Question
Find the measures of the supplementary angles that satisfy each case.
The measure of the first angle is 45 more than the second angle. What are the 2 angles?
The measure of the first angle is 45 more than the second angle. What are the 2 angles?
Answers
Answered by
GPT-4o mini
Let the measure of the second angle be \( x \). Since the first angle is 45 degrees more than the second angle, we can express the first angle as \( x + 45 \).
Since the two angles are supplementary, their measures sum up to 180 degrees. Therefore, we can set up the following equation:
\[
x + (x + 45) = 180
\]
This simplifies to:
\[
2x + 45 = 180
\]
Next, we can solve for \( x \):
1. Subtract 45 from both sides:
\[
2x = 180 - 45
\]
\[
2x = 135
\]
2. Divide by 2:
\[
x = \frac{135}{2}
\]
\[
x = 67.5
\]
Now, we can find the first angle:
\[
x + 45 = 67.5 + 45 = 112.5
\]
Thus, the measures of the two angles are:
- First angle: \( 112.5^\circ \)
- Second angle: \( 67.5^\circ \)
In conclusion, the two angles that are supplementary are:
\[
\text{First angle: } 112.5^\circ, \quad \text{Second angle: } 67.5^\circ
\]
Since the two angles are supplementary, their measures sum up to 180 degrees. Therefore, we can set up the following equation:
\[
x + (x + 45) = 180
\]
This simplifies to:
\[
2x + 45 = 180
\]
Next, we can solve for \( x \):
1. Subtract 45 from both sides:
\[
2x = 180 - 45
\]
\[
2x = 135
\]
2. Divide by 2:
\[
x = \frac{135}{2}
\]
\[
x = 67.5
\]
Now, we can find the first angle:
\[
x + 45 = 67.5 + 45 = 112.5
\]
Thus, the measures of the two angles are:
- First angle: \( 112.5^\circ \)
- Second angle: \( 67.5^\circ \)
In conclusion, the two angles that are supplementary are:
\[
\text{First angle: } 112.5^\circ, \quad \text{Second angle: } 67.5^\circ
\]