Revision: Matrices and Determinants JEE Main Matrices and Determinants

Definition: Matrix

A matrix is a rectangular arrangement of numbers arranged in rows and columns, enclosed in brackets [ ] or parentheses ( ).

Elements (Entries) of a Matrix

Rows and Columns

Order of a Matrix

Definition: Transpose of a Matrix

The transpose of a matrix is obtained by interchanging its rows and columns.

Key Points: Properties of Matrix Addition

Property	Rule / Formula
Same Order Rule	Matrices can be added or subtracted only if they are of the same order
Commutative Property	A + B = B + A
Associative Property	A + (B + C) = (A + B) + C
Additive Identity	A + 0 = 0 + A = A
Additive Inverse	(A + (-A) = (-A) + A = 0
Subtraction Rule	A - B = A + (-B)

Key Points: Properties of Matrix Multiplication

Property	Rule / Statement
Compatibility Rule	Matrices A and B can be multiplied only if the columns of A = the rows of B
Order of Product	If A is m × n and B is n × p, then AB is m × p
Non-Commutative	AB `\cancel(=)` BA (in general)
Associative Property	A(BC) = (AB)C
Distributive over Addition	A(B + C) = AB + AC
Zero Matrix Property	The product of two non-zero matrices can be a zero matrix
Cancellation Law	If AB = AC, it does not imply B = C
Identity Matrix	AI = IA = A (orders compatible)

Key Points: Types of Matrices

Type of Matrix	Key Property
Row Matrix	Has only one row (1 × n)
Column Matrix	Has only one column (m × 1)
Square Matrix	Number of rows = number of columns (n × n)
Rectangular Matrix	Number of rows ≠ , number of columns
Zero (Null) Matrix	All elements are 0
Diagonal Matrix	Square matrix; all non-diagonal elements = 0
Unit (Identity) Matrix	Diagonal matrix with all diagonal elements = 1