Given : -
Three equation
x + y – z = 0
x – 2y + z = 0
3x + 6y – 5z = 0
Tip : - We know that
For a system of 3 simultaneous linear equation with 3 unknowns
(i) If D ≠ 0, then the given system of equations is consistent and has a unique solution given by
x = \(\frac{D_1}{D}\), y = \(\frac{D_2}{D}\) and z = \(\frac{D_3}{D}\)
(ii) If D = 0 and D1 = D2 = D3 = 0, then the system is consistent and has infinitely many solution.
(iii) If D = 0 and one of D1, D2 and D3 is non – zero, then the system is inconsistent.
Now,
We have,
x + y – z = 0
x – 2y + z = 0
3x + 6y – 5z = 0
Lets find D
⇒ D = \(\begin{vmatrix} 1 & 1 & -1 \\[0.3em] 1 & -2 & 1 \\[0.3em] 3 &6 &-5 \end{vmatrix}\)
Expanding along 1st row
⇒ D = 1[10 – (6)1] – (1)[( – 5)1 – (1)3] + ( – 1)[6 – ( – 2)3]
⇒ D = 1[4] – 1[ – 8] – [12]
⇒ D = 0
Again,
D1 by replacing 1st column by B
Here,
B = \(\begin{vmatrix} 0 \\[0.3em] 0\\[0.3em]0 \end{vmatrix}\)
⇒ D1 = \(\begin{vmatrix} 0 & 1 & -1 \\[0.3em] 0 & -2 & 1 \\[0.3em] 0 &6 &-5 \end{vmatrix}\)
As one column is zero its determinant is zero
⇒ D1 = 0
Also,
D2 by replacing 2nd column by B
Here,
B = \(\begin{vmatrix} 0 \\[0.3em] 0\\[0.3em]0 \end{vmatrix}\)
⇒ D2 = \(\begin{vmatrix} 1 & 0 & -1 \\[0.3em] 1 & 0 & 1 \\[0.3em] 3 &0 &-5 \end{vmatrix}\)
As one column is zero its determinant is zero
⇒ D2 = 0
Again,
D3 by replacing 3rd column by B
Here,
B = \(\begin{vmatrix} 0 \\[0.3em] 0\\[0.3em]0 \end{vmatrix}\)
⇒ D3 = \(\begin{vmatrix} 1 & 1 & 0 \\[0.3em] 1 & -2 & 0 \\[0.3em] 3 &6 &0 \end{vmatrix}\)
As one column is zero its determinant is zero
⇒ D3 = 0
So, here we can see that
D = D1 = D2 = D3 = 0
Thus,
Either the system is consistent with infinitely many solutions or it is inconsistent.
Now, by 1st two equations, written as
x + y = z
x – 2y = – z
Now by applying Cramer’s rule to solve them,
New D and D1, D2
⇒ D = \(\begin{vmatrix} 1 & 1 \\[0.3em] 1 & -2 \\[0.3em] \end{vmatrix}\)
⇒ D = – 2 – 1
⇒ D = – 3
Again,
D1 by replacing 1st column with
And,
z = k
By changing value of k you may get infinite solutions.
