Smith also extended Gauss's theorem on real quadratic forms to complex quadratic forms.
Find the 2 roots and a continued fraction for a root of these quadratic equations.
He was able to use his methods to prove many results in the theory of quadratic forms and number theory.
If f = 0, then the quartic in y is actually a quadratic equation in the variable y 2.
In 1826 Cauchy, in the context of quadratic forms in n variables, used the term ‘tableau’ for the matrix of coefficients.
For that matter quadratics aren't all that tough.
The thought that quadratics are now seen as ‘high brow’ really does, once again, make me despair.
The sparseness of the quadratics is what is important here.
This is certainly possible and the Babylonians' understanding of quadratics adds some weight to the claim.
Historically, imaginary numbers first came to light when trying to solve cubic equations, rather than quadratics .