The measures of the angles are
- Figure 1: <1 = 110 --- angle on a straight line
- Figure 1: <2 = 25 --- base angle of an isosceles triangle
- Figure <2: <1 = 55 -- angles in a triangle
- Figure <2: <2 = 65 -- angles in a triangle
- Figure <2: <3 = 30 -- -corresponding angles
- Figure <2: <4 = 120 --- external angle of a triangle
- Figure 3: <1 = 30 --- angles in a triangle
- Figure 3: <2 = 25 --- corresponding angles
<h3>How to determine the measures of the angles</h3>
<u>Figure 1</u>
The angle on a straight line is 180 degrees
So, we have
<1 + 70 = 180
Evaluate
<1 = 110 --- angle on a straight line
Also, we have
<2 + <2 + <1 = 180
This gives
2 * <2 + 110 = 180
So, we have
2 * <2 = 180 - 110
Evaluate
<2 = 25 --- base angle of an isosceles triangle
<u>Figure 2</u>
The angles in a triangle is 180 degrees
So, we have
<2 + 25 + 90 = 180
Evaluate
<2 = 65
The angles in a triangle line is 180 degrees
So, we have
<1 + <2 + 60 = 180
<1 + 65 + 60 = 180
This gives
<1 = 55
Corresponding angles are equal.
So, we have
<3 + 25 = <1
<3 + 25 = 55
Evaluate
<3 = 30
By the theorem of external angle of a triangle, we have
<4 = 90 + <3
<4 = 90 + 30
<4 = 120
<u>Figure 3</u>
By corresponding angles, we have
<2 = 75
The angle on a straight line is 180
So, we have
x = 180 - 75 - <2
x = 180 - 75 - 75
x = 30
By the sum of angles in a triangle, we have
<1 = 180 - 120 - x
<1 = 180 - 120 - 30
<1 = 30
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