A′=AT
AA′=A′A
B=A−1A′
B′=(A−1A′)′=(A′)′⋅(A−1)′=A(A−1)′
BB′=A−1A′⋅A(A−1)′
=A−1⋅A⋅A′⋅(A−1)′ [∵AA′=A′A]
=I⋅A′⋅(A−1)′
=I⋅(A−1A)′ [∵(CD)′=D′C′]
=I⋅I′
=I2 [∵I=I′]
=I
If Ais a 3×3 non-singular matrix such that AA′=A′A and B=A−1A′, then BB′ equals, where X′ denotes the transpose of the matrix X.
Held on 6 Apr 2014 · Verified 6 Jul 2026.
B−1
(B−1)′
I+B
I
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