6 CHAPTER 1 Advanced Euclidean Geometry
4 ABCand 4 A′BC′are similar.
Exercises
- Let 4 ABC and 4 A′B′C′ be given with ABĈ = A′̂B′C′ and
A′B′
AB
=
B′C′
BC
. Then 4 ABC∼4A′B′C′.
2. In the figure to the right,
AD=rAB, AE=sAC.
Show that
Area 4 ADE
Area 4 ABC
=rs.DB CEA- Let 4 ABC be a given triangle and letY, Z be the midpoints of
[AC],[AB], respectively. Show that (XY) is parallel with (AB).
(This simple result is sometimes called theMidpoint Theorem) - In 4 ABC, you are given that
AY
Y C
=
CX
XB
=
BX
ZA
=
1
x,
where x is a positive real number.
Assuming that the area of 4 ABC
is 1, compute the area of 4 XY Zas
a function ofx.Z
Y
X
C
B
A
- LetABCDbe a quadrilateral and letEFGHbe the quadrilateral
formed by connecting the midpoints of the sides ofABCD. Prove
thatEFGHis a parallelogram.