Radius of Curvature

The radius of curvature is given by

$\begin{displaymath} R\equiv {1\over\kappa}, \end{displaymath}$

(1)

where $\kappa$ is the Curvature. At a given point on a curve,

is the radius of the Osculating Circle. The symbol $\rho$ is sometimes used instead of

to denote the radius of curvature.

Let and be given parametrically by

$\displaystyle x$	$\textstyle =$	$\displaystyle x(t)$	(2)
$\displaystyle y$	$\textstyle =$	$\displaystyle y(t),$	(3)

then

$\begin{displaymath} R={(x'^2+y'^2)^{3/2}\over x'y''-y'x''}, \end{displaymath}$

(4)

where

and

. Similarly, if the curve is written in the form

, then the radius of curvature is given by

$\begin{displaymath} R={\left[{1+\left({dy\over dx}\right)^2}\right]^{3/2}\over {d^2y\over dx^2}}. \end{displaymath}$

(5)

References

Kreyszig, E. Differential Geometry. New York: Dover, p. 34, 1991.