\displaystyle{\left(-\frac{{1}}{{12}},-\frac{{71}}{{12}}\right)} Explanation: Write the equation in vertex form as follows: y= \displaystyle-{12}{\left({x}^{{2}}+\frac{{x}}{{6}}\right)}-{6} ...

\displaystyle{y}=\frac{{x}^{{2}}}{{4}}-\frac{{x}}{{2}}-\frac{{11}}{{4}} Explanation: STANDARD FORM: \displaystyle{y}={a}{x}^{{2}}+{b}{x}+{c} Make \displaystyle{x}^{{2}}-{2}{x}-{4}{y}-{11}={0} ...

The distance from (x,y) to (5,0) is sqrt((x-5)^2 + y^2) and y^2 = 2x^2 - 2x. To simplify the problem maximise the square of the distance. Therefore differentiate z = (x-5)^2 + 2x^2 - 2x. The ...

\displaystyle{2}{y}^{{2}}-{x}-{8}{y}+{5}={0} is a parabola with a horizontal axis of symmetry and a standard form: \displaystyle{x}={2}{y}^{{2}}-{8}{y}+{5} Explanation: The general standard ...

This is an ellipse, \displaystyle\frac{{\left({x}+\frac{{1}}{{18}}\right)}^{{2}}}{{\frac{{2917}}{{2916}}}}+\frac{{y}^{{2}}}{{\frac{{2917}}{{648}}}}={1} Explanation: Let's rewrite the equation \displaystyle{9}{x}^{{2}}+{2}{y}^{{2}}+{x}-{9}={0} ...

A parabola. Explanation: Please read the reference regarding Conic Sections . The given equation: \displaystyle{4}{x}^{{2}}-{9}{x}+{y}-{5}={0}\ \text{ [1]} Matches the equation in the ...