I have a complex polynomial:
u+h=t*-((u-tc^2)/(2tc)) + ((u-tc^2)/c)*-((u-tc^2)/(2tc))
...where everything except
t is a constant.
I can see this is a polynomial, and I know how to ask wolframalpha to solve for
t, but I'd like a way to rearrange this equation in the classic quadratic form, with WA giving me the values of the coefficients:
0 = at^2 + tx + c
Is that possible?