Elementary Operations of Matrices
1. What are Elemnatry Operations of Matrices?
Elementary Operations are the operations that are performed on the rows and the columns of the matrices and they do not change the value of the matrix.
2. What are Three Types of Elementary Opertaions of Matrices?
The three types of Elementary Operations of Matrices are,
- Interchanging any Two Rows or Two Columns.
- Multiplying Row or Column by a Non-Zero Number.
- Adding Two or more Rows or Columns of the Matrix
3. What are Uses of Elementary Operations?
Elementary operations are used in perform various calculations on the matrices and to find the Inverse of a Matrix, Rank of a Matrix, etc.
Elementary Operations on Matrices
Elementary Operations on Matrices are the operations performed on the rows and columns of the matrix that do not change the value of the matrix. Matrix is a way of representing numbers in the form of an array, i.e. the numbers are arranged in the form of rows and columns. In a matrix, the rows and columns contain all the values in the cell. We represent a matrix as [A]m×n where A is a matrix and m is the number of rows in the matrix and n is the number of columns of the matrix.
In this article, we will learn about Matrix, Types of Matrices, Elementary Operations on Matrices, Problems, and others in detail.