Answer :
First of all we need to check whether the matrix is invertible or not. For that-
For the inverse of a matrix A to exist,
Determinant of A ≠ 0
Here ∣A∣ = (1)(7) – (2)(3) = 1
So the matrix is invertible.
Now to find the inverse of the matrix,
We know AA-1 = I
Let’s make augmented matrix-
→ [ A : I ]
→
Apply row operation- R2→ R2 – 2R1
→ 
Apply row operation- R1→ R1 - 3R2
→
The matrix so obtained is of the form –
→ [ I : A-1 ]
Hence inverse of the given matrix-
→ 
Rate this question :
How useful is this solution?
We strive to provide quality solutions. Please rate us to serve you better.
Try our Mini CourseMaster Important Topics in 7 DaysLearn from IITians, NITians, Doctors & Academic Experts
view all courses
Dedicated counsellor for each student
24X7 Doubt Resolution
Daily Report Card
Detailed Performance Evaluation
RELATED QUESTIONS :
<span lang="EN-US
Mathematics - Exemplar<span lang="EN-US
Mathematics - ExemplarUsing matrices so
Mathematics - Board PapersOn her birthday S
Mathematics - Board PapersUsing matrices so
Mathematics - Board Papers<span lang="EN-US
RS Aggarwal - Mathematics<span lang="EN-US
RS Aggarwal - MathematicsUsing elementary
RS Aggarwal - MathematicsUsing elementary
RS Aggarwal - Mathematics