mreditor16
Well-Known Member
- Joined
- Apr 4, 2014
- Messages
- 3,178
- Gender
- Male
- HSC
- 2014
Can someone show the way? 
-
Looking for HSC notes and resources? Check out our Notes & Resources page
Matrix Multiplication Proof Q (1 Viewer)
- Thread starter mreditor16
- Start date
VBN2470
Well-Known Member
Write out entries for A and X and perform the matrix multiplication for AX and XA respectively. Then equate the matrices and you should get values for you entries in A. Your A matrix should then be a scalar multiple of I. Not sure if there is a faster way.
mreditor16
Well-Known Member
- Joined
- Apr 4, 2014
- Messages
- 3,178
- Gender
- Male
- HSC
- 2014
Haha, yeh I tried that before you posted, but it went nowhere.....
Now what lol?
Now what lol?
You've shown that cg = hb. Since this must be true for ALL real choices of g and h, c must equal b, and both must be 0.Haha, yeh I tried that before you posted, but it went nowhere.....
Now what lol?
Now use this fact in the other equalities you can derive. You should end up being able to show that a, b, c and d are all equal, which is what we're aiming to show.
Edit: I mean, we should be able to show that a = d and b = c = 0.
Last edited:
VBN2470
Well-Known Member
You mean we're trying to show a and d are equal, whilst b = c = 0?
Last edited:
Yep, sorry. (b = c = 0 and a = d)
Last edited:
mreditor16
Well-Known Member
- Joined
- Apr 4, 2014
- Messages
- 3,178
- Gender
- Male
- HSC
- 2014
Wait, I don't get one part....
mreditor16
Well-Known Member
- Joined
- Apr 4, 2014
- Messages
- 3,178
- Gender
- Male
- HSC
- 2014
Since we are told that AX = XA for any choice of X, we must have cg = hb for any choice of g and h. g and h are free for us to choose (as we can let X be anything) and the equality must always be maintained. In order for this equality to be maintained for all choices of g and h (hence including non-zero choices), we need c = b = 0.
Last edited: