Difference between revisions of "Vertex equations of a quadratic function and it's inverse"
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| + | A parabola can be uniquely defined by its vertex <math>V=(v_x, v_y)</math> and one more point <math>P=(p_x, p_y)</math>. | ||
| + | The function term of the parabola then has the form | ||
| + | |||
| + | :<math>y = a (x-v_x)^2 + v_y.</math> | ||
| + | |||
| + | <math>a</math> can be determined by solving | ||
| + | |||
| + | :<math>p_y = a (p_x-v_x)^2 + v_y</math> for <math>a</math> which gives | ||
| + | |||
| + | :<math> a = (p_y - v_y) / (p_x - v_x)^2 .</math> | ||
| + | |||
| + | |||
<jsxgraph width="300" height="300" box="box1"> | <jsxgraph width="300" height="300" box="box1"> | ||
(function() { | (function() { | ||
| Line 27: | Line 39: | ||
})(); | })(); | ||
</source> | </source> | ||
| + | |||
| + | ===Inverse quadratic function=== | ||
| + | Conversely, also the inverse quadratic function can be uniquely defined by its vertex <math>V</math> and one more point <math>P</math>. | ||
| + | The function term of the inverse function has the form | ||
| + | |||
| + | :<math>y = \sqrt{(x-v_x)/a} + v_y.</math> | ||
| + | |||
| + | <math>a</math> can be determined by solving | ||
| + | |||
| + | :<math>p_y = \sqrt{(p_x-v_x)/a} + v_y</math> for <math>a</math> which gives | ||
| + | |||
| + | :<math>a = (p_x - v_x) / (p_y - v_y)^2.</math> | ||
| + | |||
<jsxgraph width="300" height="300" box="box2"> | <jsxgraph width="300" height="300" box="box2"> | ||
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function(x) { | function(x) { | ||
var den = p.Y()- v.Y(), | var den = p.Y()- v.Y(), | ||
| − | a = (p.X() - v.X()) / (den * den); | + | a = (p.X() - v.X()) / (den * den), |
| − | return Math.sqrt((x - v.X()) / a) + v.Y(); | + | sign = (p.Y() >= 0) ? 1 : -1; |
| + | return sign * Math.sqrt((x - v.X()) / a) + v.Y(); | ||
}]); | }]); | ||
| Line 50: | Line 76: | ||
function(x) { | function(x) { | ||
var den = p.Y()- v.Y(), | var den = p.Y()- v.Y(), | ||
| − | a = (p.X() - v.X()) / (den * den); | + | a = (p.X() - v.X()) / (den * den), |
| − | return Math.sqrt((x - v.X()) / a) + v.Y(); | + | sign = (p.Y() >= 0) ? 1 : -1; |
| + | return sign * Math.sqrt((x - v.X()) / a) + v.Y(); | ||
}]); | }]); | ||
| − | |||
</source> | </source> | ||
Latest revision as of 16:18, 15 January 2021
A parabola can be uniquely defined by its vertex [math]V=(v_x, v_y)[/math] and one more point [math]P=(p_x, p_y)[/math]. The function term of the parabola then has the form
- [math]y = a (x-v_x)^2 + v_y.[/math]
[math]a[/math] can be determined by solving
- [math]p_y = a (p_x-v_x)^2 + v_y[/math] for [math]a[/math] which gives
- [math] a = (p_y - v_y) / (p_x - v_x)^2 .[/math]
JavaScript code
var b = JXG.JSXGraph.initBoard('box1', {boundingbox: [-5, 5, 5, -5], grid:true});
var v = b.create('point', [0,0], {name:'V'}),
p = b.create('point', [3,3], {name:'P'}),
f = b.create('functiongraph', [
function(x) {
var den = p.X()- v.X(),
a = (p.Y() - v.Y()) / (den * den);
return a * (x - v.X()) * (x - v.X()) + v.Y();
}]);
})();
Inverse quadratic function
Conversely, also the inverse quadratic function can be uniquely defined by its vertex [math]V[/math] and one more point [math]P[/math]. The function term of the inverse function has the form
- [math]y = \sqrt{(x-v_x)/a} + v_y.[/math]
[math]a[/math] can be determined by solving
- [math]p_y = \sqrt{(p_x-v_x)/a} + v_y[/math] for [math]a[/math] which gives
- [math]a = (p_x - v_x) / (p_y - v_y)^2.[/math]
JavaScript code
var b = JXG.JSXGraph.initBoard('box2', {boundingbox: [-5, 5, 5, -5], grid:true});
var v = b.create('point', [0,0], {name:'V'}),
p = b.create('point', [3,3], {name:'P'}),
f = b.create('functiongraph', [
function(x) {
var den = p.Y()- v.Y(),
a = (p.X() - v.X()) / (den * den),
sign = (p.Y() >= 0) ? 1 : -1;
return sign * Math.sqrt((x - v.X()) / a) + v.Y();
}]);
