Given,
[14−14282814−14−142814]=(adj(adjA))
Now we know that ∣adjA∣=A2 if it is 3×3 matrix
So ∣adj(adjA)∣=∣adjA∣2
⇒∣A∣2×2=∣A∣4
Now, ∣A∣4=∣14−14282814−14−142814∣
⇒∣A∣4=143∣1−1221−1−121∣
⇒∣A∣4=143×(14)
∣A∣4=(14)4⇒∣A∣=14
The positive value of the determinant of the matrix A, whose Adj(Adj(A))=[14−14282814−14−142814], is ______.
Held on 27 Jun 2022 · Verified 6 Jul 2026.
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