Spring (mathematics)

In geometry, a spring is a surface in the shape of a coiled tube, generated by sweeping a circle about the path of a helix.

Definition

A spring wrapped around the z-axis can be defined parametrically by:

x(u,v)=\left(R+r\cos {v}\right)\cos {u},

y(u,v)=\left(R+r\cos {v}\right)\sin {u},

z(u,v)=r\sin {v}+{P\cdot u \over \pi },

where

u\in [0,\ 2n\pi )\ \left(n\in \mathbb {R} \right),

v\in [0,\ 2\pi ),

R\,

is the distance from the center of the tube to the center of the helix,

r \,

is the radius of the tube,

P\,

is the speed of the movement along the z axis (in a right-handed Cartesian coordinate system, positive values create right-handed springs, whereas negative values create left-handed springs),

n \,

is the number of rounds in circle.

The implicit function in Cartesian coordinates for a spring wrapped around the z-axis, with $n$ = 1 is

\left(R-{\sqrt {x^{2}+y^{2}}}\right)^{2}+\left(z+{P\arctan(x/y) \over \pi }\right)^{2}=r^{2}.

The interior volume of the spiral is given by

V=2\pi ^{2}nRr^{2}=\left(\pi r^{2}\right)\left(2\pi nR\right).\,

Other definitions

Note that the previous definition uses a vertical circular cross section. This is not entirely accurate as the tube becomes increasingly distorted as the Torsion^[1] increases (ratio of the speed $P\,$ and the incline of the tube).

An alternative would be to have a circular cross section in the plane perpendicular to the helix curve. This would be closer to the shape of a physical spring. The mathematics would be much more complicated.

The torus can be viewed as a special case of the spring obtained when the helix degenerates to a circle.

References

↑ "http://mathworld.wolfram.com/Helix.html". External link in |title= (help)

Spring (mathematics)

Definition

Other definitions

References

See also