Difference between revisions of "Euler's spiral (Clothoid)"

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The curve can be described in parametric form by
The curve can be described in parametric form by
:<math> x = \int_0^t \sin(\frac{u^2}{2}) du\; </math>
:<math> x = k\cdot\int_0^t \sin(\frac{u^2}{2}) du\; </math>
:<math> y = \int_0^t \cos(\frac{u^2}{2}) du\; </math>
:<math> y = k\cdot\int_0^t \cos(\frac{u^2}{2}) du\; </math>
<jsxgraph width="500" height="500" box="box2">
<jsxgraph width="500" height="500" box="box2">

Revision as of 10:35, 18 March 2009

Euler spiral is defined as a curve whose curvature changes linearly with its curve length. Other names for the spiral are clothoid and spiral of Cornu or Cornu spiral.

Euler spirals are widely used as transition curve in rail track / highway engineering for connecting and transiting the geometry between a tangent and a circular curve.

The curve can be described in parametric form by

[math] x = k\cdot\int_0^t \sin(\frac{u^2}{2}) du\; [/math]
[math] y = k\cdot\int_0^t \cos(\frac{u^2}{2}) du\; [/math]

The JavaScript code to produce this picture

<jsxgraph width="500" height="500" box="box2">
 b2 = JXG.JSXGraph.initBoard('box2', {originX: 250, originY: 250, unitX: 25, unitY: 25});
 var k1 = b2.createElement('slider', [[1,8],[5,8],[0,2,8]]);
 var len = b2.createElement('slider', [[1,7],[5,7],[1,2,3.2]]);
 var c = b2.createElement('curve', 
             [function(t){ return k1.Value()*b2.I([0,t],function(u){return Math.sin(u*u*0.5);}); }, 
              function(t){ return k1.Value()*b2.I([0,t],function(u){return Math.cos(u*u*0.5);}); },
              function(){return -len.Value()*Math.PI;}, function(){return len.Value()*Math.PI;}],

External links