Sum and Difference of Angles: Using parallel lines

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Question 1

The angles below are between parallel lines.

XXX535353949494

What is the value of X?

Question 2

110110110105105105XXX

What is the value of X given the angles between parallel lines shown above?

Question 3

CE is parallel to AD.

Determine the value of X given that ABC is isosceles and AB = BC?

DDDEEEBBBAAACCC2XX-103X-30

Examples with solutions for Sum and Difference of Angles: Using parallel lines

Exercise #1

The angles below are between parallel lines.

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What is the value of X?

Video Solution

Step-by-Step Solution

Our initial objective is to find the angle adjacent to the 94 angle.

Bearing in mind that adjacent angles are equal to 180, we can calculate the following:

18094=86 180-94=86
Let's now observe the triangle.

Considering that the sum of the angles in a triangle is 180, we can determine the following:

180=x+53+86 180=x+53+86

180=x+139 180=x+139

180139=x 180-139=x

x=41 x=41

Answer

41°

Exercise #2

110110110105105105XXX

What is the value of X given the angles between parallel lines shown above?

Video Solution

Step-by-Step Solution

Due to the fact that the lines are parallel, we will begin by drawing a further imaginary parallel line that crosses the 110 angle.

The angle adjacent to the angle 105 is equal to 75 (a straight angle is equal to 180 degrees) This angle is alternate with the angle that was divided using the imaginary line, therefore it is also equal to 75.

In the picture we are shown that the whole angle is equal to 110. Considering that we found only a part of it, we will indicate the second part of the angle as X since it alternates and is equal to the existing X angle.

Therefore we can say that:

75+x=100 75+x=100

x=11075=35 x=110-75=35

Answer

35°

Exercise #3

CE is parallel to AD.

Determine the value of X given that ABC is isosceles and AB = BC?

DDDEEEBBBAAACCC2XX-103X-30

Video Solution

Step-by-Step Solution

Given that CE is parallel to AD, and AB equals CB

Observe angle C and notice that the alternate angles are equal to 2X

Observe angle A and notice that the alternate angles are equal to X-10

Proceed to mark this on the drawing as follows:

2X2X2XX-10X-10X-10DDDEEEBBBAAACCC2XX-103X-30Notice that angle ACE which equals 2X is supplementary to angle DAC

Supplementary angles between parallel lines equal 180 degrees.

Therefore:

2x+DAC=180 2x+DAC=180

Let's move 2X to one side whilst maintaining the sign:

DAC=1802x DAC=180-2x

We can now create an equation in order to determine the value of angle CAB:

CAB=1802x(x10) CAB=180-2x-(x-10)

CAB=1802xx+10 CAB=180-2x-x+10

CAB=1903x CAB=190-3x

Observe triangle CAB. We can calculate angle ACB according to the law that the sum of angles in a triangle equals 180 degrees:

ACB=180(3x30)(1903x) ACB=180-(3x-30)-(190-3x)

ACB=1803x+30190+3x ACB=180-3x+30-190+3x

Let's simplify 3X:

ACB=180+30190 ACB=180+30-190

ACB=210190 ACB=210-190

ACB=20 ACB=20

Proceed to write the values that we calculated on the drawing:

202020190-3X190-3X190-3XDDDEEEBBBAAACCC2XX-103X-30Note that from the given information we know that triangle ABC is isosceles, meaning AB equals BC

Therefore the base angles are also equal, meaning:

1903x=20 190-3x=20

Let's move terms accordingly whilst maintaining the sign:

19020=3x 190-20=3x

170=3x 170=3x

Divide both sides by 3:

1703=3x3 \frac{170}{3}=\frac{3x}{3}

x=56.67 x=56.67

Answer

56.67