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Let Xa n dY be two arbitrary, 3xx3 , non...

Let `Xa n dY` be two arbitrary, `3xx3` , non-zero, skew-symmetric matrices and `Z` be an arbitrary `3xx3` , non-zero, symmetric matrix. Then which of the following matrices is (are) skew symmetric? a.`Y^3Z^4 Z^4Y^3` b. `x^(44)+Y^(44)` c. `X^4Z^3-Z^3X^4` d. `X^(23)+Y^(23)`

A

`Y^(3)Z^(4)-Z^(4)Y^(3)`

B

`X^(44)+Y^(44)`

C

`X^(4)Z^(3)-Z^(3)X^(4)`

D

`X^(23)+Y^(23)`

Text Solution

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The correct Answer is:
C, D
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Knowledge Check

  • If x+y+z = 0 and (x^3+y^3)/(xyz) = (y^3+z^3)/(xyz) = x^3+z^3)/(xyz) = a , then which of the following can be a?

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    D
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