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Let Delta0 = |(a11, a12, a13), (a21, a22...

Let `Delta_0 = |(a_11, a_12, a_13), (a_21, a_22, a_23), (a_31, a_32, a_33)|`, (where `Delta_0 !=0`) and let `Delta_1` denote the determinant formed by the cofactors of elements of `Delta_0` and `Delta_2` denote the determinant formed by the cofactors at `Delta_1` and so on `Delta_n` denotes the determinant formed by the cofactors at `Delta_(n-1)` then the determinant value of `Delta_n` is (A) `(Delta_0)^(2n)` (B) `(Delta_0)^(2^n)` (C) `(Delta_0)^2` (D) `(Delta_0)^(n^2)`

A

` a_11 A_31+ a_12A_32+a_13A_33`

B

` a_11A_11+a_12A_21+a_13A_31`

C

` a_21A_11+a_22A_12+a_23A_13`

D

`a_11A_11+a_21A_21+a_31A_31`

Text Solution

Verified by Experts

The correct Answer is:
D
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