# How to create 2D (3D) animation in Wolfram Mathematica with the camera following the object?

I have a graphical object which is moving along a trajectory. How can I make the camera follow the object?

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Since the question asks about 2D, here's how you can emulate a camera in 2D Graphics.

First, let's get the stackoverflow favicon.ico:

``````so = First@Import["http://sstatic.net/stackoverflow/img/favicon.ico"]
``````

Well put this on top of some overlapping circles and make the "camera" follow the icon around by adjusting the `PlotRange`

``````Manipulate[Graphics[{
Table[Circle[{j, 0}, i], {i, 0, 1, .1}, {j, {-.5, .5}}],
Inset[so, pos, {0, 0}, .2]},
PlotRange -> {{-.5, .5}, {-.5, .5}} + pos],
{{pos, {0, 0}, ""}, {-1.4, -1}, {1.4, 1}, ControlPlacement -> Left}]
``````

To show how it works (with out putting the above into Mathematica), we need to animate it. Originally I chose a variable step random walk `drunk = Accumulate[RandomReal[{-.1, .1}, {200, 2}]]` but it was a unpredictable! So instead, we'll make the icon follow the ABC logo

``````drunk = Table[{1.5 Sin[t], Cos[3 t]}, {t, 0, 2 Pi, .1}];
Animate[Graphics[{
Table[Circle[{j, 0}, i], {i, 0, 1, .1}, {j, {-.5, .5}}],
Inset[so, drunk[[pos]], {0, 0}, .2]},
PlotRange -> {{-.5, .5}, {-.5, .5}} + drunk[[pos]]],
{pos, 1, Length[drunk], 1}]
``````

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Looking at the comments of @belisarius' beautiful answer, I see that my solution is exactly what @WReach recommended... I think that this is the only sensible way to do this with 2D Graphics. –  Simon Mar 21 '11 at 22:07

Let's draw a planet and its satellite, with the camera following the moon from a view directed toward the Earth. For example:

``````a = {-3.5, 3.5};
Animate[
Show[
Graphics3D[
Sphere[3 {Cos@t, Sin@t, 0}, .5],
ViewPoint -> 3.5 {Cos@t, Sin@t, 0},
SphericalRegion -> True,
PlotRange -> {a, a, a}, Axes -> False, Boxed -> False],
myEarth],
{t, 0, 2 Pi}]
``````

Where myEarth is another 3D Graphics (for reference).

Static vertical view:

``````a = {-3.5, 3.5};
Animate[
Show[
Graphics3D[
Sphere[3 {Cos@t, Sin@t, 0}, .5],
ViewPoint -> 3.5 {0,0,1},
SphericalRegion -> True,
PlotRange -> {a, a, a}, Axes -> False, Boxed -> False],
myEarth],
{t, 0, 2 Pi}]
``````

The trick is SphericalRegion -> True, without it the image perspective "moves" from frame to frame.

Edit

With two static objects:

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+1. The OP mentions "2D" and "camera" in the question title, which confuses me as to whether a `Graphics` or `Graphics3D` solution is sought. You might consider adding the `Graphics` equivalent of your answer just to cover all the possibilities, e.g. `Graphics[..., PlotRange->{a, a} + f[t], ImagePadding->None, ...]` –  WReach Mar 21 '11 at 13:22
ViewCenter and ViewVertical are also options that may be useful in this context. –  Sjoerd C. de Vries Mar 21 '11 at 14:08
@WReach I guess "camera" and "2D" are mutually exclusive. As "camera" is rather difficult to misspell, seems to me that 2D should be 3D. Regrettably the OP didn't include a code snippet to understand the requirement better. Please feel free to add another answer for the 2D case if you think it is worth. –  belisarius Mar 21 '11 at 14:50