Question

Explain degenerate case of the parabola with the help of a diagram.​

Answer 1

Answer:

answer :

The degenerate form of a parabola is a line or two parallel lines. For this conic section, the coefficients \begin{align*}A=B=C=0\end{align*} in the general equation. Thus, the resulting general equation is \begin{align*}Dx+Ey+F=0\end{align*}. The degenerate form of a hyperbola is two intersecting lines

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Answer 2

Answer:

The degenerate form of a parabola is a line or two parallel lines. For this conic section, the coefficients \begin{align*}A=B=C=0\end{align*} in the general equation. Thus, the resulting general equation is \begin{align*}Dx+Ey+F=0\end{align*}. The degenerate form of a hyperbola is two intersecting lines

DIAGRAM IN ATTACHMENT

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