The equation represents a circle of center \displaystyle{\left({4},{3}\right)} and radius \displaystyle\sqrt{{20}} Explanation: Let's rewrite the equation and complete the square \displaystyle{x}^{{2}}-{8}{x}+{y}^{{2}}-{6}{y}=-{5} ...

Rearrange into the form: \displaystyle{\left({x}-{4}\right)}^{{2}}+{\left({y}-{3}\right)}^{{2}}={2}^{{2}} to identify the centre \displaystyle{\left({4},{3}\right)} and radius \displaystyle{2} ...

This does not need calculus, just a theorem from euclidean geometry. The given circle has centre (4,3) and radius 1 unit. Further distance of (4,3) from (0,0)(centre of the other circle) is 5 ...

The center is \displaystyle{\left(\frac{{3}}{{2}},-{4}\right)} The radius is \displaystyle={6.185} Explanation: We have to rearrange the equation and complete the squares \displaystyle{x}^{{2}}+{y}^{{2}}-{3}{x}+{8}{y}={20} ...

\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 the equation of a circle, center \displaystyle={\left({5},{3}\right)} and radius \displaystyle{r}={3} Explanation: We rewrite the equation by completing the squares \displaystyle{x}^{{2}}+{y}^{{2}}-{10}{x}-{6}{y}+{25}={0} ...