Tschirnhausen Cubic Catacaustic: Difference between revisions
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}, | }, | ||
function(){ | function(){ | ||
var a = dir.stdform[1], b = dir.stdform[2], | |||
t = reflectionpoint.position, | |||
u = JXG.Math.Numerics(cubic.X)(t), | |||
v = JXG.Math.Numerics(cubic.Y)(t); | |||
return -v; | |||
}, | }, | ||
function(){ | function(){ | ||
var a = dir.stdform[1], b = dir.stdform[2], | |||
t = reflectionpoint.position, | |||
u = JXG.Math.Numerics(cubic.X)(t), | |||
v = JXG.Math.Numerics(cubic.Y)(t); | |||
return u; | |||
} | } | ||
],{strokeWidth:1}); | ],{strokeWidth:1}); |
Revision as of 13:47, 13 January 2011
The Tschirnhausen cubic (black curve) is defined parametrically as
- [math]\displaystyle{ x = a3(t^2-3) }[/math]
- [math]\displaystyle{ y = at(t^2-3) }[/math]
Its catcaustic (red curve) with radiant point [math]\displaystyle{ (-8a,p) }[/math] is the semicubical parabola with parametric equations
- [math]\displaystyle{ x = a6(t^2-1) }[/math]
- [math]\displaystyle{ y = a4t^3 }[/math]
References
The underlying JavaScript code
var brd = JXG.JSXGraph.initBoard('jxgbox',{boundingbox:[-10,10,10,-10], keepaspectratio:true, axis:true});
brd.suspendUpdate();
var a = brd.create('slider',[[-5,6],[5,6],[-5,1,5]], {name:'a'});
var cubic = brd.create('curve',
[function(t){ return a.Value()*3*(t*t-3);},
function(t){ return a.Value()*t*(t*t-3);},
-5, 5
],
{strokeWidth:1, strokeColor:'black'});
var radpoint = brd.create('point',[function(){ return -a.Value()*8;},0],{name:'radiant point'});
var cataustic = brd.create('curve',
[function(t){ return a.Value()*6*(t*t-1);},
function(t){ return a.Value()*4*t*t*t;},
-4, 4
],
{strokeWidth:1, strokeColor:'red'});
brd.unsuspendUpdate();