Coordinate Geometry — Reflection

Introduction

Reflection is a transformation that maps a point to its mirror image across a line or point. In ICSE Class 10, you study reflection of points in the coordinate axes, the origin, and the line y = x. You also learn about invariant points — points that remain fixed under a reflection.

Reflection in the x-axis

A point P(x, y) reflected in the x-axis maps to P'(x, −y).

Mₓ: (x, y) → (x, −y)

The x-coordinate stays the same; the y-coordinate changes sign.

Reflection in the y-axis

A point P(x, y) reflected in the y-axis maps to P'(−x, y).

Mᵧ: (x, y) → (−x, y)

The y-coordinate stays the same; the x-coordinate changes sign.

Reflection in the Origin

A point P(x, y) reflected in the origin maps to P'(−x, −y).

Mₒ: (x, y) → (−x, −y)

Both coordinates change sign.

Reflection in the line y = x

A point P(x, y) reflected in the line y = x maps to P'(y, x).

Mᵧ₌ₓ: (x, y) → (y, x)

The x and y coordinates are interchanged.

Reflection in the line y = −x

A point P(x, y) reflected in the line y = −x maps to P'(−y, −x).

Mᵧ₌₋ₓ: (x, y) → (−y, −x)


Invariant Points

A point is said to be invariant under a reflection if it lies on the mirror line. Such a point maps to itself.

  • Points on the x-axis (y = 0) are invariant under reflection in the x-axis.
  • Points on the y-axis (x = 0) are invariant under reflection in the y-axis.
  • The origin (0, 0) is invariant under reflection in the origin.
  • Points on the line y = x are invariant under reflection in y = x.

Summary Table of Reflections

Reflection inTransformationInvariant Points
x-axis(x, y) → (x, −y)Points with y = 0
y-axis(x, y) → (−x, y)Points with x = 0
Origin(x, y) → (−x, −y)Only (0, 0)
y = x(x, y) → (y, x)Points with x = y
y = −x(x, y) → (−y, −x)Points with x = −y

Worked Examples

Example 1: Finding Reflected Points

Find the reflection of P(3, −4) in: (a) x-axis (b) y-axis (c) origin (d) y = x

Solution: (a) Mₓ(3, −4) = P₁(3, 4) (b) Mᵧ(3, −4) = P₂(−3, −4) (c) Mₒ(3, −4) = P₃(−3, 4) (d) Mᵧ₌ₓ(3, −4) = P₄(−4, 3)

Example 2: Coordinates After Two Reflections

Point P(−2, 5) is reflected in the x-axis to get P₁. P₁ is then reflected in the y-axis to get P₂. Find P₁ and P₂.

Solution: P(−2, 5) → Mₓ → P₁(−2, −5) P₁(−2, −5) → Mᵧ → P₂(2, −5)

P₁(−2, −5), P₂(2, −5)

Note: Two successive reflections in perpendicular axes (first x, then y) are equivalent to a reflection in the origin.

Example 3: Finding Invariant Points

If the point P(a, b) is invariant under reflection in the x-axis, find the relation between a and b.

Solution: If P(a, b) is invariant under Mₓ, it must lie on the mirror line (the x-axis). Points on the x-axis have y = 0. Therefore, b = 0 and a can be any real number.

Example 4: Combined Reflection

A(1, 2) is reflected in the line y = x to A'. A' is then reflected in the origin. Find the final coordinates.

Solution: A(1, 2) → Mᵧ₌ₓ → A'(2, 1) A'(2, 1) → Mₒ → A''(−2, −1)

Final coordinates: (−2, −1)


Use of Reflection in Geometry

Reflection is used to understand symmetry in geometric figures. A figure has:

  • Line symmetry if it can be reflected across a line onto itself.
  • Point symmetry if it can be reflected across a point onto itself.

Common Mistakes and Fixes

MistakeFix
Confusing reflection in x-axis and y-axisx-axis: y changes sign; y-axis: x changes sign
Forgetting that reflection in origin changes both signs(x, y) → (−x, −y)
Confusing y = x and y = −x reflectionsy = x: swap coordinates; y = −x: swap and negate both
Invariant point confusionInvariant point lies ON the mirror line

ICSE Exam Focus

Reflection carries 4–6 marks in ICSE exams. Questions include:

  • Finding coordinates after reflection.
  • Identifying invariant points.
  • Problems with two successive reflections.
  • Verifying properties of reflected figures.

Marks Blueprint:

TopicMarks
Single reflection of a point2
Successive reflections2
Invariant points1
Finding mirror line or axis1

Self-Test Questions

  1. Find the reflection of the point (−5, 3) in (a) the x-axis, (b) the y-axis, (c) the origin.

  2. The point P(4, −2) is reflected in the y-axis to P₁. P₁ is then reflected in the x-axis to P₂. Find the coordinates of P₁ and P₂.

  3. Find the coordinates of the point which is invariant under reflection in the line y = x.

  4. Show that the reflection of point A(a, b) in the line y = x followed by reflection in the x-axis is equivalent to a single reflection in the line y = −x.

  5. If Mₓ(P) = P₁ and Mᵧ(P₁) = P₂, find the relationship between P and P₂.


In ICSE, reflection questions are often combined with coordinate geometry. Practice identifying the mirror line from a given point and its image.

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