Repeated game: Difference between revisions

Revision as of 13:26, 13 June 2013

A Spring

A left-handed and a right-handed spring.

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.Potter or Ceramic Artist Truman Bedell from Rexton, has interests which include ceramics, best property developers in singapore developers in singapore and scrabble. Was especially enthused after visiting Alejandro de Humboldt National Park.

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

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+[[Image:Spring2.png|frame|A Spring]]
+[[Image:Helix.png|frame|A left-handed and a right-handed spring.]]
+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]].{{Citation needed|date=May 2009}}
+==Definition==
+A spring wrapped around the z-[[Coordinate axis|axis]] can be defined parametrically by:
+:<math>x(u, v) = \left(R + r\cos{v}\right)\cos{u}, </math>
+:<math>y(u, v) = \left(R + r\cos{v}\right)\sin{u}, </math>
+:<math>z(u, v) = r\sin{v}+{P\cdot u \over \pi}, </math>
+where
+:<math>u \in [0,\ 2n\pi)\ \left(n \in \mathbb{R}\right),</math>
+:<math>v \in [0,\ 2\pi),</math>
+:<math>R \,</math> is the distance from the center of the tube to the center of the [[helix]],
+:<math>r \,</math> is the radius of the tube,
+:<math>P \,</math> is the speed of the movement along the z axis (in a [[Right-hand rule|right-handed]] [[Cartesian coordinate system]], positive values create right-handed springs, whereas negative values create left-handed springs),
+:<math>n \,</math> is the number of rounds in circle.
+The [[implicit function]] in Cartesian coordinates for a spring wrapped around the z-[[Coordinate axis|axis]], with <math>n</math> = 1 is
+:<math>\left(R - \sqrt{x^2 + y^2}\right)^2 + \left(z + {P \arctan(x/y) \over \pi}\right)^2 = r^2.</math>
+The interior [[volume]] of the spiral is given by
+:<math>V = 2\pi^2 n R r^2 = \left( \pi r^2 \right) \left( 2\pi n R \right). \,</math>
+==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<ref>{{cite web |url=http://mathworld.wolfram.com/Helix.html | title=http://mathworld.wolfram.com/Helix.html}}</ref> increases (ratio of the speed  <math>P \,</math> 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==
+{{reflist}}
+==See also==
+*[[spiral]]
+*[[helix]]
+[[Category:Surfaces]]

Repeated game: Difference between revisions

Revision as of 13:26, 13 June 2013

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Repeated game: Difference between revisions

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