Answer :
Applying, C1→C1 + C2 + C3, we get,
Taking, (a + b + c) we get,
Applying, R2→R2 – R1, R3→R3 – R1, we get,
= (a + b + c)[(a – b)(a – c) – (b – c)(c – b)]
= (a + b + c)[a2 – ac – ab + bc + b2 + c2 – 2bc]
= (a + b + c)[a2 + b2 + c2 – ac – ab – bc]
So, Δ = (a + b + c)[a2 + b2 + c2 – ac – ab – bc]
Rate this question :
How useful is this solution?
We strive to provide quality solutions. Please rate us to serve you better.
Related Videos
Determinants of Matrices of different order59 mins
Types of Matrices & Properties51 mins
Interactive Quiz on Matrices and Determinants41 mins
Determining a determinant63 mins
Triangular Matrices & operations on matrices58 mins
Know About finding the Adjoint & Inverse Of Matrix46 mins
Interactive Quiz on Properties of Determinants43 mins
Lecture on Product of Determinants58 mins
Test Yourself, Properties of Determinants30 mins
Interactive Quiz on Matrices & Determinants48 mins
Determinants of Matrices of different order59 minsTypes of Matrices & Properties51 minsInteractive Quiz on Matrices and Determinants41 minsDetermining a determinant63 minsTriangular Matrices & operations on matrices58 minsKnow About finding the Adjoint & Inverse Of Matrix46 minsInteractive Quiz on Properties of Determinants43 minsLecture on Product of Determinants58 minsTest Yourself, Properties of Determinants30 minsInteractive Quiz on Matrices & Determinants48 minsTry 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 :
Solve the matrix equations:
Using properties of determinants, prove the following:
Using properties of determinants, prove the following:
Using properties of determinants, prove the following:
Solve the matrix equations:
