Station 1:
a.) Name 5 theorems to prove lines parallel:
b.) Name the 5 triangle congruence theorems
Station 2:
Prove BC=CO if ∆𝐴𝐵𝑂 is isosceles and A is the vertex.
A
C
B
O
Station 3:
Prove that if the base angles in a triangle are congruent, then the two legs of the triangle are
congruent as well.
B
A
D
C
Station 4: Given T is the center of the circle, <A and <1 are complementary, <B and <2 are
complementary, prove m<ACT=m<BZT=90.
A
1
T
2
C
Z
B
Station 5: Given R is the center, prove NP // TM
P
N
R
T
M
Station 6: If AC is a perpendicular bisector in
A
X
C
B
XAB, prove AX=AB.
Station 7: Given L is the midpoint of XT and LZ=LQ, prove that XZ=QT.
X
Z
L
Q
T
Station 8:
Given X is the center of the circle, prove m<PMX=m<XRZ.
M
P
X
R
Z
Station 9: Given center P and PX bisects <RPT, prove XT=RX.
X
T
R
P
Station 10
Prove if PL // ZK, and m<L=m<Z=110, prove LK // PZ.
L
P
K
Z