Symmetry

1. What Is Symmetry?

SYMMETRY means BALANCE and PROPORTION. A figure is SYMMETRICAL if one half is the MIRROR IMAGE of the other half.

Types of Symmetry

TypeDescription
Line Symmetry (Reflection Symmetry)A figure can be folded along a line so halves match exactly
Rotational SymmetryA figure looks the same after a rotation of less than 360°
Point SymmetryEvery point has a matching point at equal distance from a centre

2. Line Symmetry (Reflection Symmetry)

A figure has LINE SYMMETRY if there is a LINE (called the AXIS of symmetry) that divides it into two IDENTICAL halves.

Examples

  • A SQUARE has 4 lines of symmetry.
  • A RECTANGLE has 2 lines of symmetry.
  • An EQUILATERAL TRIANGLE has 3 lines of symmetry.
  • An ISOSCELES TRIANGLE has 1 line of symmetry.
  • A CIRCLE has INFINITE lines of symmetry.
  • A SCALENE TRIANGLE has NO line of symmetry.

Table: Lines of Symmetry for Common Shapes

ShapeNumber of Lines of Symmetry
Square4
Rectangle2
Equilateral triangle3
Isosceles triangle1
Scalene triangle0
Regular pentagon5
Regular hexagon6
CircleInfinite
Parallelogram0
Rhombus2

Worked Example (ICSE 2024, 2 marks)

'Draw all lines of symmetry for a regular hexagon.'

Solution: A regular hexagon has 6 lines of symmetry — 3 through opposite vertices and 3 through midpoints of opposite sides.


3. Rotational Symmetry

A figure has ROTATIONAL SYMMETRY if it looks the SAME after being rotated by an angle LESS than 360°.

Key Terms

  • Centre of rotation: The fixed point around which the figure is rotated.
  • Angle of rotation: The smallest angle through which the figure is rotated to look the same.
  • Order of rotational symmetry: The number of times the figure looks the SAME during a FULL 360° rotation.

Formula

Order of rotational symmetry = 360° / Angle of rotation

Examples

ShapeAngle of RotationOrder
Equilateral triangle120°3
Square90°4
Regular pentagon72°5
Regular hexagon60°6
CircleAny angleInfinite
Rectangle180°2
Parallelogram180°2
Scalene triangle360°1

Worked Example (ICSE 2023, 2 marks)

'Find the order of rotational symmetry of a regular octagon.'

Solution: Angle of rotation = 360°/8 = 45°. Order = 360/45 = 8.


4. Reflection Symmetry

REFLECTION is a type of symmetry where a figure is MIRRORED across a line.

Properties of Reflection

  • The image is the SAME distance behind the mirror as the object is in front.
  • The image is LATERALLY INVERTED (left and right are swapped).
  • The line of reflection is the PERPENDICULAR BISECTOR of the segment joining a point and its image.

Examples with Letters

LetterLine SymmetryRotational Symmetry
A1 line (vertical)Order 1
H2 lines (vertical, horizontal)Order 2
OInfinite (circle)Infinite
X2 lines (diagonal)Order 2
N0 linesOrder 2

5. Symmetry in Nature and Daily Life

  • Nature: Butterfly wings, snowflakes, flower petals, human face.
  • Art: Rangoli patterns, mandalas, architecture.
  • Design: Logos, tiles, wallpaper patterns.

Symmetry is NOT just mathematical — it appears EVERYWHERE in nature and human design.


6. Comparing Line and Rotational Symmetry

FeatureLine SymmetryRotational Symmetry
What divides the figureA LINEA POINT (centre)
How it matchesFolding along a lineRotating about a point
ExampleButterflyWindmill
No. of symmetriesNumber of axesOrder of rotation

Common Mistake

'All figures with rotational symmetry also have line symmetry.' — FALSE. Example: A parallelogram has rotational symmetry (order 2) but NO line of symmetry.


7. ICSE Exam Focus

TopicMarksFrequency
Lines of symmetry (draw and count)2 marksVery High
Order of rotational symmetry2 marksHigh
Completing symmetrical figures2-3 marksMedium
Difference between line and rotational symmetry2 marksLow
Symmetry in letters/numbers1-2 marksMedium

Common Mistakes in ICSE Exams

  1. Counting the same line twice — each distinct line counts once.
  2. Saying a figure has 'no symmetry' when it actually has rotational symmetry of order 1 (every figure has order 1 — it looks the same after 360°).
  3. Drawing lines of symmetry that are NOT valid (halves must be EXACTLY identical).
  4. Forgetting that a circle has INFINITE lines of symmetry, not zero.

Self-Test (5 Questions)

Q1. How many lines of symmetry does a square have? (1 mark)

  • A) 2
  • B) 3
  • C) 4
  • D) Infinite

Q2. What is the order of rotational symmetry of a rectangle? (1 mark)

Q3. Which letter has BOTH horizontal and vertical line symmetry? (1 mark)

  • A) A
  • B) H
  • C) M
  • D) T

Q4. 'A figure looks the same after a rotation of 72°. Find its order of rotational symmetry.' (2 marks)

Q5. 'Does a parallelogram have line symmetry? Does it have rotational symmetry?' (2 marks)

Answers

A1. C) 4 (two diagonals and two through midpoints of opposite sides). A2. Order 2 (looks the same after 180° and 360°). A3. B) H (vertical and horizontal lines of symmetry). A4. Order = 360/72 = 5. A5. Parallelogram has NO line symmetry. It HAS rotational symmetry of order 2.

Verified by the tuition.in editorial team
Written and reviewed by subject-matter experts — read about our process.
Editorial process →
Header Logo