A figure displays two nonadjacent angles with measures (x+2)° and (2x−4)° . If the two angles are complementary, what is the written equation?

(x+2)° + (2x−4)° = 90°

A figure displays two adjacent complementary angles with measures (x+3)° and (4x−2)° . What is the equation of the angles measures?

(x+3)° + (__)° = __°

(x+3)° + (4x−2)° = 90°

Use the image to answer the question.

An illustration shows three rays A, D, and C emerging from a point labeled B, forming a right angle at B. The right angle is divided into two parts by ray B D. The angles face leftward. Angle A B C measures 90 degree, angle A B D measures 4 x degrees, and angle D B C measures left parenthesis 7 x minus 9 right parenthesis degrees.

What is the equation for determining the angle measures?

(__)° + 4x° =__ °

Angle ABD + 4x° = 90°

Two complementary angles have measures (4x)° and (2x)° . What is the value of x and the two angle measures?

x= __, (4x)°=__ °, and (2x)°=__ °

To find the value of x, we can set up an equation based on the fact that the two angles are complementary:

(4x)° + (2x)° = 90°

Combining like terms:

6x° = 90°

Dividing both sides by 6, we get:

x = 15

Substituting x back into the equations, we can find the angle measures:

(4x)° = (4 * 15)° = 60°
(2x)° = (2 * 15)° = 30°

Therefore, x = 15, (4x)° = 60°, and (2x)° = 30°.

In a figure, one complementary angle has a measure of 36° and the other has a measure of (x−3)° . What is the value of x and the value of the unknown angle measure?

x= __, unknown angle measure = __°

To find the value of x, we can set up an equation based on the fact that the two angles are complementary:

36° + (x - 3)° = 90°

Combining like terms:

x - 3 + 36 = 90

Simplifying:

x + 33 = 90

Subtracting 33 from both sides:

x = 57

Therefore, x = 57.

To find the value of the unknown angle measure, we can substitute x back into the equation:

Unknown angle measure = x - 3 = 57 - 3 = 54°

Therefore, x = 57 and the unknown angle measure is 54°.