Solving Systems of Linear Equations Using Matrices

Solving Systems of Linear Equations Using Matrices

Homogeneous and non-homogeneous systems of linear equations

A system of equations AX = B is called a homogeneous system if B = O. If B ≠ O, it is called a non-homogeneous system of equations.
e.g., 2x + 5y = 0
3x – 2y = 0
is a homogeneous system of linear equations whereas the system of equations given by
e.g., 2x + 3y = 5
x + y = 2
is a non-homogeneous system of linear equations.

Solution of Non-homogeneous system of linear equations

  1. Matrix method: If AX = B, then X = A-1B gives a unique solution, provided A is non-singular.
    But if A is a singular matrix i.e., if |A| = 0, then the system of equation AX = B may be consistent with infinitely many solutions or it may be inconsistent.
  2. Rank method for solution of Non-Homogeneous system AX = B
    1. Write down A, B
    2. Write the augmented matrix [A : B]
    3. Reduce the augmented matrix to Echelon form by using elementary row operations.
    4. Find the number of non-zero rows in A and [A : B] to find the ranks of A and [A : B] respectively.
    5. If ρ(A) ≠ ρ(A : B) then the system is inconsistent.
    6. ρ(A) = ρ(A : B) = the number of unknowns, then the system has a unique solution.
    7. ρ(A) = ρ(A : B) < number of unknowns, then the system has an infinite number of solutions.

Solutions of a homogeneous system of linear equations

Let AX = O be a homogeneous system of 3 linear equations in 3 unknowns.

  1. Write the given system of equations in the form AX = O and write A.
  2. Find |A|.
  3. If |A| ≠ 0, then the system is consistent and x = y = z = 0 is the unique solution.
  4. If |A| = 0, then the systems of equations has infinitely many solutions. In order to find that put z = k (any real number) and solve any two equations for x and y so obtained with z = k give a solution of the given system of equations.

Consistency of a system of linear equation AX = B, where A is a square matrix

In system of linear equations AX = B, A = (aij)n×n is said to be

  1. Consistent (with unique solution) if |A| ≠ 0.
    i.e., if A is non-singular matrix.
  2. Inconsistent (It has no solution) if |A| = 0 and (adj A)B is a non-null matrix.
  3. Consistent (with infinitely m any solutions) if |A| = 0 and (adj A)B is a null matrix.

Rank of matrix

Definition:
Let A be a m×n matrix. If we retain any r rows and r columns of A we shall have a square sub-matrix of order r. The determinant of the square sub-matrix of order r is called a minor of A order r. Consider any matrix A which is of the order of 3×4 say,
Solving Systems of Linear Equations Using Matrices 1.
It is 3×4 matrix so we can have minors of order 3, 2 or 1. Taking any three rows and three columns minor of order three. Hence minor of order \(3=\left| \begin{matrix} 1 & 3 & 4 \\ 1 & 2 & 6 \\ 1 & 5 & 0 \end{matrix} \right| =0\)
Making two zeros and expanding above minor is zero. Similarly we can consider any other minor of order 3 and it can be shown to be zero. Minor of order 2 is obtained by taking any two rows and any two columns.
Minor of order \(2=\begin{vmatrix} 1 & 3 \\ 1 & 2 \end{vmatrix}=2-3=-1\neq 0\).
Minor of order 1 is every element of the matrix.

Rank of a matrix: The rank of a given matrix A is said to be r if

  1. Every minor of A of order r+1 is zero.
  2. There is at least one minor of A of order r which does not vanish. Here we can also say that the rank of a matrix A is said to be r ,if
    • Every square submatrix of order r+1 is singular.
    • There is at least one square submatrix of order r which is non-singular.

The rank r of matrix A is written as ρ(A) = r.

Echelon form of a matrix

A matrix A is said to be in Echelon form if either A is the null matrix or A satisfies the following conditions:

  1. Every non- zero row in A precedes every zero row.
  2. The number of zeros before the first non-zero element in a row is less than the number of such zeros in the next row.

If can be easily proved that the rank of a matrix in Echelon form is equal to the number of non-zero row of the matrix.

Rank of a matrix in Echelon form: The rank of a matrix in Echelon form is equal to the number of non-zero rows in that matrix.

Solving Systems of Linear Equations Using Matrices Problems with Solutions

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Solution:
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Solution:
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Solution:
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