- Sep 10, 2004
- 10,507
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***Instead of x1, x2, x3, I'll use x, y, z since there aren't really subscripts here***
x + y = 3
x + (k^2-8)y = k
So, by reducing it, I got it to
x + y = 3
x + (k^2-9)y = k-3
in which equation 2 is able to be reduced to
(k+3)y = 1
So now I am trying to find out when the system has no solution, a unique solution, and infinitely many...
Right now, I've figured that for no solution, k would have to be -3.
As for the unique solution, I believe that the answer should be all reals except -3.
For infinitely many, I'm trying to think logically, but I can't seem to find an answer to when that's the case... since this is in R2...
Thanks for helping.
x + y = 3
x + (k^2-8)y = k
So, by reducing it, I got it to
x + y = 3
x + (k^2-9)y = k-3
in which equation 2 is able to be reduced to
(k+3)y = 1
So now I am trying to find out when the system has no solution, a unique solution, and infinitely many...
Right now, I've figured that for no solution, k would have to be -3.
As for the unique solution, I believe that the answer should be all reals except -3.
For infinitely many, I'm trying to think logically, but I can't seem to find an answer to when that's the case... since this is in R2...
Thanks for helping.
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