Negative pedal curve

In geometry, a negative pedal curve is a plane curve that can be constructed from another plane curve C and a fixed point P on that curve. For each point X ≠ P on the curve C, the negative pedal curve has a tangent that passes through X and is perpendicular to line XP. Constructing the negative pedal curve is the inverse operation to constructing a pedal curve.

Circle — negative pedal curve of a limaçon

Definition

In the plane, for every point X other than P there is a unique line through X perpendicular to XP. For a given curve in the plane and a given fixed point P, called the pedal point, the negative pedal curve is the envelope of the lines XP for which X lies on the given curve.

Parameterization

For a parametrically defined curve, its negative pedal curve with pedal point (0; 0) is defined as

X[x,y]={\frac {(x^{2}-y^{2})y'-2xyx'}{xy'-yx'}}

Y[x,y]={\frac {(x^{2}-y^{2})x'+2xyy'}{xy'-yx'}}

Properties

The negative pedal curve of a pedal curve with the same pedal point is the original curve.

External links

Negative pedal curve on Mathworld

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Differential transforms of plane curves
Unary operations	Evolute Involute Dual curve Inverse curve Parallel curve Isoptic
Unary operations defined by a point	Pedal & Contrapedal curves Negative pedal curve Pursuit curve Caustic
Unary operations defined by two points	Strophoid
Binary operations defined by a point	Roulette Cissoid
Operations on a family of curves	Envelope

Negative pedal curve

Definition

Parameterization

Properties

See also

External links