Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (2024)

Parallel lines are the lines that do not intersect or meet each other at any point in a plane. They are always parallel and are at equidistant from each other. Parallel lines are non-intersecting lines. We can also say Parallel lines meet at infinity.

Also, when a transversal intersects two parallel lines, then pairs of angles are formed, such as:

  • Corresponding angles
  • Alternate interior angles
  • Alternate exterior angles
  • Vertically opposite angles
  • Linear pair

If two lines are intersecting each other at a point, in a plane, they are called intersecting lines. If they meet each other at 90 degrees, then they are called perpendicular lines.

Definition

Two lines are said to be parallel when they do not meet at any point in a plane. Lines which do not have a common intersection point and never cross path with each other are parallel to each other. The symbol for showing parallel lines is ‘||’.

Two lines which are parallel are represented as:

\(\begin{array}{l}\overleftrightarrow{AB}||\overleftrightarrow{CD}\end{array} \)

This means that line AB is parallel to CD.

The perpendicular distance between the two parallel lines is always constant.

Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (1)

In the figure shown above, the line segments PQ and RS represent two parallel lines as they have no common intersection point in the given plane. Infinite parallel lines can be drawn parallel to lines PQ and RS in the given plane.

Pairs of Angles

Lines can either be parallel or intersecting. When two lines meet at a point in a plane, they are known as intersecting lines. If a line intersects two or more lines at distinct points then it is known as a transversal line.

In figure 2, line l intersects lines a and b at points P and Q respectively. The line l is the transversal here.

∠1,∠2,∠7 and ∠8 are the exterior angles and ∠3,∠4,∠5 and ∠6 denote the interior angles.
The angle pairs formed due to intersection by a transversal are named as follows:

  1. Corresponding Angles: ∠1 and ∠6; ∠4 and ∠8; ∠2 and ∠5; ∠3 and ∠7 are the corresponding pair of angles.
  2. Alternate Interior Angles: ∠4 and ∠5 ; ∠3 and ∠6 denote the pair of alternate interior angles.
  3. Alternate Exterior Angles: ∠1 and ∠7; ∠2 and ∠8 are the alternate exterior angles.
  4. Same side Interior Angles: ∠3 and ∠5; ∠4 and ∠6 denote the interior angles on the same side of the transversal or co-interior or consecutive interior angles.

Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (2)

If the lines a and b are parallel to each other as shown, then the following axioms are given for angle pairs of these lines.

Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (3)

Properties of Parallel Lines

As we have already learned, if two lines are parallel, they do not intersect, on a common plane. Now if a transversal intersects two parallel lines, at two distinct points, then there are four angles formed at each point. Hence, below are the properties of parallel lines with respect to transversals.

  • Corresponding angles are equal.
  • Vertical angles/ Vertically opposite angles are equal.
  • Alternate interior angles are equal.
  • Alternate exterior angles are equal.
  • Pair of interior angles on the same side of the transversal are supplementary.

For More Information On Parallel Lines and Intersecting Lines, Watch The Below Video:

Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (4)

Parallel Lines Axioms and Theorems

Go through the following axioms and theorems for the parallel lines.

Corresponding Angle Axiom

If two lines which are parallel are intersected by a transversal then the pair of corresponding angles are equal.

From Fig. 3: ∠1=∠6, ∠4=∠8, ∠2= ∠5 and ∠3= ∠7

The converse of this axiom is also true according to which if a pair of corresponding angles are equal then the given lines are parallel to each other.

Theorem 1

If two lines which are parallel are intersected by a transversal then the pair of alternate interior angles are equal.

From Fig. 3: ∠4=∠5 and ∠3=∠6

Proof: As, ∠4=∠2 and ∠1=∠3(Vertically Opposite Angles)

Also, ∠2=∠5 and ∠1=∠6 (Corresponding Angles)

⇒∠4=∠5 and ∠3=∠6

The converse of the above theorem is also true which states that if the pair of alternate interior angles are equal then the given lines are parallel to each other.

Theorem 2

If two lines which are parallel are intersected by a transversal then the pair of interior angles on the same side of the transversal are supplementary.

∠3+ ∠5=180° and ∠4+∠6=180°

As ∠4=∠5 and ∠3=∠6 (Alternate interior angles)

∠3+ ∠4=180° and ∠5+∠6=180° (Linear pair axiom)

⇒∠3+ ∠5=180° and ∠4+∠6=180°

The converse of the above theorem is also true which states that if the pair of co-interior angles are supplementary then the given lines are parallel to each other.

Applications of Parallel Lines in Real Life

One will be able to see lines which are parallel to each other in real life too if only one has the patience and is observant enough to do so. For instance, take the railroads. The railway tracks are literally parallel lines. The two lines or tracks are meant for the wheels of the train to travel along on. The difference between the parallel lines imagined by mathematicians and the ones who actually make the railway tracks is that mathematicians have the liberty to imagine the parallel lines over flat surfaces and paper, while trains travel across all sorts of terrain, from hills, slopes and mountains to over bridges.

According to mathematicians when two parallel lines are graphed, they must always be at the same angle, which means they’ll have the same slope or steepness.

Solved Examples

Q.1: In the given figure, p || q and l is a transversal. Find the values of x and y.

Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (5)

Solution: Since, 6x+y and x+5y are corresponding angles.

6 x + y = x + 5 y

6 x – x = 5 y – y

5 x = 4 y

x = 4y/5

Now, 4x and 6x+y are linear pair of angles, so,

4 x + 6 x + y = 180°

10x + y = 180°

40y/5 + y = 180°

45y/5 = 180°

45y = 180 × 5 = 900°

y = 20

x = (4 × 20)/5 = 16

Therefore, x = 16 and y = 20

Q.2: In Figure, AB and CD are parallel lines intersected by a transversal PQ at L and M respectively, If ∠CMQ = 60, find all other angles in the figure.

Parallel Lines | Transversals | Pair of Angles | Parallel Lines Examples (6)

Solution:

∠ALM = ∠CMQ = 60° [corresponding angles]

∠LMD = ∠CMQ = 60° [Vertically opposite angles]

∠ALM = ∠PLB = 60 [Vertically opposite angles]

Here, ∠CMQ + ∠QMD = 180° are the linear pair

∠QMD = 180° – 60° = 120°

Now,

∠QMD = ∠MLB = 120° [Corresponding angles ]

∠QMD = ∠CML = 120° [Vertically opposite angles]

∠MLB = ∠ALP = 120° [Vertically opposite angles]

To learn more, download BYJU’S – The Learning App from Google Play Store and watch interactive videos. Also, take free tests to practice for exams.

Frequently Asked Questions – FAQs

Q1

What are parallel lines?

Parallel lines are those lines on a plane that do not meet each other at any point. They are non-intersecting lines.

Q2

What are the properties of parallel lines?

Parallel lines are always equidistant apart from each other. They do not intersect each other. When cut by a transversal, parallel lines form a pair of angles. Hence, corresponding angles are equal, alternate interior angles are equal, alternate exterior angles are equal, vertical angles are equal and sum of interior angles on the same side of transversal are supplementary.

Q3

If x and y are pair of interior angles on the same side of transversal and x is equal to y, then what are the angles?

Given, x and y are pairs of interior angles on the same side of transversal, hence they are supplementary.
x + y = 180°
Also, x and y are equal. Therefore,
x + x = 180°
2x = 180°
x = 90°
Therefore the angles are equal to 90 degrees.

Q4

If one of the angle is 45 degrees, then its corresponding angle will be?

If one of the pair of angles is 45 degrees, then its corresponding angle is also equal to 45 degrees.

Q5

If one of the angles is 108 degrees, then its vertically opposite angle is?

If one of the pairs of angles is 108 degrees, then its vertically opposite angle is also equal to 108 degrees.

Parallel Lines | Transversals | Pair of Angles  | Parallel Lines Examples (2024)

FAQs

What are 5 examples of parallel lines? ›

The real-life examples of parallel lines include railroad tracks, the edges of sidewalks, rails of a ladder, never-ending rail tracks, opposite sides of a ruler, opposite edges of a pen, eraser, etc.

What are parallel lines in angles? ›

Parallel lines are lines in the same plane that go in the same direction and never intersect. When a third line, called a transversal, crosses these parallel lines, it creates angles. Some angles are equal, like vertical angles (opposite angles) and corresponding angles (same position at each intersection).

What is an example of a pair of parallel lines? ›

In geometry, parallel lines can be defined as two lines in the same plane that are at equal distance from each other and never meet. They can be both horizontal and vertical. We can see parallel lines examples in our daily life like a zebra crossing, the lines of notebooks, and on railway tracks around us.

What are the linear angles in parallel lines? ›

Linear Angles: Linear angles are two angles along a line that add up to 180 degrees. Obtuse Angle: An obtuse angle is an angle that measures more than 90 degrees. Parallel Lines: Parallel lines are lines that will never intersect. Supplementary Angle: Supplementary angles are two angles that add up to 180 degrees.

How to identify parallel lines? ›

Parallel lines are two or more lines that are always the same distance apart and never intersect, even if they are extended infinitely in both directions. They are always equidistant and run in the same direction, which means they have the same slope.

What are the 12 types of angles with examples? ›

Based on their measurements, here are the different types of angles:
  • An acute angle measures less than 90° at the vertex.
  • An obtuse angle is between 90° and 180°.
  • A right angle precisely measures 90° at the vertex.
  • An angle measuring exactly 180° is a straight angle.
  • A reflex angle measures between 180°- 360°.

When two lines are parallel then their angles are? ›

If two lines are parallel, then the alternate interior angles are equal. Q. If two parallel lines are intersected by a transversal, then alternate interior angles are equal.

Do parallel lines add up to 180? ›

Properties. These angles are congruent. The sum of the angles formed on the same side of the transversal which are inside the two parallel lines is always equal to 180°.

What is a example of parallel? ›

Parallel: The business accepts cash, credit cards, and checks. Not parallel: She aspires to finish college, and becoming an accountant would be another goal. Parallel: She aspires to finish college and become an accountant.

What is the angle theorem for parallel lines? ›

If two lines and a transversal form corresponding angles that are congruent, then the lines are parallel. Converse of the Alternate Interior Angles Theorem: If two lines and a transversal form alternate interior angles that are congruent, then the two lines are parallel.

What are examples of parallel lines in a classroom? ›

One example of parallel lines in a classroom are the opposite edges of a desk, because they are both part of the same plane (the desk) but never intersect.

What are the 4 parallel lines angles? ›

When parallel lines are cut by a transversal, there are 4 special types of angles that are formed - corresponding angles, alternate interior angles, alternate exterior angles, and consecutive interior angles.

What are the 5 parallel lines of latitude? ›

Major Parallel Lines

There are five significant parallel latitudes running across North-South: Equator, Arctic Circle, Antarctic Circle, Tropic of Cancer, Tropic of Capricorn.

What are 5 examples of perpendicular lines? ›

In real life, the following are examples of perpendicular lines:
  • Football field.
  • Railway track crossing.
  • First aid kit.
  • Construction of a house in which floor and the wall are perpendiculars.
  • Television.
  • Designs in windows.
Oct 29, 2020

What are four examples for parallel lines from your surroundings? ›

Parallel lines Examples from Real Life
  • The railway tracks run parallel to each other. ...
  • The edges of a ruler are parallel to each other.
  • Cricket stumps are parallel.
  • Lines on a ruled paper are parallel.
  • Zebra crossing has parallel white lines.
  • The opposite boundaries of an eraser are parallel.
Mar 4, 2022

What do you call the five parallel lines? ›

staff, in the notation of Western music, five parallel horizontal lines that, with a clef, indicate the pitch of musical notes.

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