🔹 1. Introduction

Three-Dimensional Geometry (3D Geometry) extends coordinate geometry into space.

👉 In 2D → we use (x, y)
👉 In 3D → we use (x, y, z)

This chapter is the foundation for:

• Vectors
• 3D Geometry (Class 12)
• Physics applications

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🔹 2. Coordinate Axes in 3D

In three-dimensional space, we have:

• x-axis
• y-axis
• z-axis

👉 These three axes are mutually perpendicular and intersect at a point called the origin (0, 0, 0).

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🔹 3. Coordinate of a Point

A point in space is represented as:

👉 P(x, y, z)

Where:

• x → distance along x-axis
• y → distance along y-axis
• z → distance along z-axis

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🔹 4. Octants

3D space is divided into 8 parts called octants.

👉 Based on signs of (x, y, z)

Example:

• (+, +, +) → first octant
• Other combinations → remaining octants

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🔹 5. Distance Between Two Points

Distance between P(x₁, y₁, z₁) and Q(x₂, y₂, z₂):

$d = \sqrt{(x_2 – x_1)^2 + (y_2 – y_1)^2 + (z_2 – z_1)^2}$d=(x2​−x1​)2+(y2​−y1​)2+(z2​−z1​)2​

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🔹 6. Section Formula in 3D

Coordinates of point dividing PQ in ratio m:n:

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✔️ Internal Division

$\left(\frac{mx_2 + nx_1}{m+n}, \frac{my_2 + ny_1}{m+n}, \frac{mz_2 + nz_1}{m+n}\right)$(m+nmx2​+nx1​​,m+nmy2​+ny1​​,m+nmz2​+nz1​​)

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✔️ External Division

$\left(\frac{mx_2 – nx_1}{m-n}, \frac{my_2 – ny_1}{m-n}, \frac{mz_2 – nz_1}{m-n}\right)$(m−nmx2​−nx1​​,m−nmy2​−ny1​​,m−nmz2​−nz1​​)

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🔹 7. Midpoint Formula in 3D

$\left(\frac{x_1 + x_2}{2}, \frac{y_1 + y_2}{2}, \frac{z_1 + z_2}{2}\right)$(2×1​+x2​​,2y1​+y2​​,2z1​+z2​​)

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🔹 8. Direction Cosines (Basic Idea)

Direction cosines describe the orientation of a line in space.

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✔️ Relation

$l^2 + m^2 + n^2 = 1$l2+m2+n2=1

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Where:

• l, m, n are direction cosines

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🔹 9. Important Results

✔️ Distance is always positive
✔️ Midpoint lies between two points
✔️ Coordinates determine position uniquely
✔️ 3D formulas are extensions of 2D

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🔹 10. Applications

✔️ Physics (motion in space)
✔️ Engineering
✔️ Computer graphics
✔️ Navigation systems

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🔹 11. JEE & CBSE Important Points

✔️ Distance formula is very important
✔️ Section formula frequently asked
✔️ Practice coordinate-based problems
✔️ Learn octant concept clearly
✔️ Accuracy in calculation is key

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🔹 12. Common Mistakes

❌ Missing z-coordinate
❌ Sign errors
❌ Wrong formula substitution
❌ Confusing internal and external division

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🔹 13. Practice Questions

1. Find distance between two points
2. Find midpoint of given points
3. Divide line in given ratio
4. Identify octant of a point
5. Verify direction cosines

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🔹 14. Quick Revision Sheet

• Point → (x, y, z)
• Distance → √[(x₂−x₁)² + (y₂−y₁)² + (z₂−z₁)²]
• Midpoint → ((x₁+x₂)/2, (y₁+y₂)/2, (z₁+z₂)/2)
• Section formula (3D)
• l² + m² + n² = 1

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🔹 15. Conclusion

Introduction to 3D Geometry is a basic yet important chapter that prepares you for advanced topics in Class 12.

👉 Strong understanding ensures:

• Better visualization
• Faster problem solving
• High exam scores