CBSE Class 12 Math 2012 Solved Paper

Question : 23 of 29

Marks: +1, -0

Using matrices solve the following system of linear equations:
x - y + 2z = 7
3x + 4y - 5z = - 5
2x - y + 3z = 12
OR
Using elementary operations, find the inverse of the following matrix:

(\table -1,1,2;1,2,3;3,1,1)

Solution:

The given system of equation can be written in the form of AX = B, where
A =

[\table 1,-1,2;3,4,-5;2,-1,3]

, X =

[\table X;Y;Z]

and B =

[\table 7;-5;12]

Now,
|A| = 1 (12 - 5) + 1 (9 + 10) + 2 (- 3 - 8) = 7 + 19 - 22 = 4 ≠ 0
Thus, A is non-singular. Therefore, its inverse exists.
Now,

A_{11}

= 7 ,

A_{12}

= - 19 ,

A_{13}

= - 11

A_{21}

= 1 ,

A_{22}

= - 1 ,

A_{23}

= - 1

A_{31}

= - 3 ,

A_{32}

= 11 ,

A_{33}

= 7
∴

A^{-1}

1/{|A|}

(adj A) =

1/4[\table 7,1,-3;-19,-1,11;-11,-1,7]

OR
Consider the given matrix.
Let A =

[\table -1,1,2;1,2,3;3,1,1]

We know that, A =

I_n

A
Perform sequence of elementary row operations on A on the left hand side and the term

I_n

on the right hand side till we obtain the result

I_n

= BA
Thus, B =

A^{-1}

Here,

I_3

[\table 1,0,0;0,1,0;0,0,1]

Thus,we have,

[\table -1,1,2;1,2,3;3,1,1]

[\table 1,0,0;0,1,0;0,0,1]

R_1

↔

R_2

[\table 1,2,3;-1,1,2;3,1,1]

[\table 0,1,0;1,0,0;0,0,1]

R_2

→

R_2 + R_1

R_3

→

R_3 - 3R_1

[\table 1,2,3;0,3,5;0,-5,-8]

[\table 0,1,0;1,1,0;0,-3,1]

R_1

→

R_1 + R_2

[\table 1,5,8;0,3,5;0,-5,-8]

[\table 1,2,0;1,1,0;0,-3,1]

R_1

→

R_1+R_3

[\table 1,0,0;0,3,5;0,-5,-8]

[\table 1,-1,1;1,1,0;0,-3,1]

R_2

→

R_2/3

[\table 1,0,0;0,1,5/3;0,-5,-8]

[\table 1,-1,1;1/3,1/3,0;0,-3,1]

R_32

→

R_2 + 5R_2

[\table 1,0,0;0,1,5/3;0,0,1/3]

[\table 1,-1,1;1/3,1/3,0;5/3,-4/3,1]

[\table 1,0,0;0,1,5/3;0,0,1]

[\table 1,-1,1;1/3,1/3,0;5,-4,3]

R_2

→

R_2 - 5/3R_3

[\table 1,0,0;0,1,0;0,0,1]

[\table 1,-1,1;-8,7,-5;5,-4,3]

A
Thus the inverse of the matrix A is given by

[\table 1,-1,1;-8,7,-5;5,-4,3]

Go to Question:

Prev Question

Next Question