Use the image to answer the question.

Since the two angles are complementary, their measures add up to 90 degrees.

Let x represent the measure of the second angle.

25 + 5x = 90

Subtract 25 from both sides:

5x = 65

Divide both sides by 5:

x = 13

So the value of x is 13.

The correct answer is: 13

What are the two angle measures of complementary angles expressed as 3x° and (2x−5)° ?(1 point)
Responses

21° and 69°
21 degrees and 69 degrees

30° and 60°
30 degrees and 60 degrees

19° and 71°
19 degrees and 71 degrees

33° and 57°
33 degrees and 57 degrees

To find the measure of the complementary angles, you need to set up an equation.

Let's assume that one angle is represented by 3x°, and the other angle is represented by (2x-5)°.

Since the angles are complementary, their measures add up to 90°.

So, the equation becomes: 3x + (2x-5) = 90.

Combine like terms: 5x - 5 = 90.

Add 5 to both sides: 5x = 95.

Divide both sides by 5: x = 19.

Now you substitute x = 19 back into the expressions for the angle measures:

3x = 3(19) = 57°.

2x - 5 = 2(19) - 5 = 38 - 5 = 33°.

Therefore, the two angle measures of the complementary angles are 57° and 33°.

The correct answer is: 57° and 33°.

USE THE DANG ANSWER I USE NOT THAT HARD

Apologies for the confusion. Based on the initial question, the two angle measures of the complementary angles are 3x° and (2x-5)°.

Substitute x = 19 into the expressions:

3x = 3(19) = 57°.

2x - 5 = 2(19) - 5 = 38 - 5 = 33°.

Therefore, the two angle measures of the complementary angles are 57° and 33°.

The correct answer is: 57° and 33°.