Problem:
In rectangle ABCD, we have A=(6,β22),B=(2006,178), and D=(8,y), for some integer y. What is the area of rectangle ABCD?
Answer Choices:
A. 4000
B. 4040
C. 4400
D. 40,000
E. 40,400
Solution:
The slope of line AB is (178β(β22))/(2006β6)=1/10. Since the line AD is perpendicular to the line AB, its slope is β10. This implies that
β10=8β6yβ(β22)β, so y=β10(2)β22=β42, and D=(8,β42).
As a consequence,
AB=20002+2002β=200101β and AD=22+202β=2101β
Thus
Area(ABCD)=ABβ
AD=400β
101=(E)40,400β
The problems on this page are the property of the MAA's American Mathematics Competitions