Infographic summarizing Class 12 3D Geometry chapter, covering key concepts, formulas, and exam tips.

3D Geometry Class 12 – NCERT Chapter 11 Notes, Formulas, and CBSE Exam

3D Geometry Class 12 – Concepts, Formulas, and Examples

3D Geometry Class 12 – Concepts, Formulas, and Examples

Updated for CBSE 2025 | By More Marks

3D Geometry is a fundamental chapter in Class 12 Mathematics. It helps us understand the position and orientation of lines and planes in three-dimensional space. This topic is essential for scoring well in board exams and plays a key role in competitive exams like JEE.

Why Learn 3D Geometry?

Whether you’re designing video games, navigating in space, or analyzing vector fields in physics, 3D Geometry provides the foundation. It allows you to solve real-world problems involving the location, angle, and distance between objects in space.

Key Topics Covered in Chapter 11 – 3D Geometry

  • Direction Cosines and Direction Ratios
  • Vector and Cartesian form of a Line
  • Angle Between Two Lines
  • Skew Lines and Shortest Distance
  • Equations of a Plane
  • Angle Between Line and Plane
  • Distance from a Point to a Plane

Important Formulas in 3D Geometry

1. Direction Cosines:
l = cosα, m = cosβ, n = cosγ
Condition: l² + m² + n² = 1
2. Vector Equation of a Line:
r = a + λb
Where a is position vector, b is direction vector
3. Distance Between Skew Lines:
D = |(a₂ - a₁) · (b₁ × b₂)| / |b₁ × b₂|
4. Distance from a Point to a Plane:
D = |ax₁ + by₁ + cz₁ + d| / √(a² + b² + c²)

Example Problem

Q: Find the angle between two lines whose direction ratios are (2, 3, -1) and (1, -2, 2).

Solution:

  • Let a = (2, 3, -1), b = (1, -2, 2)
  • Use the dot product formula:
    cosθ = (a · b) / (|a||b|)
  • a · b = 2×1 + 3×(-2) + (-1)×2 = 2 – 6 – 2 = -6
  • |a| = √(4 + 9 + 1) = √14, |b| = √(1 + 4 + 4) = √9 = 3
  • cosθ = -6 / (√14 × 3), θ = cos⁻¹(-6 / (3√14))

Tips to Master This Chapter

  • Draw 3D axes and sketch lines and planes to improve visualization.
  • Understand the vector form before converting to Cartesian equations.
  • Revise formulas weekly and create a formula sheet for quick reference.
  • Practice NCERT and exemplar problems thoroughly.

Final Words

3D Geometry is not just theoretical — it’s immensely practical. From drone navigation to architectural design, understanding space and angles gives you the power to interpret real-world scenarios. With clarity of concept and regular practice, you can score full marks in this chapter.

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