Pole and polar explained

In geometry, a pole and polar are respectively a point and a line that have a unique reciprocal relationship with respect to a given conic section.

Polar reciprocation in a given circle is the transformation of each point in the plane into its polar line and each line in the plane into its pole.

Properties

Pole and polar have several useful properties:

If a point P lies on the line l, then the pole L of the line l lies on the polar p of point P.
If a point P moves along a line l, its polar p rotates about the pole L of the line l.
If two tangent lines can be drawn from a pole to the conic section, then its polar passes through both tangent points.
If a point lies on the conic section, its polar is the tangent through this point to the conic section.
If a point P lies on its own polar line, then P is on the conic section.
Each line has, with respect to a non-degenerated conic section, exactly one pole.

Special case of circles

Polar reciprocation

See main article: Correlation (projective geometry).

The concepts of a pole and its polar line were advanced in projective geometry. For instance, the polar line can be viewed as the set of projective harmonic conjugates of a given point, the pole, with respect to a conic. The operation of replacing every point by its polar and vice versa is known as a polarity.

A polarity is a correlation that is also an involution.

For some point P and its polar p, any other point Q on p is the pole of a line q through P. This comprises a reciprocal relationship, and is one in which incidences are preserved.^[1]

General conic sections

The concepts of pole, polar and reciprocation can be generalized from circles to other conic sections which are the ellipse, hyperbola and parabola. This generalization is possible because conic sections result from a reciprocation of a circle in another circle, and the properties involved, such as incidence and the cross-ratio, are preserved under all projective transformations.

Calculating the polar of a point

A general conic section may be written as a second-degree equation in the Cartesian coordinates (x, y) of the plane

$A_ x^2 + 2 A_ xy + A_ y^2 + 2 B_ x + 2 B_ y + C = 0$

where A_xx, A_xy, A_yy, B_x, B_y, and C are the constants defining the equation. For such a conic section, the polar line to a given pole point is defined by the equation

$D x + E y + F = 0\,$

where D, E and F are likewise constants that depend on the pole coordinates

$\begin D &= A_ \xi + A_ \eta + B_ \\ E &= A_ \xi + A_ \eta + B_ \\ F &= B_ \xi + B_ \eta + C\end$

Calculating the pole of a line

The pole of the line

Dx+Ey+F=0

, relative to the non-degenerated conic section

A_ x^ + 2 A_ xy + A_ y^ + 2 B_ x + 2 B_ y + C = 0

can be calculated in two steps.

First, calculate the numbers x, y and z from

$\begin x \\ y \\ z\end = \begin A_ & A_ & B_ \\ A_ & A_ & B_ \\ B_ & B_ & C\end^ \begin D \\ E \\ F\end$

Now, the pole is the point with coordinates

\left(

	x
	z

	y
	z

\right)

Tables for pole-polar relations

Pole-polar relation for an ellipse
Pole-polar relation for a hyperbola
Pole-polar relation for a parabola

conic

equation

polar of point

P=(x_0,y₀₎

circle

x²+y²=r²

x₀x+y₀y=r²

ellipse

\left(	x
	a

\right)²+\left(

	y
	b

\right)²=1

	x₀x
	a²

	y₀y
	b²

hyperbola

\left(	x
	a

\right)²-\left(

	y
	b

\right)²=1

	x₀x
	a²

	y₀y
	b²

parabola

y=ax²

y+y₀=2ax_0x

conic

equation

pole of line

circle

x²+y²=r²

\left(

	r²u
	w

	r²v
	w

\right)

ellipse

\left(	x
	a

\right)²+\left(

	y
	b

\right)²=1

\left(

	a²u
	w

	b²v
	w

\right)

hyperbola

\left(	x
	a

\right)²-\left(

	y
	b

\right)²=1

\left(

	a²u
	w

, -

	b²v
	w

\right)

parabola

y=ax²

\left(-

	u
	2av

, -

	w
	v

\right)

Via complete quadrangle

In projective geometry, two lines in a plane always intersect. Thus, given four points forming a complete quadrangle, the lines connecting the points cross in an additional three diagonal points.

Given a point Z not on conic C, draw two secants from Z through C crossing at points A, B, D, and E. Then these four points form a complete quadrangle, and Z is at one of the diagonal points. The line joining the other two diagonal points is the polar of Z, and Z is the pole of this line.^[2]

Applications

Poles and polars were defined by Joseph Diaz Gergonne and play an important role in his solution of the problem of Apollonius.^[3]

In planar dynamics a pole is a center of rotation, the polar is the force line of action and the conic is the mass–inertia matrix.^[4] The pole–polar relationship is used to define the center of percussion of a planar rigid body. If the pole is the hinge point, then the polar is the percussion line of action as described in planar screw theory.

Bibliography

Book: Johnson RA . 1960 . Advanced Euclidean Geometry: An Elementary treatise on the geometry of the Triangle and the Circle . Dover Publications . New York . 100 - 105.
Book: Geometry Revisited . limited . Coxeter HSM, Greitzer SL. 1967 . . . 978-0-88385-619-2 . 132 - 136, 150.
Book: Gray J J . 2007 . Worlds Out of Nothing: A Course in the history of Geometry in the 19th century . limited . Springer Verlag . London . 978-1-84628-632-2 . 21.
Book: . 1961 . Mathematical Handbook for Scientists and Engineers . McGraw-Hill . New York . 43 - 45 . 59014456. The paperback version published by Dover Publications has the .
Book: Wells D . 1991 . The Penguin Dictionary of Curious and Interesting Geometry . Penguin Books . New York . 0-14-011813-6 . 190 - 191 .

External links

Interactive animation with multiple poles and polars at Cut-the-Knot
Interactive animation with one pole and its polar
Interactive 3D with coloured multiple poles/polars - open source
- - - - Tutorial at Math-abundance

Notes and References

Edwards, Lawrence; Projective Geometry, 2nd Edn, Floris (2003). pp. 125-6.
[G. B. Halsted]
Web site: Apollonius' Problem: A Study of Solutions and Their Connections . 2013-06-04.
http://helix.gatech.edu/Papers/1999/AlexiouThesis.pdf John Alexiou Thesis, Chapter 5, pp. 80–108

Pole and polar explained

Properties

Special case of circles

Polar reciprocation

General conic sections

Calculating the polar of a point

Calculating the pole of a line

Tables for pole-polar relations

Via complete quadrangle

Applications

See also

Bibliography

External links

Notes and References