How do you rearrange a quartic equation in the form of #ax^6 + bx^5+cx^4+dx^3+ex^2+fx+g# to vertex form (If possible)?
1 Answer
Jul 7, 2018
A few observations...
Explanation:
An equation is an expression that equates one thing to another, so would have to contain an equals sign somewhere.
The expression you have specified is a sextic (i.e. degree
It can be understood to describe a function of
Its graph can have a total of
An example would be the sextic Chebyshev polynomial of the first kind:
#T_6(x) = 32x^6-48x^4+18x^2-1#
graph{32x^6-48x^4+18x^2-1 [-2.5, 2.5, -1.25, 1.25]}