Angle Relationships | Student Worksheet

The Big Idea

Angles have special relationships based on their positions. Understanding these relationships helps us find MISSING ANGLES without measuring!

Key relationships: Complementary (sum to 90), Supplementary (sum to 180), Vertical (equal), Adjacent (share vertex and side)

Four Types of Angle Relationships

Complementary Angles

Two angles that add up to 90 degrees

Think: C = Corner (90)

Supplementary Angles

Two angles that add up to 180 degrees

Think: S = Straight (180)

Vertical Angles

Opposite angles formed by intersecting lines. They are EQUAL

Think: Across from each other

Adjacent Angles

Angles that share a vertex AND a side

Think: Next-door neighbors

Example 1: Complementary and Supplementary Angles

Find the missing angle:

Complementary

35 + x = 90

x = 90 - 35

x = 55 degrees

Supplementary

125 + y = 180

y = 180 - 125

y = 55 degrees

Identify the relationship: Are the angles complementary (add to 90) or supplementary (add to 180)?

Write the equation: Angle 1 + Angle 2 = Total (either 90 or 180)

Solve for the unknown: Subtract the known angle from the total

Example 2: Vertical Angles

When two lines intersect, they form 4 angles:

Vertical angles (across from each other) are EQUAL!

Adjacent angles (next to each other) are SUPPLEMENTARY!

If angle a = 70 degrees, then:

The opposite angle a = 70 degrees (vertical angles are equal)

Angle b = 180 - 70 = 110 degrees (supplementary to a)

Example 3: Parallel Lines Cut by a Transversal

Special Angle Pairs (when lines are parallel):

Corresponding Angles

Same position at each intersection

EQUAL

Ex: 1 & 5, 2 & 6, 3 & 7, 4 & 8

Alternate Interior Angles

Between lines, opposite sides

EQUAL

Ex: 3 & 5, 4 & 6

Alternate Exterior Angles

Outside lines, opposite sides

EQUAL

Ex: 1 & 7, 2 & 8

Same-Side Interior Angles

Between lines, same side

SUPPLEMENTARY

Ex: 3 & 6, 4 & 5

TRAP ALERT: Memorize the Relationships!

WRONG: Guessing that all angle pairs formed by parallel lines are equal.

RIGHT: Most pairs are EQUAL (corresponding, alternate interior, alternate exterior), but SAME-SIDE INTERIOR angles are SUPPLEMENTARY (add to 180)!

Your Turn: Find Missing Angles

1. Two angles are complementary. One angle is 42 degrees. Find the other angle.

Equation: 42 + x =

Missing angle: degrees

2. Two angles are supplementary. One angle is 98 degrees. Find the other angle.

Equation: 98 + x =

Missing angle: degrees

3. Two lines intersect. One angle measures 75 degrees. Find all four angles.

Vertical angle (opposite): degrees

Adjacent angles: degrees and degrees

4. Parallel lines are cut by a transversal. If angle 1 = 65 degrees, find:

Corresponding angle (angle 5): degrees

Alternate interior angle (angle 4 to angle 6): angle 6 = degrees

Same-side interior angles: angle 3 + angle 6 = degrees

Remember!

Complementary angles add up to 90 degrees (think: Corner)
Supplementary angles add up to 180 degrees (think: Straight line)
Vertical angles are EQUAL (across from each other)
Adjacent angles share a vertex AND a side
When parallel lines are cut by a transversal: corresponding, alternate interior, and alternate exterior angles are EQUAL
Same-side interior angles are SUPPLEMENTARY