Three angles have measures that add to 180°. They have the following angle measures: m∠ABC=(x−6)°, m∠CBD=(4x−14)°, and m∠DBE=5x°. What is the equation to solve for x?(1 point)
Responses
9x°−20°=180°
9 x minus 20 equals 180
10x°−20°=180°
10 x minus 20 equals 180
10x°+20°=180°
10 x plus 20 equals 180
x°−20°=180°
11 answers
x minus 20 equals 180
Two supplementary angles have the following measures: m∠ABC=135° and m∠CBD=9x°. What is the equation to solve for x?(1 point)
Responses
9x°−135°=180°
9 x minus 135 equals 180
9x°+135°=180°
9 x plus 135 equals 180
9x°=180°
9 x equals 180
9x°+135°=90°
Responses
9x°−135°=180°
9 x minus 135 equals 180
9x°+135°=180°
9 x plus 135 equals 180
9x°=180°
9 x equals 180
9x°+135°=90°
9x plus 135 equals 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
180°
180 degrees
75°
75 degrees
165°
?(1 point)
Responses
15°
15 degrees
180°
180 degrees
75°
75 degrees
165°
180 minus 15 is 165. m∠CBD is therefore equal to 165 degrees.
Two angles are supplementary and have measures m∠QRS=(x+40)° and m∠SRT=x°. What is the measure of ∠QRS?(1 point)
Responses
110°
110 degrees
70°
70 degrees
25°
25 degrees
180°
Responses
110°
110 degrees
70°
70 degrees
25°
25 degrees
180°
The measure of ∠QRS is equal to (x+40)°.
choose one of the answer choices
110°
Three angles measures add to 180°
and have the following measures: m∠ACB=(x+15)° , m∠BCD=(x+48)°, and m∠DCE=13°. What is the measure of ∠BCD?(1 point)
Responses
67°
67 degrees
100°
100 degrees
80°
80 degrees
52°
and have the following measures: m∠ACB=(x+15)° , m∠BCD=(x+48)°, and m∠DCE=13°. What is the measure of ∠BCD?(1 point)
Responses
67°
67 degrees
100°
100 degrees
80°
80 degrees
52°
The measure of ∠BCD is (x+48)°.