In geometry, an intrinsic equation of a curve is an equation that defines the curve using a relation between the curve's intrinsic properties, that is, properties that do not depend on the location and possibly the orientation of the curve. Therefore an intrinsic equation defines the shape of the curve without specifying its position relative to an arbitrarily defined coordinate system.
s
\theta
\kappa
\tau
The equation of a circle (including a line) for example is given by the equation
\kappa(s)=\tfrac{1}{r}
s
\kappa
r
These coordinates greatly simplify some physical problem. For elastic rods for example, the potential energy is given by
E=
L | |
\int | |
0 |
B\kappa2(s)ds
where
B
EI
\kappa(s)=d\theta/ds