Chapter 4
Equilateral Triangle
A triangle with three congruent sides.
transversal
Alternate Interior Angles Theorem: If two parallel lines are cut by a ___, then the alternate interior angles are congruent.
CPCTC
An abbreviation for "Corresponding Parts of Congruent Triangles are Congruent," which can be used as a justification in a proof after two triangles are proven congruent.
Sometimes
An acute triangle is (A, S, or N) an equiangular triangle.
Exterior Angle of Triangle
An angle that forms a linear pair with an interior angle of the triangle.
Right Angle
An angle with measure of 90 degrees.
Always
An equiangular triangle is (A, S, or N) an acute triangle.
Always
An equilateral triangle is (A, S, or N) an equiangular triangle.
Sometimes
An obtuse triangle is (A, S, or N) a scalene triangle.
Never
An obtuse triangle is (A, S, or N) an equilateral triangle.
AAS
Are the triangles congruent? If yes, why?
ASA
Are the triangles congruent? If yes, why?
HL
Are the triangles congruent? If yes, why?
SAS
Are the triangles congruent? If yes, why?
SSS
Are the triangles congruent? If yes, why?
NO
Can you use AAA to prove congruent triangles?
NO
Can you use ASS to prove congruent triangles?
NO
Can you use SSA to prove congruent triangles?
Isosceles
Classify the triangle by side lengths.
90
Definition of Perpendicular: Perpendicular lines form ___ degree angles.
right
Definitional of Right Triangle: Right Triangles have ___ angles.
c + 34 + 120 = 180 c + 154 = 180 c = 26 26 degrees
Find the measure of angle C.
y + 42 + 42 = 180 y + 84 = 180 y = 96
Find the measure of angle Y.
x = 66 y = 180 - 66 - 66 y = 48
Find x and y.
3x = 60 x = 20 4y = 60 y = 15 5z = 60 z = 12
Find x, y and z.
(4x + 2) + (2x - 9) = 5x + 13 6x - 7 = 5x + 13 x - 7 = 13 x = 20
Find x.
25 + (x + 15) = 3x - 10 x + 40 = 3x - 10 40 = 2x - 10 50 = 2x 25 = x or x = 25
Find x.
2x + 3x = 100 5x = 100 x = 20
Find x.
4x = 60 x = 15
Find x.
5y - 6 = 4y + 12 y - 6 = 12 y = 18
Find y.
Converse
Formed by switching conclusion and hypothesis of conditional.
2
How many base angles does an isosceles triangle have?
3
How many interior angles does a triangle have?
1
How many vertex angles does an isosceles triangle have?
X
If Triangle ABC is congruent to Triangle WXY, then Angle B is congruent to Angle ___.
WY
If Triangle ABC is congruent to Triangle WXY, then Segment AC is congruent to Segment ___.
equiangular
If each interior angle of a triangle has a measure of 60 degrees, then the triangle is ___.
1 and 2
If segment AB is parallel to segment CD, then these two angles are congruent.
3 and 4
If segment AD is parallel to segment BC, then these two angles are congruent.
alternate
If two parallel lines are cut by a transversal, then the ___ interior angles are congruent.
opposite
Isosceles Triangle Theorem: If two sides of a triangle are congruent, then the angles ___ those sides are congruent.
Angle X
Name the angle included by segments XY and XZ.
Angle Z
Name the angle included by segments XZ and YZ.
Angle Y
Name the angle included by segments YZ and XY.
HL, ASA, SAS, AAS, and SSS
Name the five postulates and theorems you can use to prove congruent triangles.
segment AB
Name the side included by angles A and B.
Segment AC
Name the side included by angles A and C.
Segment BC
Name the side included by angles B and C.
Leg
One of the two congruent sides of an isosceles triangle.
Reflexive Property
Reason an angle or segment is congruent to itself.
congruent
Right Angle Congruence Thm: Right angles are ____.
90
The acute angle measures of a right triangle have a sum of ___ degrees.
Vertex Angle
The angle formed by the legs of an isosceles triangle.
Included Angle
The angle formed by two adjacent sides of a triangle.
obtuse and scalene
The interior angle measures of a triangle are 16, 100, and 64 degrees. The triangle is ___ and ___.
180
The interior angle sum of a triangle is ___ degrees.
smaller angle: x larger angle: 4x x + 4x = 90 x = 18 18 degrees
The measure of one acute angle in a right triangle is 4 times the measure of the other acute angle. What is the measure of the smaller angle?
smaller angle: x larger angle: 5x x + 5x = 90 x = 15 15 degrees
The measure of one acute angle in a right triangle is 5 times the measure of the other acute angle. What is the measure of the smaller angle?
smaller angle: x larger angle: 8x x + 8x = 90 x = 10 10 degrees
The measure of one acute angle in a right triangle is 8 times the measure of the other acute angle. What is the measure of the smaller angle?
Multiplier = 180 / (1 + 2 + 3) = 180 / 6 = 30 Smallest Angle = 1(30) = 30 degrees Largest Angle = 3(30) = 90 degrees
The ratio of the measures of three angles of a triangle is 1:2:3. Find the measures of the smallest and largest angles.
AAS
Why are Triangles PRS and QRS congruent?
Corresponding Angles Postulate
_____ _____ Postulate: If two parallel lines are cut by a transversal, then the pairs of corresponding angles are congruent.
Equiangular Triangle
A triangle with three congruent angles.
Midpoint
A point that divides a segment into two congruent segments
Corollary
A theorem whose proof follows directly from another theorem.
Isosceles Triangle
A triangle with at least two congruent sides.
Scalene Triangle
A triangle with no congruent sides.
Obtuse Triangle
A triangle with one obtuse angle.
Right Triangle
A triangle with one right angle.
Acute Triangle
A triangle with three acute angles.
Multiplier = 180 / (1 + 4 + 7) = 180 / 12 = 15 Smallest Angle = 1(15) = 15 degrees Largest Angle = 7(15) = 105 degrees
The ratio of the measures of three angles of a triangle is 1:4:7. Find the measures of the smallest and largest angles.
Multiplier = 180 / (2 + 3 + 4) = 180 / 9 = 20 Smallest Angle = 2(20) = 40 degrees Largest Angle = 4(20) = 80 degrees
The ratio of the measures of three angles of a triangle is 2:3:4. Find the measures of the smallest and largest angles.
Base
The side opposite of the vertex angle.
x = 7 (Set any two sides equal to each other>)
The triangle is equilateral. Find x.
Base Angles
The two angles that have the base as the side.
Remote Interior Angle
The two nonadjacent interior angles corresponding to each exterior angle of a triangle.
2x + (5x + 3) + (5x + 3) = 180 12x + 6 = 180 12x = 174 x = 14.5
The vertex angle of an isosceles triangle measures (2x) degrees, and one of the base angles measures (5x + 3) degrees. Find x.
2x + 50 + 50 = 180 2x + 100 = 180 2x = 80 x = 40
The vertex angle of an isosceles triangle measures (2x) degrees, and one of the base angles measures 50 degrees. Find x.
5x + 5x + 40 = 180 x = 14
The vertex angle of an isosceles triangle measures 40 degrees, and one of the base angles measures (5x) degrees. Find x.
Bisect
To divide into two congruent parts.
True
True or False. Every equilateral triangle is also isosceles.
False
True or False. Every isosceles triangle is also equilateral.
Congruent Triangles
Two triangles whose corresponding sides and angles are congruent.
congruent
Vertical Angles Theorem: Vertical angles are ___.
