Let A and B be two square matrices of order 3 such that |A|=3 and |B|=2 , then the value of |A- 1 ⋅ a d j (B- 1) ⋅ a d j (2 A- 1)| is equal to (where adj(.M.) represents the adjoint matrix of M )

Question

Let A and B be two square matrices of order 3 such that |A|=3 and |B|=2 , then the value of |A- 1 ⋅ a d j (B- 1) ⋅ a d j (2 A- 1)| is equal to (where adj(.M.) represents the adjoint matrix of M ) (A) 72 (B) (64/27) (C) (8/9) (D) (16/27)

Tardigrade Admin · Accepted Answer

|A- 1 ⋅ a d j (B- 1) ⋅ a d j (2 A- 1)|=(1/|A|)⋅ (|B- 1|)2(|2 A- 1|)2 =(1/|A|)× (1/|B|2)⋅ (26/|A|2)=(26/33 ⋅ 22)=(16/27)

Q. Let $A$ and $B$ be two square matrices of order $3$ such that $∣ A ∣ = 3$ and $∣ B ∣ = 2$ , then the value of $∣ ∣ A^{- 1} \cdot a d j (B^{- 1}) \cdot a d j (2 A^{- 1}) ∣ ∣$ is equal to (where $a d j (M)$ represents the adjoint matrix of $M$ )

72

$\frac{64}{27}$

$\frac{8}{9}$

$\frac{16}{27}$

Q. Let A and B be two square matrices of order 3 such that ∣A∣=3 and ∣B∣=2 , then the value of ∣∣​A−1⋅adj(B−1)⋅adj(2A−1)∣∣​ is equal to (where adj(M) represents the adjoint matrix of M )

72

2764​

98​

2716​

∣∣​A−1⋅adj(B−1)⋅adj(2A−1)∣∣​=∣A∣1​⋅(∣∣​B−1∣∣​)2(∣∣​2A−1∣∣​)2 =∣A∣1​×∣B∣21​⋅∣A∣226​=33⋅2226​=2716​

Q. Let $A$ and $B$ be two square matrices of order $3$ such that $∣ A ∣ = 3$ and $∣ B ∣ = 2$ , then the value of $∣ ∣ A^{- 1} \cdot a d j (B^{- 1}) \cdot a d j (2 A^{- 1}) ∣ ∣$ is equal to (where $a d j (M)$ represents the adjoint matrix of $M$ )

$\frac{64}{27}$

$\frac{8}{9}$

$\frac{16}{27}$