(i) Here the number of unknowns = 3.
The matrix form of the system is AX = B where
(i.e) AX = B
The augmented matrix (A, B) is
Applying Gaussian elimination method on [A,B] we get
The above matrix is in echelon form also ρ(A, B)
= ρ(A) = 3 = number of unknowns
The system of equations is consistent with a unique solution. To find the solution. Now writing the equivalent equations we get
x – y + 2z = 2
3y = 3 ⇒ y = 1
7z = -7 ⇒ z = 1
Substituting z = y = 1 in (1) we get x – 1 + 2 = 2 ⇒ x = 1
⇒ x = y = z = 1
(ii) Here the number of unknowns is 3.
The matrix form of the given system of equations is:
AX = B
(i.e) Now the augmented matrix [A, B] is
The above matrix is in echelon form also
ρ(A, B) = ρ(A) = 2 < number of unknowns
The system of equations is consistent with the infinite number of solutions.
To find the solution:
Now writing the equivalent equations we get
(iii) Here the number of unknowns is 3.
The matrix form of the given equation is
AX = B
The above matrix is in echelon form.
Here ρ(A, B) = 3; ρ(A) = 2
So ρ(A, B) ≠ ρ(A)
The system of equations is inconsistent with no solution.
(iv) Here the number of unknowns is 3.
The matrix form of the given equation is
AX = B
The augmented matrix [A, B] is
The above matrix is in echelon form also ρ(A, B)
= ρ(A) = 1 < number of unknowns
The system of equations is consistent with the infinite number of solutions.
To find the Solution
Now writing the equivalent equations we get
