\displaystyle={x}{\left({2}{x}-{3}{y}+{1}\right)} Explanation: The 2-D Taylor Expansion about \displaystyle{\left(\alpha,\beta\right)} is: \displaystyle{T}{\left({x},{y}\right)}={f{{\left(\alpha,\beta\right)}}}+{\left({x}-\alpha\right)}{{f}_{{{x}}}{\left(\alpha,\beta\right)}}+{\left({y}-\beta\right)}{{f}_{{{y}}}{\left(\alpha,\beta\right)}}+\frac{{{1}}}{{{2}!}}{\left({\left({x}-\alpha\right)}^{{{2}}}{{f}_{{{x}{x}}}{\left(\alpha,\beta\right)}}+{2}{\left({x}-\alpha\right)}{\left({y}-\beta\right)}{{f}_{{{x}{y}}}{\left(\alpha,\beta\right)}}+{\left({y}-\beta\right)}^{{{2}}}{{f}_{{{y}{y}}}{\left(\alpha,\beta\right)}}\right)}+\cdots ...

Multiply through by 4 and complete the square, (2x-3)^2 - 8 y^2 = 9, so that (2x-3)^2 + y^2 \equiv 0 \pmod 3. It follows that both (2x-3) and y are divisible by 3, therefore x as well. ...

There is an algorithm for solving P^T A P = D, where A is some given symmetric matrix, D is diagonal, while \det P = 1. See reference for linear algebra books that teach reverse Hermite ...

This relation is not a function. Explanation: Your relation is not a function. The reason for this is that you can find an \displaystyle{x} where \displaystyle{y} doesn't have a unique ...

\displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}=\frac{{{2}{x}}}{{{1}+{3}{y}^{{2}}}} Explanation: When we differentiate \displaystyle{y} wrt \displaystyle{x} we get \displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}} ...

Anything to the \displaystyle{x} will be growth, if it's \displaystyle{n}^{{-{x}}} then it'll be decay. Explanation: \displaystyle{n}^{{-{x}}}=\frac{{1}}{{n}^{{x}}} Therefore as \displaystyle{x} ...