Identify the conic section $$$\frac{17376 y^{2}}{25} = \frac{7}{2}$$$

Identify and find the properties of the conic section $$$\frac{17376 y^{2}}{25} = \frac{7}{2}$$$.

The general equation of a conic section is $$$A x^{2} + B x y + C y^{2} + D x + E y + F = 0$$$.

In our case, $$$A = 0$$$, $$$B = 0$$$, $$$C = \frac{17376}{25}$$$, $$$D = 0$$$, $$$E = 0$$$, $$$F = - \frac{7}{2}$$$.

The discriminant of the conic section is $$$\Delta = 4 A C F - A E^{2} - B^{2} F + B D E - C D^{2} = 0$$$.

Next, $$$B^{2} - 4 A C = 0$$$.

Since $$$\Delta = 0$$$, this is the degenerated conic section.

Since $$$B^{2} - 4 A C = 0$$$, the equation represents two parallel lines.

$$$\frac{17376 y^{2}}{25} = \frac{7}{2}$$$A represents a pair of the lines $$$y = - \frac{5 \sqrt{3801}}{4344}$$$, $$$y = \frac{5 \sqrt{3801}}{4344}$$$A.

General form: $$$\frac{17376 y^{2}}{25} - \frac{7}{2} = 0$$$A.

Factored form: $$$\left(4344 y - 5 \sqrt{3801}\right) \left(4344 y + 5 \sqrt{3801}\right) = 0$$$A.

Graph: see the graphing calculator.