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I am fully aware of the mathematical definition of either and how they relate to conic sections.

Still, I wonder whether there is an easy way to see that these are fundamentally different curves. By "easy way" I mean just by looking at it or by an easy "experiment" or something (no calculation).

Note that I'd be satisfied with any difference. I don't need a proof that they are actually a hyperbola/parabola.

Concretely I have a light shining on a wall (a light cone intersecting with a wall) and would like to interest a 4th grader to the different conic sections that you can see there.

Mike Pierce
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user1583209
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    See if my answer here can be of help: https://math.stackexchange.com/questions/3457969/how-we-can-differentiate-between-the-shapes-of-a-parabola-and-a-hyperbola – Intelligenti pauca Dec 12 '19 at 14:57

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The most easily discernable visible difference that I can think of is that hyperbolas have asymptotes: A pair of (non-parallel) straight lines that they come closer and closer to as you move away to infinity.

For a parabola, on the other hand, the two "ends" come closer and closer to being parallel as you move towards infinity, and there is no straight line they approach.

Arthur
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A parabola is made of a single connected curve. A hyperbola has two of them.

enter image description here

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    True, but this does not help for my light cone situation, does it? – user1583209 Dec 12 '19 at 14:54
  • @user1583209: use a double lamp. In fact the difference is barely perceivable, unless you have a sufficient section with low curvature. –  Dec 12 '19 at 14:55