Foci are at \displaystyle{\left({0},\pm\sqrt{{3}}\right)} . See foci-marked graph,. Explanation: The equation is in the standard form \displaystyle\frac{{x}^{{2}}}{{b}^{{2}}}+\frac{{y}^{{2}}}{{a}^{{2}}}={1.} ...

Focus \displaystyle{\left(-{5},-{4}\right)} , and Vertex \displaystyle{\left(-{6},-{4}\right)} and Directrix \displaystyle{x}=-{7} Explanation: From the given \displaystyle{x}=\frac{{1}}{{4}}{y}^{{2}}+{2}{y}-{2} ...

\displaystyle-{1} . Explanation: By the power rule: \displaystyle\frac{{1}}{{4}}{x}^{{-\frac{{3}}{{4}}}}+\frac{{1}}{{4}}{y}^{{-\frac{{3}}{{4}}}}{\left(\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}\right)}={0} ...

The focus is, \displaystyle{\left({0},-{2}\right)} Explanation: Rewrite the equation as: \displaystyle{x}=-\frac{{1}}{{4}}{\left({y}--{2}\right)}^{{2}}+{1} Please observe that this is "x" ...

\displaystyle{\left(\frac{{{3}{x}^{{-{{1}}}}}}{{{9}{y}^{{2}}}}\right)}^{{-{{2}}}}={9}{x}^{{2}}{y}^{{4}} Explanation: You will need the following index laws (1) \displaystyle{\left(\frac{{x}}{{y}}\right)}^{{a}}=\frac{{x}^{{a}}}{{y}^{{a}}} ...

Points on the curve y=\sin x that have tangent lines through the origin satisfy: \text{slope of curve at (x,y) is } \dfrac{y}{x} = \dfrac{\sin x}{x}. By simple differentiation, the slope of ...