ExamPlay Dark Logo
Zalogować się

JEE Advance - Mathematics (2011 - Paper 1 Offline - No. 19)

Let M and N be two 3 $$\times$$ 3 non-singular skew symmetric matrices such that MN = NM. If PT denotes the transpose of P, then M2N2(MTN)$$-$$1(MN$$-$$1)T is equal to
M2
$$-$$N2
$$-$$M2
MN

Wyjaśnienie

Given, $${M^T} = - M$$, $${N^T} = - N$$

and $$MN = NM$$ ..... (i)

$$\therefore$$ $${M^2}{N^2}{({M^T}N)^{ - 1}}{(M{N^{ - 1}})^T}$$

$$ = {M^2}{N^2}{N^{ - 1}}{({M^T})^{ - 1}}{({N^{ - 1}})^T}.{M^T}$$

$$ = {M^2}N(N{M^{ - 1}}){( - M)^{ - 1}}{({N^T})^{ - 1}}( - M)$$

$$ = {M^2}NI( - {M^{ - 1}}){( - N)^{ - 1}}( - M)$$

$$ = - {M^2}N{M^{ - 1}}{N^{ - 1}}M$$

$$ = - M.(MN){M^{ - 1}}{N^{ - 1}}M$$

$$ = - M(NM){M^{ - 1}}{N^{ - 1}}M$$

$$ = - MN(N{M^{ - 1}}){N^{ - 1}}M$$

$$ = - M(N{N^{ - 1}})M = - {M^2}$$

Note : This question is wrong, as given. An odd order skew symmetric matrix can't be invertible. Had the matrix be of even order, it could have been correct.

Uwagi (0)

Zaloguj się, aby skomentować
Reklama
BrainBehindX Inc Logo
©2026; Obsługiwane przez BrainBehindX Inc