Given three parallel lines Find$$ \alpha,\beta $$ α α α β β β 38 38 38 140

$$ \alpha=38 $$ $$ \beta=140 $$

$$ \alpha=142 $$ $$ \beta=140 $$

Lines a, b, and c are parallel. How big is angle $$ \alpha $$? a a a b b b c c c 140 50 α

It is not possible to calculate.

Since a,b,c are parallel Find a $$ \alpha $$ a a a b b b c c c 29 74 α

It is not possible to calculate

Calculate the value of the angles. $$ \alpha,\beta $$ A A A B B B C C C 25 α β

$$ \alpha=25 $$ $$ \beta=155 $$

$$ \alpha=155 $$ $$ \beta=25 $$

Lines a, b, and c are parallel. Calculate the angle marked (?). a a a c c c b b b 125 108 ?

It is not possible to calculate

Given a,b,c parallel lines Find a $$ \alpha $$ α α α 130 130 130 c c c a a a b b b 48

It is not possible to calculate

Given a,b,c parallels Find a $$ \alpha $$ a a a b b b c c c 115 α 78 53

It is not possible to calculate

Angles in Parallel Lines: Three parallel lines

Question 1

Given three parallel lines

Find $\alpha,\beta$

Question 2

Look at the diagram below.

Calculate the size of angle ABC.

Question 3

Look at the angles formed by parallel lines in the figure below:

What is the value of X?

Question 4

Lines a, b, and c are parallel.

How big is angle $\alpha$ ?

Question 5

a,b,c parallel to one another

Find a $\alpha$

Examples with solutions for Angles in Parallel Lines: Three parallel lines

Exercise #1

Given three parallel lines

Find $\alpha,\beta$

Video Solution

Step-by-Step Solution

We will mark the angle opposite the vertex of 38 with the number 1, therefore, angle 1 is equal to 38 degrees.

We will mark the angle adjacent to angle $\beta$ with the number 2. And since angle 2 corresponds to the angle 140, angle 2 will be equal to 140 degrees

Since we know that angle 1 is equal to 38 degrees we can calculate the angle $\alpha$ $\alpha=180-38=142$

Now we can calculate the angle $\beta$

180 is equal to angle 2 plus the other angle $\beta$

Since we are given the size of angle 2, we replace the equation and calculate:

$\beta=180-140=40$

Answer

$\alpha=142$ $\beta=40$

Exercise #2

Look at the diagram below.

Calculate the size of angle ABC.

Video Solution

Step-by-Step Solution

In the drawing before us, we can see three parallel lines and two lines that intersect them.

We are asked to find the size of angle ABC,

We can identify that the angle is actually composed of two angles, angle ABH and CBH.

In fact, we will calculate the size of each angle separately and combine them.

Angle A is an alternate angle to angle ABH, and since alternate angles are equal, angle ABH equals 92.

Angle CBH is supplementary to angle DCB, supplementary angles equal 180, therefore we can calculate:

$HBC = 180-DCB$

$HBC = 180 - 131$

$HBC = 49$

Now that we have found angles ABH and CBH, we can add them to find angle ABC

$ABH + CBH = ABC$

$92 + 49 = 141$

Answer

$141$

Exercise #3

Look at the angles formed by parallel lines in the figure below:

What is the value of X?

Video Solution

Step-by-Step Solution

Given that the three lines are parallel:

The 75 degree angle is an alternate angle with the one adjacent to angle X on the right side, and therefore is also equal to 75 degrees.

The 64 degree angle is an alternate angle with the one adjacent to angle X on the left side, and therefore is also equal to 64 degrees.

Now we can calculate:

$64+x+75=180$

$x=180-75-64=41$

Answer

41°

Exercise #4

Lines a, b, and c are parallel.

How big is angle $\alpha$ ?

Video Solution

Answer

Exercise #5

a,b,c parallel to one another

Find a $\alpha$

Video Solution

Answer

Question 1

Since a,b,c are parallel

Find a $\alpha$

Question 2

Since a,b,c are parallel

Find a $\alpha$

Question 3

Calculate the value of the angles. $\alpha,\beta$

Question 4

Angle ABC equals 135 degrees.

Angle A equals 95 degrees.

Calculate angle BCD.

Question 5

According to the figure, calculate the angle CDE

Exercise #6

Since a,b,c are parallel

Find a $\alpha$

Video Solution

Answer

Exercise #7

Since a,b,c are parallel

Find a $\alpha$

Video Solution

Answer

Exercise #8

Calculate the value of the angles. $\alpha,\beta$

Video Solution

Answer

$\alpha=155$ $\beta=155$

Exercise #9

Angle ABC equals 135 degrees.

Angle A equals 95 degrees.

Calculate angle BCD.

Video Solution

Answer

$40$

Exercise #10

According to the figure, calculate the angle CDE

Video Solution

Answer

$145$

Question 1

According to the figure, calculate the angle CEF

Question 2

Calculate the size of angle $\alpha$ according to the data in the diagram below:

Question 3

According to the figure, calculate the angle $\alpha$

Question 4

Angle BCE equals 198 degrees.

Calculate the angle CEF.

Answer

$152$

Exercise #14

Angle BCE equals 198 degrees.

Calculate the angle CEF.

Video Solution

Answer

$166$ degrees

Exercise #15

Calculate the value of the expression $\alpha+\beta$

Video Solution

Answer

$54$

Question 1

Lines a, b, and c are parallel.

Calculate the angle marked (?).

Question 2

Given a,b,c parallel lines

Find a $\alpha$

Question 3

Given a,b,c parallels

Find a $\alpha$

Question 4

c ,b ,a parallel.

Find a $\alpha$

Question 5

Three parallel lines are drawn forming the angles shown in the diagram below.

Answer

35°