In solving simultaneous equations by Gauss Jordan method, the coefficient matrix is reduced to
matrix.
Answers
Answer:
god
Step-by-step explanation:
god
Concept:
We first recall the concept of matrix and the Gauss jordan method to proceed with this question.
Any system of mn elements arranged in a rectangular array in m rows and n columns is called an m×n Matrix.
Gauss jordan method also known as row reduction method or Gaussian Elimination, is used to solve a system of linear equation.
Solution:
In Gauss Jordan method, the given system of equation is represented in an augmented matrix form.
Then we have to perform row operations to reduced it to reduced row echelon form.
A rectangular matrix is in reduced echelon form if it follows two properties:
(1) The leading entry in each non zero row is 1.
(2) Each leading 1 is the only non zero entry in the row reduced.
Hence, in solving simultaneous equations by Gauss Jordan method, the coefficient matrix is reduced to Diagonal Matrix.