to enjoy
the lesson and let the thinking about it strengthen your understanding of geometry as a whole.
Pitfall
x The mathematics in this lesson is visually overwhelming—but it is not conceptually overwhelming.
Just be steady in your resolve as you work your way through the algebra.A
O
B
M
C
N
Figure 35.1