Parallel Lines, and Pairs of Angles
Parallel lines.
Lines are parallel if they are always the same distance apart (called "equidistant"), and will never meet. Just remember:
Always the same distance apart and never touching .
The red line is parallel to the blue line in each of these examples:
Parallel lines also point in the same direction.
Try it yourself:
Pairs of angles.
When parallel lines get crossed by another line (which is called a Transversal ), you can see that many angles are the same, as in this example:
These angles can be made into pairs of angles which have special names.
Click on each name to see it highlighted:
Now play with it here. Try dragging the points, and choosing different angle types. You can also turn "Parallel" off or on:
Testing for Parallel Lines
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Angles In Parallel Lines
Here we will learn about angles in parallel lines including how to recognise angles in parallel lines, use angle facts to find missing angles in parallel lines, and apply angles in parallel lines facts to solve algebraic problems.
There are also angles in parallel lines worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.
What are angles in parallel lines?
Angles in parallel lines are angles that are created when two parallel lines are intersected by another line called a transversal .
We can use the information given in the diagram to find any angle around the intersecting transversal.
To do this, we use three facts about angles in parallel lines:
Alternate angles , co-Interior angles, and corresponding angles.
Properties of parallel lines
- Alternate angles are equal :
Sometimes called ‘Z angles’.
- Corresponding angles are equal :
Sometimes called ‘F angles’
- Co-interior angles add up to 180^o :
Sometimes called ‘C angles’.
Key angle facts
To explore angles in parallel lines we will need to use some key angle facts.
Angles in parallel lines
We know that vertically opposite angles are equal and we can show this around a point within our parallel lines:
If we extend the transversal line so that it crosses more parallel lines, the angles that are made are maintained throughout the diagram for any line that is parallel to the original line AB .
Top Tip : for the same intersecting transversal, all the acute angles are the same size , and all the obtuse angles are the same size .
We group these angles into three separate types called alternate angles , co-interior angles and corresponding angles .
Alternate angles
Alternate angles are angles that occur on opposite sides of the transversal line and have the same size .
Each pair of alternate angles around the transversal are equal to each other. The two angles can either be alternate interior angles or alternate exterior angles.
Other examples of alternate angles:
We can often spot interior alternate angles by drawing a Z shape:
Step-by-step guide: Alternate angles
Corresponding angles
The pairs of angles formed on the same side of the transversal that are either both obtuse or both acute and are called corresponding angles and are equal in size.
Each pair of corresponding angles on the same side of the intersecting transversal are equal to each other.
Other examples of corresponding angles:
We can often spot interior corresponding angles by drawing an F shape:
Step-by-step guide: Corresponding angles
Co-Interior angles
Co-interior angles on the same side of an intersecting transversal add to 180^o .
Other examples of co-interior angles:
We can often spot interior co-interior angles by drawing a C shape.
Step-by-step guide: Co-interior angles
How to find a missing angle in parallel lines
In order to find a missing angle in parallel lines:
1 Highlight the angle(s) that you already know.
2 State the alternate angle, co-interior angle or corresponding angle fact to find a missing angle in the diagram.
3 Use basic angle facts to calculate the missing angle.
Steps 2 and 3 may be done in either order and may need to be repeated. Step 3 may not always be required.
Angles in parallel lines worksheet
Get your free angles in parallel lines worksheet of 20+ questions and answers. Includes reasoning and applied questions.
Angles in parallel lines examples
For each stage of the calculation we must clearly state any angle facts that we use.
Example 1: alternate angles
Calculate the size of the missing angle \theta . Justify your answer.
Highlight the angle(s) that you already know .
Here we can label the alternate angle on the diagram as 50^o .
3 Use a basic angle fact to calculate the missing angle.
Here as \theta is on a straight line with 50^o ,
\theta =180^o-50^o
\theta =130^o
Example 2: co-Interior angles
Highlight the angle(s) that you already kno w.
State the alternate angle, co-interior angle or corresponding angle fact to find a missing angle in the diagram.
Here we can label the co-interior angle on the diagram as 60^o as 120+60= 180^o .
Use a basic angle fact to calculate the missing angle.
We can see that as \theta is vertically opposite to 60^o ,
\theta =60^o .
Example 3: corresponding angles
Here we can label the corresponding angle on the diagram as 75^o .
Here as \theta is on a straight line with 75^o ,
\theta =180-75
\theta =105^o .
Example 4: multiple-steps
Calculate the size of the missing angle \theta . Show all your working.
Opposite angles are equal so we can label the angle 110^o .
Co-interior angles add up to 180^o . Here 180-110=70^o .
θ is corresponding to 70+35 so θ = 70+35 = 105^o .
Example 5: similar triangles
Show that the two triangles are similar.
Use a basic angle fact to calculate a missing angle.
Here, we can see that the two angles highlighted in green are on a straight line and so their sum is 180^o . This gives us the missing angle of 70^o .
We can also see there is a vertically opposite angle at the centre of the diagram. This is also 90^o .
The smaller triangle now has a missing angle of 20^o as angles in a triangle add to equal 180^o .
By stating the alternate angles from 70^o and 20^o we can see that θ=20^o and the other angle in the triangle is 70^o . The two triangles contain the same angles and are therefore similar.
Example 6: angles in parallel lines including algebra
Given that the sum of angles on a straight line is equal to 180^o , calculate the value of x . Hence or otherwise, calculate the size of angle 4x+30 .
Here we can state that 20^o is corresponding to the original angle.
As the sum of angles on a straight line is 180^o , we have:.
4x+30+20=180^o
Now that x=32.5^o,
4x+30=4(32.5)+30
Common misconceptions
- Mixing up angle facts
There are a lot of angle facts and it is easy to mistake alternate angles with corresponding angles. To prevent this from occurring, think about the alternate angles being on the alternate sides of the line.
- Using a protractor to measure an angle.
Most diagrams are not to scale and so using a protractor will not result in a correct answer unless it is a coincidence.
Practice angles in parallel lines questions
1. Calculate the size of angle \theta
Using corresponding angles, we can see the angle 42^{\circ}:
We can then use angles on a straight line:
\theta=180-42= 138^{\circ}
2. Calculate the size of angle \theta
Using co-interior angles, we can calculate:
180-62=118^{\circ}
Then we can label the corresponding angle
118^{\circ}:
Since opposite angles are equal,
\theta=118^{\circ}
3. Calculate the angle \theta
Using opposite angles, we can see the angle 21^{\circ}.
Next we can label the alternate angle 21^{\circ}:
We can then use the fact that it is an isosceles triangle and so two base angles are equal:
\theta=\frac{180-21}{2}=79.5^{\circ}
4. Calculate the size of angle \theta
Using angles on a straight line, we can calculate:
180-(90+67)=23^{\circ}
We can then use alternate angles to see that
\theta=23^{\circ}
5. Calculate the size of angle \theta
Using angles on a straight line we can calculate the angles 92^{\circ} and 59^{\circ}:
Then the other angle in the triangle is:
180-(92+59)=29^{\circ}.
Using angles on a straight line we can calculate:
180-29=151^{\circ}.
Finally, using corresponding angles, we can see that:
\theta=151^{\circ}.
6. By calculating the value of x , find the value of \theta
30x-25 and 20x+5 are alternate angles. Therefore, we can write:
30x-25=20x+5.
We can then solve this to find x :
\begin{aligned} 30x-25&=20x+5\\ 10x-25&=5\\ 10x&=30\\ x&=3 \end{aligned}
Given that x=3 ,
30 \times 3-25=65
Using opposite angles, we can see that the angle inside the triangle is 65^{\circ}:
Using angles in a triangle, we can calculate the third angle in the triangle:
180-(65+30)=85^{\circ}.
Then using opposite angles,
\theta=85^{\circ}
Angles in parallel lines GCSE questions
1. (a) Below is a diagram showing two parallel lines intersected by a transversal:
Write an equation connecting r and s .
(b) Given that the ratio of the angles r : s is equivalent to 3 : 5 , write another equation connecting r and s.
(a) r + s = 180
(b) 5r = 3s
2. Lines AB and CD are parallel.
(a) By finding the value of x , calculate the exact value of z^{\circ} .
(b) Calculate the value of y^{\circ}.
5x – 10 = 4x – 2
x = 8^{\circ}
4 × 8 − 2 = z = 30^{\circ}
y = 180 – 30 = 150^{\circ}
Learning checklist
You have now learned how to:
- apply the properties of angles at a point, angles at a point on a straight line, vertically opposite angles
- understand and use the relationship between parallel lines and alternate and corresponding angles
The next lessons are
- Angles in polygons
- How to calculate volume
Still stuck?
Prepare your KS4 students for maths GCSEs success with Third Space Learning. Weekly online one to one GCSE maths revision lessons delivered by expert maths tutors.
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Geometry (all content)
Course: geometry (all content) > unit 2.
- Intro to angles (old)
- Angles (part 2)
- Angles (part 3)
Angles formed between transversals and parallel lines
- Angles of parallel lines 2
- The angle game
- The angle game (part 2)
- Acute, right, & obtuse angles
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Video transcript
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Name all corresponding angles. 4 z g G and. an" Name all alternate interior angles. 4.3 ... b. £2 and Zl I d. Z8 and a.Å+cvnaAc a. Z4 and Z7 c. £6 and Z 16 e. and z15 g. Z9 and Z 14 ... Cons Zl and Z3 £6 and Zl £8 and Z 14 Gina Wilson (All Things Algebras, LLC). 2014-2019 . Title: Unit 3 - Parallel & Perpendicular Lines Homework KEY.pdf ...
Auxiliary lines. to find unknown angle measures . Parallel Lines and Angle Pairs . When two parallel lines are cut by a transversal, the following pairs of angles are congruent. • corresponding angles • alternate interior angles • alternate exterior angles. Also, consecutive interior angles are supplementary. Example: In the figure, m∠2 ...
T 2/28 4 Parallel Lines Angle Relationships and Measures Lesson 4 - Page 17 F 3/1 5 Parallel Lines Finding an Angle Algebraically Lesson 5 - Page 22 - 23 ... Unit 10 - Lesson 2 Homework - Think 4. The I∠ is complementary to the I∠ . The I∠ is complementary to the I∠ . If I∠ =62°, what is
Chapter 3 11 Glencoe Geometry 3-2 Study Guide and Intervention Angles and Parallel Lines Parallel Lines and Angle Pairs When two parallel lines are cut by a transversal, the following pairs of angles are congruent. • corresponding angles • alternate interior angles • alternate exterior angles Also, consecutive interior angles are ...
Ana made a zip line for her tree house. To do this, she attached a pulley to a cable. She then strung the cable at an angle between the tree house and another tree. She made the drawing of the zip line at the right. e two trees are parallel. a.
Geometry 3.2 Angles and Parallel Lines. Get a hint. Theorem 3.1 Alternate Interior Theorem. Click the card to flip 👆. If two parallel lines are cut by a transversal, then each pair of alternate interior angles is congruent. Example: /_1 is congruent to /_3 and /_2 is congruent to /_4. Click the card to flip 👆.
3.1 Lines and Angles 3.2 Properties of Parallel Lines 3.3 Proving Lines Parallel 3.4 Parallel Lines and Triangles 3.5 Equations of Lines in the Coordinate Plane 3.6 Slopes of Parallel and Perpendicular Lines Unit 3 Review
These lines are parallel, because a pair of Corresponding Angles are equal. These lines are not parallel, because a pair of Consecutive Interior Angles do not add up to 180° (81° + 101° =182°) These lines are parallel, because a pair of Alternate Interior Angles are equal. Mathopolis: Q1 Q2 Q3 Q4 Q5 Q6 Q7 Q8 Q9 Q10.
The angles lie on the same side of the transversal in "corresponding" positions. When the lines are parallel, the measures are equal. ∠1 and ∠2 are corresponding angles. ∠3 and ∠4 are corresponding angles. ∠5 and ∠6 are corresponding angles. ∠7 and ∠8 are corresponding angles.
Angle relationships with parallel lines Get 5 of 7 questions to level up! Equation practice with angles Get 3 of 4 questions to level up! Proving lines parallel. Learn. Geometric constructions: parallel line (Opens a modal) Practice. Line and angle proofs Get 3 of 4 questions to level up!
3.2 Angles and Parallel Lines. Do 3.2_homework_day_2 -----> (day1 can be practice...answers provided) 3.2_homework day1.pdf: File Size: 344 kb: File Type: pdf: Download File. 3.2_homework_day_2.pdf: File Size: 136 kb: File Type: pdf: Download File ...
Two parallel lines cut by a transversal, Alternate interior angles are congruent. Same Side Interior Angles Theorem. Two parallel lines cut by a transversal, same side interior angles are supplementary. Study with Quizlet and memorize flashcards containing terms like Perpendicular Lines, Parallel Lines, Parallel Planes and more.
Proving Lines Parallel 134 Chapter 3 Parallel and Perpendicular Lines page 30 and Lesson 2-1 Algebra Solve each equation. 1. 2x +5 =27 11 2. 8a-12 =20 4 3. x-30 +4x +80 =180 26 4. 9x-7 =3x +29 6 Write the converse of each conditional statement. Determine the truth value of the converse. 5-6. See back of book. 5. If a triangle is a right ...
Unit 3 - Parallel & Perpendicular Lines : Sample Unit Outline TOPIC HOMEWORK DAY 1 Parallel Lines, Transversals, Angle Pairs HW #1 DAY 2 Parallel Lines Cut by a Transversal HW #2 DAY 3 Parallel Lines Cut by a Transversal (with Algebra) DAY 4 Quiz 3-1 None DAY 5 Proving Lines are Parallel (Converses) C) HW #3 DAY 6 Parallel Line Proofs HW #4
In a plane, if two lines are perpendicular to the same line, then they are parallel to each other. m = (y₂- y₁) / (x₂- x₁) y = mx + b. y-y₁=m (x-x₁) Ax+By=C. Unit 3 - Parallel and Perpendicular Lines Lesson 1: Vocabulary - Topic 1: Definitions - Topic 2: Angles and Transversals Lesson 2: Parallel Lines and Trans….
Show step. Co-interior angles add up to 180^o 180o. Here 180-110=70^o 180 − 110 = 70o. State the alternate angle, co-interior angle or corresponding angle fact to find a missing angle in the diagram. Show step. θ θ is corresponding to 70+35 70 + 35 so θ = 70+35 = 105^o θ = 70 + 35 = 105o.
Worksheet - Section 3-2 Angles and Parallel Lines Objectives: • Understand the parallel lines cut by a transversal theorem and it's converse • Find angle measures using the Theorem • Use algebra to find unknown variable and angle measures involve parallel lines and transversals • Use Auxiliary lines to find unknown angle measures Parallel Lines and Angle Pairs When two parallel ...
Microsoft Teams. Below are two parallel lines with a third line intersecting them. 81 ∘ x ∘. x = ∘. Learn for free about math, art, computer programming, economics, physics, chemistry, biology, medicine, finance, history, and more. Khan Academy is a nonprofit with the mission of providing a free, world-class education for anyone, anywhere.
2. all segments that intersect QU −−− 3. all segments that are parallel to XY −− 4. all segments that are skew to VW −−− Classify the relationship between each pair of angles as alternate interior, alternate exterior, corresponding, or consecutive interior angles. 5. ∠2 and ∠10 6. ∠7 and ∠13 7. ∠9 and ∠13 8. ∠6 and ...
Alternate interior angles cannot form a "half circle" because they are never adjacent. The same holds for alternate exterior angles -- they can never be adjacent either. There is not a formal name for the pair of interior adjacent supplementary angles formed by the transversal and one of the parallel lines. ( 1 vote)
Chapter 3, Lesson 2: Angles and Parallel Lines. Extra Examples. Personal Tutor. Self-Check Quizzes.
Angles (9x + 2) and 119 are alternate angles. Alternate angles are equal. So, we have: Subtract 2 from both sides. Divide both sides by 9. Question 6: Angles (12x - 8) and 104 are interior angles. Interior angles add up to 180. So, we have: Collect like terms. Divide both sides by 12. Question 7: Angles (5x + 7) and (8x - 71) are alternate ...
Question: 3.2 Assignment #2: Parallel Lines, Transversals and Algebra Name Mod Directions: If m, classify the marked angle pair and give their relationship Then solve for x.