I remember reading somewhere (maybe someone can help remember where), that there is a method that is the fastest for evaluating a polynomial. Something reminds me that it had something to do with Vietta's formula, or the fact that the 0-power coefficient is the product of the 0-power coefficients of any factors of the polynomial.
I know wikipedia says it's Horner's scheme for evaluating fastest. But I recall that you actually did not have to evaluate in that way at all - it had something with the roots?
All I know for sure is that there was a method for evaluating a polynomial that has gives you a "oh that is clever" kind of feeling when you see it, but it's not too difficult and is kind of obvious.
Anyone kind or smart enough to help me out?
It is something along the lines of "you can evaluate P at x by ... " and then there is a really simple little thing that actually avoid having to do any real additions and multiplications on the order of the polynomial degree.