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Mathematics - Matrices Question with Solution | TestHub

MathematicsMatricesSymmetric & Skew Symmetric MatricesHard2 minPYQ_2023
MathematicsHardsingle choice

Let A,B,C be 3×3 matrices such that A is symmetric and B and C are skew-symmetric.

Consider the statements

S1 A13 B26-B26 A13 is symmetric

S2 A26C13-C13 A26 is symmetric

Then,

Options:

Answer:
A
Solution:

Given,

Matrix A is symmetric, B is skew symmetric and C is skew symmetric, 

So, AT=A, BT=-B, CT=-C

Now let M=A13B26-B26A13

Then, MT=A13 B26-B26 A13T

=A13B26T-B26 A13T

=BT26 AT13-AT13 BT26

=B26 A13-A13 B26=-M

Hence, M is skew symmetric

Now let, N=A26C13-C13 A26

Then, NT=A26C13T-C13A26T

=-C13A26+A26C13=N

Hence, N is symmetric.

So, only S2 is true.

Stream:JEESubject:MathematicsTopic:MatricesSubtopic:Symmetric & Skew Symmetric Matrices
2mℹ️ Source: PYQ_2023

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