Write your equation in form: \displaystyle\frac{{\left({y}-{y}_{{c}}\right)}^{{2}}}{{a}^{{2}}}-\frac{{\left({x}-{x}_{{c}}\right)}^{{2}}}{{b}^{{2}}}={1} where the center is \displaystyle{C}={\left({x}_{{c}},{y}_{{c}}\right)} ...

Center of the ellipse is \displaystyle{C}{\left({0},{0}\right)}{\quad\text{and}\quad} foci are \displaystyle{S}_{{1}}{\left({0},-\sqrt{{7}}\right)}{\quad\text{and}\quad}{S}_{{2}}{\left({0},\sqrt{{7}}\right)} ...

You have forgotten that the x y^2 term requires a product rule when differentiating

The vertices are at ( \displaystyle{0},{3} ) and ( \displaystyle{0},{1} ). The foci are at ( \displaystyle{0},{2}-\sqrt{{5}} ) and ( \displaystyle{0},{2}+\sqrt{{5}} ). The directrixes ...

Please see the explanation. Explanation: The center of a hyperbola with an equation of the general form: \displaystyle\frac{{\left({y}-{k}\right)}^{{2}}}{{a}^{{2}}}-\frac{{\left({x}-{k}\right)}^{{2}}}{{b}^{{2}}}={1}\ \text{ [1]} ...

If x=4, \frac{y^2}4=1+\frac{4^2}2=9\implies y=\pm6 Using Article 305 of this , the tangent of \frac{y^2}4-\frac{x^2}2=1 at (h,k) is \frac{y\cdot k}4-\frac{x\cdot h}2=1 Do you know how ...