For each of the systems of equations that follow,use Gauss elimination to obtain an equivalent system whose coefficient matrix is in row echelon form

Chaya Galloway

Chaya Galloway

Answered question

2021-09-06

For each of the systems of equations that follow, use Gaussian elimination to obtain an equivalent system whose coefficient matrix is in row echelon form. Indicate whether the system is consistent. If the system is consistent and involves no free variables, use back substitution to find the unique solution. If the system is consistent and there are free variables, transform it to reduced row echelon form and find all solutions.
2x13x2=5
4x1+6x2=8

Answer & Explanation

davonliefI

davonliefI

Skilled2021-09-07Added 79 answers

Given:
The given system of equations is
2x13x2=5
4x1+6x2=8
Theorem used:
Test for Consistency:
The following conditions are equivalent:
(a) The matrix equation Ax=b is consistent
(b) The vector b is a linear combination of column of A.
(c) The reduced row echelon form of the augmented matrix [A b] has no row of the form [000d] , where d0
Calculation:
Write the augmented matrix as follows
Apply the Gaussian elimination algorithm to transform the matrix into one in the row echelon form.
Step 3
So,this matrix is the reduced row echelon form of the augmented matrix of given system.
It is observed that the augmented matrix contains a row in which the only nonzero entry appears in the last column.
Therefore, the given system of equations must be inconsistent.
So, there is no solution.

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