The vertex \displaystyle={\left(-\frac{{3}}{{4}},-\frac{{1}}{{4}}\right)} The focus is \displaystyle={\left(-\frac{{3}}{{5}},-\frac{{3}}{{16}}\right)} The equation of the directrix is \displaystyle{y}=-\frac{{5}}{{16}} ...

centre \displaystyle{\left(-{1},{3}\right)} radius \displaystyle{r}=\sqrt{{9}}={3} intercepts: \displaystyle{\left(-{1},{0}\right)},{\left({0},{3}\pm{2}\sqrt{{2}}\right)} ...

This a circle with center \displaystyle{\left(-{3},{8}\right)} , radius \displaystyle{7} , and standard form: \displaystyle{\left(\text{XXX}\right)}{\left({x}-{\left(-{3}\right)}\right)}^{{2}}+{\left({y}-{8}\right)}^{{2}}={7}^{{2}} ...

Vertex: \displaystyle{\left(-{2},{1}\right)} Axis of symmetry: \displaystyle{x}=-{2} Explanation: Given \displaystyle{\left(\text{XXX}\right)}{x}^{{2}}+{4}{x}-{6}{y}+{10}={0} with ...

\displaystyle{r}^{{2}}=\frac{{7}}{{{1}+\frac{{5}}{{2}}{\sin{{2}}}\theta}} Explanation: To convert from Cartesian to Polar coordinates use the following formulae which link them. \displaystyle•{x}={r}{\cos{\theta}},{y}={r}{\sin{\theta}} ...

\displaystyle{x}^{{2}}+{6}{x}-{2}{y}+{13}={0} is a parabola. Explanation: Let the equation be of the type \displaystyle{A}{x}^{{2}}+{B}{x}{y}+{C}{y}^{{2}}+{D}{x}+{E}{y}+{F}={0} then if \displaystyle{B}^{{2}}-{4}{A}{C}={0} ...