The solution is written below

asked 2021-08-08

Find the equation of the graph for each conic in general form. Identify the conic, the center, the vertex, the co-vertex, the focus (foci), major axis, minor axis, \(\displaystyle{a}^{{2}}\), \(\displaystyle{b}^{{2}}\), and \(\displaystyle{c}^{{2}}\). For hyperbola,find the asymtotes.Sketch the graph

\(\displaystyle{9}{\left({y}-{3}\right)}^{{2}}-{4}{\left({x}+{5}\right)}^{{2}}={36}\)

\(\displaystyle{9}{\left({y}-{3}\right)}^{{2}}-{4}{\left({x}+{5}\right)}^{{2}}={36}\)

asked 2021-08-08

Find an equation of the conic described.Graph the equation.

Parabola; vertex at (0,0); directrix the line y=-3

Parabola; vertex at (0,0); directrix the line y=-3

asked 2021-05-17

Find an equation of the conic described.graph the equation. Parabola:focus(-1,4.5) vertex (-1,3).

asked 2021-08-08

Find the equations of the parabolas that share a vertex and a focus with the ellipse. Draw the conics. \(\displaystyle{25}{x}^{{2}}+{9}{y}^{{2}}={9}\)

asked 2021-01-25

asked 2020-11-24

\(\displaystyle{\left({a}\right)}{4}{x}^{2}-{9}{y}^{2}={12}{\left({b}\right)}-{4}{x}+{9}{y}^{2}={0}\)

\(\displaystyle{\left({c}\right)}{4}{y}^{2}+{9}{x}^{2}={12}{\left({d}\right)}{4}{x}^{3}+{9}{y}^{3}={12}\)

asked 2021-03-09

\(\displaystyle{e}={2},\)

\(\displaystyle{r}=-{2} \sec{\theta}.\)