Newton's root finding method: Difference between revisions
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A WASSERMANN (talk | contribs) No edit summary |
A WASSERMANN (talk | contribs) No edit summary |
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function xval() { | function xval() { | ||
for (i = 0; i < steps; i++) | for (i = 0; i < steps; i++) | ||
document.getElementById('xv' + i).innerHTML = brd. | document.getElementById('xv' + i).innerHTML = (brd.select('x_{' + i + '}').X()).toFixed(14); | ||
} | } | ||
Revision as of 15:33, 20 February 2013
xo is the start value. Drag it. You may change the function term here, Try also the following function terms:
The underlying JavaScript code
<table width="600" border="0" cellpadding="0" cellspacing="0">
x<sub>o</sub> is the start value. Drag it.
<p></p>
You may change the function term here:
<br>
<td><nobr>f(x) = </nobr></td>
<td>
<form>
<input style="border:none; background-color:#efefef;padding:5px;margin-left:2px;" type="text" id="graphterm" value="x*x*x/5" size="30"/>
<input type="button" value="set term" onClick="newGraph(document.getElementById('graphterm').value);">
</form>
</td>
<tr><td> </td></tr>
<script type="text/javascript">
// Initial function term
var term = function(x) { return x*x*x/5; };
var graph = function(x) { return term(x); };
// Recursion depth
var steps = 11;
// Start value
var s = 3;
for (i = 0; i < steps; i++) {
document.write('<tr><td><nobr>x<sub>' + i + '</sub> = </nobr></td><td><font id="xv' + i + '"></font></td></tr>');
}
</script>
</table>
var i;
var brd = JXG.JSXGraph.initBoard('jxgbox', {boundingbox:[-5,5,5,-5], axis:false});
var ax = brd.create('axis', [[0,0], [1,0]], {strokeColor: 'black'});
var ay = brd.create('axis', [[0,0], [0,1]], {strokeColor: 'black'});
var g = brd.create('functiongraph', [function(x){return graph(x);}],{strokeWidth: 2, dash:0});
var x = brd.create('glider',[s,0,ax], {name: 'x_{0}', strokeColor: 'magenta', fillColor: 'yellow'});
newGraph(document.getElementById('graphterm').value);
newton(x, steps, brd);
function xval() {
for (i = 0; i < steps; i++)
document.getElementById('xv' + i).innerHTML = (brd.select('x_{' + i + '}').X()).toFixed(14);
}
brd.addHook(xval);
function newton(p, i, board) {
board.suspendUpdate();
if(i>0) {
var f = board.create('glider',[function(){return p.X();}, function(){return graph(p.X())},g], {name: '', style: 3, strokeColor: 'green', fillColor: 'yellow'});
var l = board.create('line', [p,f],{strokeWidth: 0.5, dash: 1, straightFirst: false, straightLast: false, strokeColor: 'black'});
var t = board.create('tangent',[f],{strokeWidth: 0.5, strokeColor: '#0080c0', dash: 0});
var x = board.create('intersection',[ax,t,0],{name: 'x_{'+(steps-i+1) + '}', style: 4, strokeColor: 'magenta', fillColor: 'yellow'});
newton(x,--i, board);
}
board.unsuspendUpdate();
}
function newGraph(v) {
eval("term = function(x){ return "+v+";}");
graph = function(x) { return term(x); };
g.Y = function(x){ return term(x); };
g.updateCurve();
brd.update();
}