Center-line of a conic section

We say that the center-line is conjugated to the direction defined by the ideal point.

Corollaries

• A center-line of a non-degenerated conic section is the tangent chord of an ideal point.
• If an asymptote is not the ideal line, it is a center-line conjugated to its own direction.
• A center-line conjugated to a non-asymptotic direction is the set of all the midpoints of the chords with that direction.
• All center-lines of a non-degenerated parabola are parallel (With the ideal line as only exception). They all contain the ideal point of the parabola.

Definitions

• A center-line conjugated to the direction of a chord, is conjugated to the chord itself.
• A center-line conjugated to the direction of a tangent line, is conjugated to the tangent line itself.

Conjugated directions

Formula for conjugated directions

 
        (r1,s1,0) and (r2,s2,0) are conjugated directions
<=>
        r1.Fx' (r2,s2,0) + s1. Fy' (r2,s2,0) = 0
<=>
        r1.(a r2 + b" s2) + s1.(b" r2 + a' s2) = 0
<=>
        a r1 r2 + b"(r1 s2 + s1 r2) + a' s1 s2 = 0

Conjugated center-lines of a ellipse or hyperbola

Corollaries:

• Two conjugated center-lines are harmonic conjugated lines with respect to the asymptotes.
• If two lines are harmonic conjugated lines with respect to the asymptotes, then these lines are two conjugated center-lines.
• Two conjugated center-lines are coinciding if and only if they are coinciding with an asymptote.
• Two conjugated center-lines of a circle are orthogonal.

Information Provided by Johan.Claeys@ping.be