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The difference between 2 supplementary angles is 121.54. What are the angle measures?

User Darshanie
by
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2 Answers

10 votes
10 votes

Answer: 150.77 and 29.23

==============================================

Step-by-step explanation:

x = larger angle

y = smaller angle

x-y = difference of the angles = 121.54

x-y = 121.54 is one equation

x+y = 180 is the other equation since supplementary angles always add to 180 (they form a straight line).

We have this system we're working with


\begin{cases}x-y = 121.54\\x+y = 180\end{cases}

Add the equations straight down.

  • x+x = 2x
  • -y+y = 0y, the y terms go away
  • 121.54+180 = 301.54

We're left with this reduced equation

2x = 301.54

Divide both sides by 2 to isolate x

x = 301.54/2

x = 150.77

Use this to find the value of y

x-y = 121.54

150.77-y = 121.54

-y = 121.54-150.77

-y = -29.23

y = 29.23

Or we could say

x+y = 180

150.77+y = 180

y = 180-150.77

y = 29.23

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Summary:

x = 150.77 and y = 29.23 are the two angles.

I'll let you check the answers.

User FelixM
by
3.1k points
15 votes
15 votes

Answer:

150.77° and 29.23°

Step-by-step explanation:

Let:

  • x = the biggest supplementary angle
  • y = the smallest supplementary angle

The sum of the angles is 180*

The difference is 121.54°

The system of equations:


\left \{ {{x+y=180} \atop {x-y=121.54}} \right.

Solve:

  • Eliminate y by adding vertically

  • \begin{array}{ccc}x+y=180\\+(x-y=121.54)\end/
  • 2x + 0 = 301.54
  • 2x = 301.54
  • x = 150.77

Now we know what x is, we can plug it into the first equation to solve for y.

  • x + y = 180
  • 150.77 + y = 180
  • y = 29.23

-Chetan K

User Lanxion
by
3.0k points