User:Furryoats

test
$X:\N\to \R$

Angles(The spell to awaken Cthulhu)
Let $V$ be a vector such that
 * $V=(r,{P'(x)})$

Let the function $f : o \to o+1$ represent the subset of the values of $(x_n,f(x)_n)$.

Let the function $f : n \to n-1$ represent the exponent set of an arbitrarily chosen $n$-degree polynomial function.

Let $m$ and $n$ converge at zero and $m$ be sequenced as the additive inverse of $f : n \to n-1$.

Let the constant of integration $\displaystyle C=\int_{a}^{b} P^m \mathrm{d}{x}$

Let $P(x)$ be a polynomial function such that

The order of a polynomial function is equal to the number of vectors such that