# Drawing clock face in Mathematica (looking for a better solution)

I am trying to find a general solution for drawing clock face like graphical objects in Mathematica. I've already implemented a version of my own, but I think a much better solution must exist. A neater version with less code or clearer thought process would be appreciated.

My version:

``````radius = 1;
elementList =
Join[Table[i, {i, 3, 1, -1}], Table[i, {i, 12, 4, -1}]];
elementNumber = Length[elementList];
thetaList = Table[i, {i, 0, 2 Pi, 2 Pi/elementNumber}][[1 ;; 12]];
objectList =
Map[Style[#, FontFamily -> "Georgia", FontSize -> 30] &,
elementList];
Graphics[
Join[
]
]
``````

• Perhaps this would be a good starting point: blog.wolfram.com/2007/07/09/… – Brett Champion Nov 18 '11 at 18:45
• I think the suggestion from @BrettChampion answers this question perfectly. I feel a little ashamed about asking this (I should ask both Google and the documentation before I ask question here, and I did only the later). Should I keep this post or delete it, which choice would be better for the community? – Ning Nov 18 '11 at 18:59
• I would keep your post. There are lots of interesting ways to construct clocks (and clock faces). – Arnoud Buzing Nov 18 '11 at 20:02
• @Ning IMHO, as somebody who's learning Mathematica and working with it daily, I say keep it. The two answers below are interesting and I enjoy learning from seeing how other people approach these sorts of questions (i.e. two very different answers). – programming_historian Nov 18 '11 at 20:03

Here is one way to make a clock:

``````clockFace = Import["http://i.imgur.com/ufanv.jpg"];
{hour, minute, second} = Take[Date[], -3];
hour = Mod[hour, 12] + minute/60.;
Graphics3D[
{
{Texture[clockFace],
Polygon[{{-1, -1, 0}, {1, -1, 0}, {1, 1, 0}, {-1, 1, 0}},
VertexTextureCoordinates -> {{0, 0}, {1, 0}, {1, 1}, {0, 1}}
]
},
{Black, AbsoluteThickness[8],
Line[{{0, 0, 0},
.55 {Cos[Pi/2 - 2 Pi hour/12], Sin[Pi/2 - 2 Pi hour/12], 0}}
]
},
{Black, AbsoluteThickness[5],
Line[{{0, 0, 0},
.8 {Cos[Pi/2 - 2 Pi minute/60], Sin[Pi/2 - 2 Pi minute/60], 0}}
]
}
},
Boxed -> False, Lighting -> "Neutral"]
``````

Here is a rotating, spinning 3D clock for your amusement:

``````clockFace = Import["http://i.imgur.com/ufanv.jpg"];
vtc = VertexTextureCoordinates -> {{0, 0}, {1, 0}, {1, 1}, {0, 1}};
Line[{{0, 0, -1}, {radius Cos[Pi/2 + 2 Pi time],
radius Sin[Pi/2 + 2 Pi time], -1}}],
Line[{{0, 0, 1}, {radius Cos[Pi/2 - 2 Pi time],
radius Sin[Pi/2 - 2 Pi time], 1}}],
Line[{{0, -1, 0}, {radius Cos[Pi/2 - 2 Pi time], -1,
radius Sin[Pi/2 - 2 Pi time]}}],
Line[{{0, 1, 0}, {radius Cos[Pi/2 + 2 Pi time], 1,
radius Sin[Pi/2 + 2 Pi time]}}],
Line[{{-1, 0, 0}, {-1, radius Cos[Pi/2 + 2 Pi time],
radius Sin[Pi/2 + 2 Pi time]}}],
Line[{{1, 0, 0}, {1, radius Cos[Pi/2 - 2 Pi time],
radius Sin[Pi/2 - 2 Pi time]}}]};
Dynamic[
{hour, minute, second} = Take[Date[], -3];
hour = Mod[hour, 12] + minute/60.;
Graphics3D[{
{Texture[clockFace],
Polygon[{{1, -1, -1}, {-1, -1, -1}, {-1, 1, -1}, {1, 1, -1}},
vtc],
Polygon[{{-1, -1, 1}, {1, -1, 1}, {1, 1, 1}, {-1, 1, 1}}, vtc],
Polygon[{{-1, 1, -1}, {-1, -1, -1}, {-1, -1, 1}, {-1, 1, 1}},
vtc], Polygon[{{1, -1, -1}, {1, 1, -1}, {1, 1, 1}, {1, -1, 1}},
vtc], Polygon[{{-1, -1, -1}, {1, -1, -1}, {1, -1, 1}, {-1, -1,
1}}, vtc],
Polygon[{{1, 1, -1}, {-1, 1, -1}, {-1, 1, 1}, {1, 1, 1}}, vtc]
}, {Black,
hand[8, .55, hour/12],
hand[5, .8, minute/60],
hand[3, .8, second/60]
}
},
Boxed -> False, Lighting -> "Neutral",
ViewPoint ->
5 {Cos[2 Pi second/60], Sin[2 Pi second/60],
Sin[2 Pi second/30]}, SphericalRegion -> True,
Background -> Black, ImageSize -> Full]] // Deploy
``````

• Perhaps you could use something like `Polygon[#, vtc] & /@(PolyhedronData["Cube", "VertexCoordinates"][[#]] & /@ PolyhedronData["Cube", "FaceIndices"])]` to get the faces coords – Dr. belisarius Nov 20 '11 at 14:53
• @belisarius, that is a good tip, but I have to individually adjust the polygons to make the ones on the sides be upright. – Arnoud Buzing Nov 20 '11 at 21:14
• yep. I was wondering if that can be fixed with a permutation. I didn't try very hard, but could not find an obvious way. – Dr. belisarius Nov 20 '11 at 21:23
• +1 and congrats on your second "nice answer" badge – Dr. belisarius Nov 20 '11 at 21:25

Here's a version of a function that generalizes the generation of clock face to allow you to easily change the style of the numbers, the number of "hours", and the radius of the face:

``````Options[clockFace] = {FontFamily -> "Georgia", FontSize -> 30};
clockFace[hours_Integer, radius_?NumericQ, opts : OptionsPattern[]] /;
hours > 0 && Im[radius] == 0 && radius > 0 :=
With[{range = Range[12]},
With[{objects =
Style[#,
FilterRules[{opts}, Options[Style]] ~Join~ Options[clockFace]] & /@ range,
thetas = Pi/2 - 2 Pi*range/hours},
Graphics[Append[
MapThread[Text[#1, {Cos[#2], Sin[#2]}] &, {objects, thetas}],
``````

Some things are just Mathematica style issues; for instance,

``````FilterRules[{opts}, Options[Style]] ~Join~ Options[clockFace]
``````

is just the way to pass the relevant optional arguments to `Style` while making sure that `clockFace`'s default values are used where relevant, because Mathematica will use the first applicable rule that it finds in a list of rules (and function options are just lists of rules). I also used `With` to name things, which is why there's that nesting; other people might prefer to use a single `Module`. Either way, it's always best to make things local variables whenever possible.

The biggest change, though, was generating the list of numbers in order, using `Range`, and then adjusting the definition of `thetas` so everything winds up in the right place. I think it's much easier to see what's going on, because the minus sign means you're moving around clockwise and offsetting by `Pi/2` makes it clear you're starting at the top of the clock.

The following is a working 3D clock made by easily combining @Arnoud's answer with Christopher's blog entry:

``````makeHand[fl_, bl_, fw_, bw_] :=
Polygon[{{-bw, -bl, 0.1}, {bw, -bl, 0.1}, {fw, fl, 0.1},
{0, fl + 8 fw, 0.1}, {-fw, fl, 0.1}}/9];

hourHand = makeHand[5, 5/3, .1, .3];
minuteHand = makeHand[7, 7/3, .1, .3];
secondHand = {Red, EdgeForm[Black], makeHand[7, 7/3, .1/2, .3/2]};
clockFace = Import["http://i.imgur.com/ufanv.jpg"];

Graphics3D[{
{Texture[clockFace],
Polygon[{{-1, -1, 0}, {1, -1, 0}, {1, 1, 0}, {-1, 1, 0}},
VertexTextureCoordinates -> {{0, 0}, {1, 0}, {1, 1}, {0, 1}}]},

Rotate[hourHand, Dynamic[Refresh[-30 Mod[AbsoluteTime[]/3600, 60] \[Degree],
UpdateInterval -> 60]], {0, 0, 1}],
Rotate[minuteHand, Dynamic[Refresh[-6 Mod[AbsoluteTime[]/60, 60] \[Degree],
UpdateInterval -> 1]], {0, 0, 1}],
Rotate[secondHand, Dynamic[Refresh[-6 Mod[AbsoluteTime[], 60] \[Degree],
UpdateInterval -> 1/20]], {0, 0, 1}]}, Boxed -> False]
``````

Edit

The animation was captured by using Rasterize[] inside a scheduled task!

``````a = Graphics3D[(* etc etc*)];
b = {};
t = CreateScheduledTask[AppendTo[b, Rasterize@a], {2, 30}];
Export["c:\\test.gif", b, "DisplayDurations" -> 1]
``````
• +1, okay. that is just kind of wrong. I even downloaded v8 so I could run it. – rcollyer Nov 18 '11 at 22:03
• @rcollyer I am afraid I don't understand. What is wrong there? – Dr. belisarius Nov 18 '11 at 22:08
• sorry, colloquialism. The third definition from the urban dictionary is closest to my usage here. Specifically, I was commenting on the irony of using a very powerful tool to create an accurate clock animation. – rcollyer Nov 19 '11 at 0:51
• @rcollyer Did you notice the use of `ScheduledTask` in the last edit? I never used it like that before! – Dr. belisarius Nov 20 '11 at 14:12
• No, I hadn't. Wow, and I thought the first use was absurd. This one is worse, and funnier for it. – rcollyer Nov 20 '11 at 19:12

Mathematica has something called `ClockGauge` built-in. The possibilities for styling the clock face are endless, as can be seen in the documentation. The bare-bone version looks like this:

``````ClockGauge[]
``````

• Please take a look a the time-stamp in the question :) – Dr. belisarius Sep 26 '14 at 20:35
• @belisarius Oh well, it can't hurt to have this solution here as well. – C. E. Sep 26 '14 at 21:38
• I guess almost all questions about Mma in this site could be re-written since most of them are from v7 and v8 :D – Dr. belisarius Sep 26 '14 at 21:58
• Amazing! I came from google! – Ivan Feb 15 at 19:43

Your method is fine. It is just a little messy. Here is my interpretation:

``````hours = 12;