The Student Room Group
Reply 1
You know that A adj(A) = det(A) I, so take determinants:
det(A) det(adj(A)) = (det(A))^n

(I used det(AB)=det(A)det(B) and det(cA)=c^ndet(A).)

So if A is invertible then det(adj(A)) = (det(A))^(n-1). Otherwise det(adj(A))=0. Hence in both cases det(adj(A)) = (det(A))^(n-1).
Reply 2
dvs
You know that A adj(A) = det(A) I, so take determinants:
det(A) det(adj(A)) = (det(A))^n

(I used det(AB)=det(A)det(B) and det(cA)=c^ndet(A).)

So if A is invertible then det(adj(A)) = (det(A))^(n-1). Otherwise det(adj(A))=0. Hence in both cases det(adj(A)) = (det(A))^(n-1).


thanks that is helpful. one thing, where did you get the c^n from?
Reply 3
If you multiply each of the n rows by c, then you multiply the determinant by c n times.
Reply 4
dvs
If you multiply each of the n rows by c, then you multiply the determinant by c n times.


ok. but where does the c come from?!
Reply 5
Oh,
det(det(A) I) = (det(A))^n det(I)

And det(I) = 1.
A-1 = 1/det(A) * adj(A)


Take determinant of both sides
det(A-1) = det(1/det(A) * adj(A))


Simplify
det(A-1) = 1/det(A) * det(adj(A))
det(A) * det(A-1) = det(adj(A))

So as you can see, you just need to find det(A) in order to know det(adj(A))
(edited 9 years ago)
Original post by TeslerCoil
A-1 = 1/det(A) * adj(A)


Take determinant of both sides
det(A-1) = det(1/det(A) * adj(A))


Simplify
det(A-1) = 1/det(A) * det(adj(A))
det(A) * det(A-1) = det(adj(A))

So as you can see, you just need to find det(A) in order to know det(adj(A))
Note that the last post in this thread before yours is 8 years old. I suspect they are no longer waiting for an answer...
Original post by DFranklin
Note that the last post in this thread before yours is 8 years old. I suspect they are no longer waiting for an answer...

As OP reads it, a single tear rolls down their cheek. "If this answer had come just a week earlier, the world could have been saved!" they whisper, as across the globe the fires begin.
Original post by Smaug123
As OP reads it, a single tear rolls down their cheek. "If this answer had come just a week earlier, the world could have been saved!" they whisper, as across the globe the fires begin.
Well, except that dvs posted the correct answer 8 years ago...