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Math 1312 Section 3. Analyzing Isosceles Triangles
Definitions: An isosceles triangle is a triangle having at least two congruent (of equal length) sides. The two sides are called the legs and the third side is called the base. The point at which the legs meet is the vertex and the angle there is the vertex angle. The two angles that include the base are called the base angles.
Example: Name the parts of this isosceles triangle:
Other important triangle parts:
Definitions:
� Median is a segment that starts from an angle and goes to the midpoint of the opposite side. � Altitude is a segment that starts from an angle and is perpendicular to the opposite side. � Angle bisector of a triangle is a segment that bisects an angle and goes to the opposite side. � Perpendicular bisector is a segment that passes through the midpoint of a side AND is perpendicular to that side.
VERTEX ANGLE
BASE
LEG LEG
BASE ANGLE BASE ANGLE
Example: Fill in the blanks.
a) DF is _______________ of ∆ DEC.
b) EH is _______________ of ∆ DEC.
______________________________________________________________________________
c) RV is ______________________ of ∆ RST.
d) WZ is _______________ of RS.
Theorem: Corresponding altitudes of congruent triangles are congruent.
D
E
H
F
C
R
T
Z
W
V
S
Note: � A triangle is equilateral if and only if it is equiangular. � Each angle of an equilateral triangle measures 60°.
Definition: The perimeter of a triangle is the sum of the lengths of all of its sides.
Example: In the figure below, PQ ≅ PR , and PS and ST are medians. Find QT and QR.
Example: (^) KL is an altitude of ∆ HJK. Find x.
(3x + 21)°
(9x – 27)°
K
H^ L J
S
T
R
P
Q
y + (^12)
y
10
Example: PO is the perpendicular bisector of MN. Find x.
Example: In ∆ JKL , JK ≅ JL , and JM is both a median, and altitude, and an angle bisector. Find the following.
a) m ∠ KMJ
b) KL
c) m ∠ KJM
d) m ∠ KJL
e) m ∠ K
M P^ N
O
5x + 1
2x + 5 15 – 3x
6
4 K (^56) ° M (^) L
J
Example: Use the figure below to find the angle measures if m∠1 = 30.
m∠2 = __________
m∠3 = __________
m∠4 = __________
m∠5 = __________
m∠6 = __________
m∠7 = __________
m∠8 = __________
4
3 5
1 2 6 7
8
