Newton's Diverging Parabolas
Curves with Cartesian equation
| ay^2=x(x^2-2bx+c) |
with a>0. The above equation represents the third class of Newton's classification of cubic curves, which Newton divided into five species depending on the roots of the cubic in x on the right-hand side of the equation. Newton described these cases as having the following characteristics:
1. "All the roots are real and unequal. Then the Figure is a diverging Parabola of the form of a Bell, with an Oval at its Vertex.
2. Two of the roots are equal. A parabola will be formed, either Nodated by touching an Oval, or Punctate, by having the Oval infinitely small.
3. The three roots are equal. This is the semicubical parabola.
4. Only one real root. If two of the roots are impossible, there will be a Pure parabola of a Bell-like Form"
(MacTutor Archive).
Explore with Wolfram|Alpha
More things to try:
References
MacTutor History of Mathematics Archive. "Newton's Diverging Parabolas." https://mathshistory.st-andrews.ac.uk/Curves/Newtons/.Referenced on Wolfram|Alpha
Newton's Diverging ParabolasCite this as:
Weisstein, Eric W. "Newton's Diverging Parabolas." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/NewtonsDivergingParabolas.html