📘 Vector Algebra – Class 12 NCERT
Vector Algebra is an important chapter in Class 12 Mathematics. It deals with quantities having both magnitude and direction and is widely used in physics, engineering, and 3D geometry ⚙️📐.
🔹 1. Scalars and Vectors
📌 Scalars
Quantities having only magnitude are called scalars.
📌 Vectors
Quantities having both magnitude and direction are called vectors.
🔹 2. Representation of Vectors
Vectors are represented geometrically by directed line segments and algebraically using unit vectors î, ĵ, k̂.
A vector a = 3î + 4ĵ represents a vector in the xy-plane.
🔹 3. Magnitude of a Vector
The magnitude (length) of a vector a = aî + bĵ + ck̂ is given by:
|a| = √(a² + b² + c²)
For a = 3î + 4ĵ
|a| = √(3² + 4²) = 5
🔹 4. Direction Cosines and Direction Ratios
Direction cosines are the cosines of the angles a vector makes with the x, y, and z axes.
For vector a = 2î + 2ĵ + îk̂
Direction ratios = 2, 2, 1
🔹 5. Types of Vectors
- 🔹 Zero vector
- 🔹 Unit vector
- 🔹 Equal vectors
- 🔹 Negative vectors
- 🔹 Collinear vectors
Unit vector along a = a / |a|
🔹 6. Addition of Vectors
Vectors can be added using the triangle law, parallelogram law, or algebraically.
a = î + 2ĵ
b = 3î + ĵ
a + b = 4î + 3ĵ
🔹 7. Scalar (Dot) Product
The scalar product of two vectors a and b is defined as:
a · b = |a||b|cosθ
î · ĵ = 0
î · î = 1
📌 Applications of Dot Product
- Finding angle between vectors 📐
- Checking perpendicularity ⟂
- Work done by a force 💪
🔹 8. Vector (Cross) Product
The vector product of two vectors a and b is defined as:
a × b = |a||b|sinθ n̂
î × ĵ = k̂
ĵ × î = −k̂
📌 Applications of Cross Product
- Finding area of parallelogram 🟦
- Finding area of triangle 🔺
- Determining perpendicular direction
🔹 9. Scalar Triple Product
The scalar triple product a · (b × c) gives the volume of a parallelepiped.
If a · (b × c) = 0, then vectors are coplanar.
🔹 10. Important Points to Remember
- Vectors have both magnitude and direction ➡️
- Dot product gives a scalar 🔢
- Cross product gives a vector 🔄
- î, ĵ, k̂ form a right-handed system ✋
✨ Conclusion
Vector Algebra builds a strong foundation for 3D geometry, physics, and engineering. Mastery of this chapter is crucial for competitive exams and higher studies 🎓🚀.