2 Semi-latus rectum and polar coordinates

The semi-latus rectum of a conic section, usually denoted l, is the distance from the single focus, or one of the two foci, to the conic section itself, measured along a line perpendicular to the major axis. It is related to a and b by the formula .

In polar coordinates, a conic section with one focus at the origin and, if any, the other on the positive x-axis, is given by the equation

3 Applications

Conic sections are important in astronomy: the orbits of two massive objects that interact according to Newton's law of universal gravitation are conic sections if their common center of mass is considered to be at rest. If they are bound together, they will both trace out ellipses; if they are moving apart, they will both follow parabolas or hyperbolas. See two-body problem.

In projective geometry, the conic sections in the projective plane are equivalent to each other up to projective transformations.

4 Dandelin spheres

See Dandelin spheres for a short elementary argument showing that the characterization of these curves as intersections of a plane with a cone is equivalent to the characterization in terms of foci, or of a focus and a directrix.

5 Derivation

Let there be a cone whose axis is the z-axis. Let its vertex be the origin. The equation for the cone is

where

and is the angle which the generators of the cone make with respect to the axis. Notice that this cone is actually a pair of cones: one cone standing upside down on the vertex of the other cone -- or, as mathematicians say, this cone consists of two "nappes."

Let there be a plane with a slope running along the x direction but which is level along the y direction. Its equation is

where

and is the angle of the plane with respect to the x-y plane.

We are interested in finding the intersection of the cone and the plane, which means that equations (1) and (2) shall be combined. Both equations can be solved for z and then equate the two values of z. Solving equation (1) for z yields

therefore

Square both sides and expand the squared binomial on the right side,

Grouping by variables yields

Note that this is the equation of the projection of the conic section on the xy-plane, hence contracted in the x-direction compared with the shape of the conic section itself.

5.1 Derivation of the parabola

The parabola is obtained when the slope of the plane is equal to the slope of the generators of the cone. When these two slopes are equal, then the angles and become complementary. This implies that

therefore

Substituting equation (4) into equation (3) makes the first term in equation (3) vanish, and the remaining equation is

Multiply both sides by a²,

then solve for x,

Equation (5) describes a parabola whose axis is parallel to the x-axis. Other versions of equation (5) can be obtained by rotating the plane around the z-axis.

5.2 Derivation of the ellipse

An ellipse happens when the angles and , when added together, do not measure up to a right angle:

which implies that the tangent of the sum of these two angles is positive.

But a trigonometric identity states that

therefore

but m + a is positive, since the summands are given to be positive, so inequality (6) is positive if the denominator is also positive:

From inequality (7) we can deduce

Let us start out again from equation (3),

but this time the coefficient of the x² term does not vanish but is instead positive. Solve for y,

This would clearly describe an ellipse were it not for the second term under the radical, the 2 m b x: it would be the equation of a circle which has been stretched proportionally along the directions of the x-axis and the y-axis. Equation (8) is an ellipse but it is not obvious, so it will be rearranged further until it is obvious. Complete the square under the radical,

Group together the b² terms,

Divide by a then square both sides,

The x has a coefficient. It is desired to pull this coefficient out by factoring it out of the second term which is a square,

Further rearrangements of constants finally leads to

The coefficient of the y term is positive (for an ellipse). Renaming of coefficients and constants leads to

which is clearly the equation of an ellipse. That is, equation (9) describes a circle of radius R and center (C,0) which is then stretched vertically by a factor of . The second term on the left side (the x term) has no coefficient but is a square, so that it must be positive. The radius is a product of squares, so it must also be positive. The first term on the left side(the y term) has a coefficient which is positive, so the equation describes an ellipse.

5.3 Derivation of the hyperbola

The hyperbola happens when the angles and add up to an obtuse angle, which is greater than a right angle. The tangent of an obtuse angle is negative. All the inequalities which were valid for the ellipse become reversed. Therefore

Otherwise the equation for the hyperbola is the same as equation (9) for the ellipse, except that the coefficient A of the y term is negative. The sign change is enough to convert an ellipse into a hyperbola. This is because the equation of a real ellipse contains an imaginary hyperbola, and the equation of a real hyperbola contains an imaginary ellipse (see imaginary number). The sign change of coefficient A causes real and imaginary values of the function y=f(x) equivalent to equation (9) to swap.

6 See also

• Focus (geometry), an overview of properties of conic sections related to the foci.
• Quadrics are the higher-dimensional analogs of conics.
• Matrix representation of conic sections.
• Quadratic function.

7 External links

• Special plane curves: Conic sections
• http://mathworld.wolfram.com/Focus.html
• Occurrence of the conics in nature and elsewhere

Conic sections

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