Ok not totally sure if this is correct but i think so...
x / (1-x
2) = kx
x = kx(1 - x
2)
x = kx - kx
3
kx
3 - kx + x = 0
x(kx
2 - k + 1) = 0
x = 0 is one root,
kx
2 + 1- k = 0
so for three distinct roots, discriminant > 0
(0)
2 - 4k(1-k) > 0
-4k(1-k) > 0
4k(1-k) < 0
So now using that quadratic solving thingo...
### ____
# # / # # \
----*--------*-------
##/ # # # #\
___0_____1____
so if k > 1, solution holds true, k < 0 solution holds true (by testing both inside and outside of the parabola)
hence k > 1, and k < 0 are the solutions if the original express has 3 distinct roots
If you wanna solve it graphically you first need to sketch y = x / (1-x^2) :
Then draw a line y = kx, where k varies. (itd be best to use your ruler or something, and its easier to do algebraicly)
View attachment 13251
You can clearly see from the graph that for all negative gradients (k < 0) the solution will have three roots. for all values of k, the expression has the root x = 0 (as seen in the algebraic steps), but for values of k > 1, again the expression has three roots.
