Two supplementary angles have the following measures: m∠ABC=135° and m∠CBD=9x° . What is the equation to solve for x ?(1 point)

9x° + 135° = 180°

Use facts about supplementary angles to solve the following problem. Two angles are supplementary and have measures m∠ABC=15° and m∠CBD=x° . What is the value of m∠CBD
?(1 point)
Responses

15°
15 degrees

75°
75 degrees

180°
180 degrees

165°

m∠ABC + m∠CBD = 180°

15° + x° = 180°

x = 180° - 15°

x = 165°

Therefore, the measure of ∠CBD is 165°.

Two angles are supplementary and have measures m∠QRS=(x+40)° and m∠SRT=x° . What is the measure of ∠QRS ?(1 point)
Responses

180°
180 degrees

110°
110 degrees

70°
70 degrees

25°

Since two angles are supplementary, the sum of their measures is 180°.

Therefore, x + 40 + x = 180.
2x + 40 = 180.
2x = 180 - 40
2x = 140
x = 70

∠QRS = x + 40 = 70 + 40 = 110°

Therefore, the measure of ∠QRS is 110°.

∠ACB
and ∠BCD
are supplementary angles. The angles have the following measures: ∡ACB=(x+28)°
and ∡BCD=(x+48)°
. What is m∠BCD
?(1 point)
Responses

128°
128 degrees

52°
52 degrees

100°
100 degrees

80°

Since ∠ACB and ∠BCD are supplementary angles, their measures sum up to 180°.

Therefore, (x + 28) + (x + 48) = 180
2x + 76 = 180
2x = 180 - 76
2x = 104
x = 52

Therefore, the measure of ∠BCD is x + 48 = 52 + 48 = 100°.

So, the measure of ∠BCD is 100°.

Solve Equations with Supplementary Angles Quick Check
1:10x°−20°=180°
2:9x°+135°=180°
3:165°
4:110°
5:100°

To solve equations with supplementary angles, you apply the property that the sum of two supplementary angles is 180 degrees.

1. 10x° - 20° = 180°
Add 20° to both sides: 10x° = 200°
Divide by 10: x = 20°

2. 9x° + 135° = 180°
Subtract 135° from both sides: 9x° = 45°
Divide by 9: x = 5°

Therefore, the solutions are:
1: x = 20°
2: x = 5°

So, none of the options listed (3, 4, 5) are the solutions to the given equations.