Talk:Conic section

Latest comment: 3 months ago by Jacobolus in topic Parabola equation in image is wrong

Edit request to Conics Intersection paragraph, 29 November 2010

edit

{{edit semi-protected}} Please add the reference to this MATLAB Central URL containing the code to detect conics intersection:

http://www.mathworks.com/matlabcentral/fileexchange/28318-conics-intersection

Pierluigi (talk) 8:52, 29 November 2010 (UTC)

Why does "semilatus rectum" redirect here?

edit

What does it mean? Term not used in article. Equinox 23:15, 24 October 2022 (UTC)Reply

To quote the article, "The latus rectum is the chord parallel to the directrix and passing through a focus; its half-length is the semi-latus rectum ()."jacobolus (t) 00:24, 25 October 2022 (UTC)Reply

Semi-protected edit request on 25 November 2022

edit

change "ooooooo" to "usually" in the section "intersection at infinity" Atobi16 (talk) 10:57, 25 November 2022 (UTC)Reply

"oooooooo" removed. D.Lazard (talk) 12:37, 25 November 2022 (UTC)Reply

The section about homogeneous coordinates may be confusing

edit

It did confuse me, anyway. It starts with :

> In homogeneous coordinates a conic section can be represented as:

  

But that is the equation of a surface, not a curve. In fact, if I'm not mistaken it's the equation of the cone of whom the conic is a section with a plan. It's easy to see when we notice that the matrix is symmetric and thus can be diagonalized by an orthogonal matrix, with real eigenvalues. Necessarily at least one eigenvalue is negative (otherwise we have a sphere of nul radius, that is just a point), and we have the equation of a cone.

I think this ought to be clarified. Grondilu (talk) 05:37, 22 December 2022 (UTC)Reply

You have to know what homogeneous coordinates and homogeneous polynomials are first. We have the implicit curve:
 
But this has 1 term of degree 0, 2 terms of degree 1, and 3 terms of degree 2.
By adding new variables   and replacing   and   (after this replacement the   here now stand for something slightly different than the originals), we get:
 
Then by multiplying everything by   we can make the polynomial on the left hand side homogeneous (every term has degree 2):
 
This is still intended to represent the same implicit curve as the original. We are just using a different coordinate system. –jacobolus (t) 05:58, 22 December 2022 (UTC)Reply
You're right. I guess I forgot that in homogeneous coordinates, there is one additional dimension so the equation looks like it's one dimension larger (a surface instead of a curve, in that case). I suppose the section as it is now is fine, then.--Grondilu (talk) 11:17, 22 December 2022 (UTC)Reply
Maybe someone who is an expert (not me) can still try to clarify and elaborate, explaining why we want the polynomial to be homogeneous and what else we can do with it. –jacobolus (t) 17:37, 22 December 2022 (UTC)Reply

Parabola equation in image is wrong

edit

In the section "euclidean standard forms". Should be "y^2 = 4ax", not "y = 4ax"

187.116.67.44 (talk) 00:04, 14 August 2024 (UTC)Reply

Thanks, that was my typo, when I made a higher-resolution version of the image. Fixed. –jacobolus (t) 01:41, 14 August 2024 (UTC)Reply