# Circular/Angular slider

A recent SO question reminded me of some code I tried to write a while back. The aim is to make a `CircularSlider[]` object that can be used for angle-like variables in dynamic objects.

The framework for my solution (below) comes from the `ValueThumbSlider[]` defined in the Advanced Manipulate Functionality tutorial. The main difference is that in `ValueThumbSlider[]` the value of the slider and the position of the `LocatorPlane[]` are the same thing, whilst in my `CircularSlider[]` they are not - and this leads to problems.

The first problem is that moving the `Locator` will not change the slider value. This is fixed by using the 2nd argument in the `Dynamic`: `(x = #/Abs[Complex @@ #]) &`.

This in turn leads to the problem that if you externally set the value of the slider (`t`) from outside, it will immediately revert to its previous value. This is fixed by keeping the old value (`t0`) and comparing to `t`. If they don't match then it's assumed that t has changed and so the `Locator` position `x` is updated to its new position.

``````CircularSlider[t_] := CircularSlider[t, {0, 1}];
CircularSlider[Dynamic[t_], {min_, max_}] /; max > min :=
With[{d = (max - min)/(2. Pi)},
DynamicModule[{td = t/d, x, t0}, x = {Cos[td], Sin[td]};
LocatorPane[
Dynamic[If[!NumberQ[t], t = min; x = {Cos[td], Sin[td]}];
If[t != t0, t0 = t; x = {Cos[td], Sin[td]}];
t = Mod[Arg[Complex @@ x] d, max, min]; t0 = t;
x, (x = #/Abs[Complex @@ #]) &],
Graphics[{AbsoluteThickness[1.5], Circle[],
Dynamic[{Text[NumberForm[t, {3, 2}], {0, 0}]}]}],
ImageSize -> Small]]]
``````

So my question is: can someone make this work with out the above kludges?

-
+1 Nice idea! Let's see if we can come to something useful! –  belisarius Dec 13 '10 at 0:35

As for problem#1, I wouldn't consider the use of the second argument to `Dynamic` as a kludge -- that is what the second argument is for. Therefore, I don't have an alternative solution for that one.

Problem #2 can be avoided if you refrain from assigning `t` in the first argument to `Dynamic`.

With this in mind, here is another implementation:

``````CircularSlider2[Dynamic[t_], r:{min_, max_}:{0, 1}] :=
DynamicModule[{scale, toXY, fromXY},
scale = (max - min) / (2. Pi);
toXY[a_?NumberQ] := Through@{Cos, Sin}[a / scale];
toXY[a_] := {1, 0};
fromXY[{x_, y_}] := Mod[Arg[x + I y] scale, max, min];
LocatorPane[
Dynamic[toXY[t], (t = fromXY[#])&],
Graphics[{
AbsoluteThickness[1.5], Circle[],
Dynamic[{Text[NumberForm[t, {3,2}], {0, 0}]}]
}],
ImageSize -> Small
]
]
``````

The only material difference between this version and the original version is that the first argument to `Dynamic` is an expresssion that is free of side-effects.

## Edit

I just stumbled across this undocumented experimental feature in Mathematica 8:

``````DynamicModule[{x = RandomReal[{0, 50}]},
{Experimental`AngularSlider[Dynamic@x], Dynamic@x}
]
``````

-
I like it! It doesn't suffer from the other problem I just noticed in my code, which is that you can't have 2 linked copies of a slider. –  Simon Dec 14 '10 at 5:50
I like the `ShowWinding->True` option -- that's a really nice idea. –  Simon Jan 25 '11 at 0:46