Discontinuous derivative: Difference between revisions

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//var g = board.create('functiongraph', ["2*sin(1/x) - cos(1/x)"], {strokeColor: 'red'});
//var g = board.create('functiongraph', ["2*sin(1/x) - cos(1/x)"], {strokeColor: 'red'});
var f = board.create('functiongraph', ["(0 < x || x < 1) ? x^2*(1-x)^2*sin(1/(PI* x*(1-x))) : 0"], {strokeWidth:2});
var f = board.create('functiongraph', ["(0 < x && x < 1) ? x^2*(1-x)^2*sin(1/(PI* x*(1-x))) : 0"], {strokeWidth:2});
</jsxgraph>
</jsxgraph>



Revision as of 09:23, 13 February 2019

Consider the function (blue curve)

[math]\displaystyle{ f: \mathbb{R} \to \mathbb{R}, x \mapsto \begin{cases} x^2\sin(1/x),& x\neq 0\\ 0,& x=0 \end{cases}\,. }[/math]

[math]\displaystyle{ f }[/math] is a continous and differentiable. The derivative of [math]\displaystyle{ f }[/math] is the function (red curve)

[math]\displaystyle{ f': \mathbb{R} \to \mathbb{R}, x \mapsto \begin{cases} 2\sin(1/x) - \cos(1/x), &x \neq 0\\ 0,& x=0 \end{cases}\,. }[/math]

We observe that [math]\displaystyle{ f'(0) = 0 }[/math], but [math]\displaystyle{ \lim_{x\to0}f'(x) }[/math] does not exist.

Therefore, [math]\displaystyle{ f' }[/math] is an example of a derivative which is not continuous.

Here is another example:

[math]\displaystyle{ g: \mathbb{R} \to \mathbb{R}, x \mapsto \begin{cases} x^2(1-x)^2\sin(1/(\pi x(1-x)),& 0\lt x\lt 1\\ 0,& \mbox{otherwise} \end{cases}\,. }[/math]


The underlying JavaScript code

First example:

var board = JXG.JSXGraph.initBoard('jxgbox', {axis:true, boundingbox:[-1/2,1/2,1/2,-1/2]});

var g = board.create('functiongraph', ["2*sin(1/x) - cos(1/x)"], {strokeColor: 'red'});
var f = board.create('functiongraph', ["x^2*sin(1/x)"], {strokeWidth:2});