# First Person view of structures in mathematica [closed]

``````(* code to Construct structures *)

wing = {
(*Base Cylinders*)
{Gray, Cylinder[{{10, 10, 10}, {10, 10, 6}}, 7]},
{Blue, Cylinder[{{10, 10, 6}, {10, 10, 5}}, 7]},
{Blue, Cylinder[{{10, 10, 5}, {10, 10, 4}}, 7]},
{Gray, Cylinder[{{10, 10, 4}, {10, 10, 2}}, 7]},

(*top cylinders*)
{Blue, Cylinder[{{10, 10, 12}, {10, 10, 10}}, 4]},
{Gray, Cylinder[{{10, 10, 14}, {10, 10, 12}}, 4]},

(*Parallel Beamers*)
{Gray, Cuboid[{0, 7, 12}, {20, 13, 2}]}};

house = {
(*the house*)
{Darker[Red, 0.3], Cuboid[{-10, -10, 0}, {2, 3, 12}]},

(*roof*)
{Darker[Brown, 0.4],
Polygon[{{-10, -10, 12}, {-4, -3, 18}, {2, -10, 12}}]},
{Darker[Brown, 0.4],
Polygon[{{2, -10, 12}, {-4, -3, 18}, {2, 3, 12}}]},
{Darker[Brown, 0.4],
Polygon[{{2, 3, 12}, {-4, -3, 18}, {-10, 3, 12}}]},
{Darker[Brown, 0.4],
Polygon[{{-10, 3, 12}, {-4, -3, 18}, {-10, -10, 12}}]},

(*Door*)
{Yellow,
Polygon[{{2.005, -5.25, 0}, {2.005, -5.25, 5}, {2.005, -1.75,
5}, {2.005, -1.75, 0}}]},
(*Door Knob*)
{Orange, Sphere[{2.005, -2.25, 2.5}, 0.25]},
(*Windows*)
{Lighter[Blue, 0.5],
Polygon[{{2.005, -9, 6}, {2.005, -9, 10}, {2.005, -5,
10}, {2.005, -5, 6}}]}, {Lighter[Blue, 0.5],
Polygon[{{2.005, -1.75, 6}, {2.005, -1.75, 10}, {2.005, 2,
10}, {2.005, 2, 6}}]},

(*Chimney*)
{Gray, Cuboid[{-2, -9, 12.75}, {-5, -7, 17}]},

(*Lines for the Window*)
{Black, Cuboid[{2.006, -9, 7.9}, {2.006, -5, 8.1}]},
{Black, Cuboid[{2.006, -7.1, 6}, {2.006, -6.9, 10}]},
{Black, Cuboid[{2.006, 0, 6}, {2.006, 0.2, 10}]},
{Black, Cuboid[{2.006, -1.75, 7.9}, {2.006, 2, 8.1}]},

(*Lawn*)
{Darker[Green, 0.5],
Polygon[{{2, -10, 0}, {2, 3, 0}, {-10, 3, 0}, {-10, 10, 0}, {2,
10, 0}, {10, 10, 0}, {10, -10, 0}}]},

(*Pavement*)
{Darker[Gray, 0.5],
Polygon[{{2, -5.25, 0.005}, {2, -1.75, 0.005}, {10, -1.75,
0.005}, {10, -5.25, 0.005}}]},
(*Side Windows*)
{Lighter[Blue, 0.5],
Polygon[{{1, 3.005, 2}, {1, 3.005, 5}, {-4, 3.005, 5}, {-4, 3.005,
2}}]}, {Lighter[Blue, 0.5],
Polygon[{{-5, 3.005, 7}, {-9, 3.005, 7}, {-9, 3.005, 10}, {-5,
3.005, 10}}]}, {Lighter[Blue, 0.5],
Polygon[{{0, 3.005, 7}, {0, 3.005, 11}, {-2, 3.005, 11}, {-2,
3.005, 7}}]}, {Lighter[Blue, 0.5],
Polygon[{{-6, 3.005, 2}, {-6, 3.005, 6}, {-8, 3.005, 6}, {-8,
3.005, 2}}]}, {Lighter[Blue, 0.5],
Polygon[{{1, -10.005, 2}, {1, -10.005, 5}, {-4, -10.005,
5}, {-4, -10.005, 2}}]}, {Lighter[Blue, 0.5],
Polygon[{{-5, -10.005, 7}, {-9, -10.005, 7}, {-9, -10.005,
10}, {-5, -10.005, 10}}]}, {Lighter[Blue, 0.5],
Polygon[{{0, -10.005, 7}, {0, -10.005, 11}, {-2, -10.005,
11}, {-2, -10.005, 7}}]}, {Lighter[Blue, 0.5],
Polygon[{{-6, -10.005, 2}, {-6, -10.005, 6}, {-8, -10.005,
6}, {-8, -10.005, 2}}]},

(*Back Window*)
{Lighter[Blue, 0.5],
Polygon[{{-10.005, 1, 3}, {-10.005, 1, 9}, {-10.005, -8,
9}, {-10.005, -8, 3}}]},

(*Lines for the Window*)
{Black, Cuboid[{-1.4, 3.006, 2}, {-1.6, 3.006, 5}]},
{Black, Cuboid[{1, 3.006, 3.4}, {-4, 3.005, 3.6}]},
{Black, Cuboid[{-6.85, 3.006, 7}, {-7.1, 3.006, 10}]},
{Black, Cuboid[{-5, 3.006, 8.4}, {-9, 3.006, 8.6}]},
{Black, Cuboid[{-1.4, -10.006, 2}, {-1.6, -10.006, 5}]},
{Black, Cuboid[{1, -10.006, 3.4}, {-4, -10.005, 3.6}]},
{Black, Cuboid[{-6.85, -10.006, 7}, {-7.1, -10.006, 10}]},
{Black, Cuboid[{-5, -10.006, 8.4}, {-9, -10.006, 8.6}]}};

(* Holds the constructions together *)

tab = HoldForm@{
place[wing, 2, {0, 70, -27}, 0, "Building1"],
place[house, 1, {170, 200, -50}, 0, "Building2"]};

(* defining the function place in the above function *)

place[obj_, scale_, trans_, rotate_, name_] :=
GeometricTransformation[obj,
ScalingTransform[scale {1, 1, 1}].TranslationTransform[
trans].RotationTransform[rotate Degree, {0, 0, 1}]]

(* Function to show the images in a particular plane *)

view := Show[
Graphics3D[ReleaseHold[tab], PlotRange -> Automatic,
ImageSize -> {500, 500}, Boxed -> True,
AxesLabel -> {"x", "y", "z"}, Axes -> True]];

(*--------------code over ----------------------------------------------------*)
``````

The above code when evaluated gives us the following images

I want to have first person view of these image in the plane. I want to able to move around the the plane with the images as structures and have a chance to move like they are original views

Is there a way that can be done. Can we have a object that can be moved on the x-axis that allows to move around the x axis and could allow us to see the structures where the x axis and y axis and z axis, can be changed by the parameters?

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## closed as off topic by casperOneApr 30 '12 at 12:31

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I think you want the `ViewPoint` option. By the way, there is now a Mathematica-specific StackExchange: mathematica.stackexchange.com – Verbeia Apr 28 '12 at 9:01
By the way, the code you posted only seems to include the little house, which is sufficient. Also, it's not a good idea to "format" the code with MarkDown. I had to clean it up before it would work on my Mathematica installation. – Verbeia Apr 28 '12 at 9:11
You can do some ad hoc zooming around by using alt-left-click-mouse-movement (in/out), alt-shift-left-click-mouse-movement (rotations), and shift-left-click-mouse-movement (up/down/left/right). But it is not possible to shift the POV inside the plot. – Timo Apr 28 '12 at 10:05
the ad hoc zooming thing works but , but i wish to have like a camera view of the entire plane on which the structures are placed . check this video on youtube : youtube.com/watch?v=RipJuvbF5xI in this video he shows like a camera zoom in a structure – user1277399 Apr 28 '12 at 22:03

This answer might help you to better understand concepts like `ViewVector` and `ViewAngle`. The code below lets you experiment a bit with how the position of the camera and the view angle affect the view in your particular example. The code for `tab` is as in the original question.

``````With[{xrange = {0, 180}, yrange = {150, 240}, zrange = {-50, 0}},
Manipulate[
DynamicModule[{vv, crd},
With[{gr = Graphics3D[ReleaseHold[tab],
PlotRange -> {xrange, yrange, zrange}, ImageSize -> {500, 500},
Boxed -> True, AxesLabel -> {"x", "y", "z"}, Axes -> True], eyelevel = -48},

crd = {Cos[phi] Sin[theta], Sin[theta] Sin[phi], Cos[theta]};
vv = {Append[{ptx, pty}, eyelevel], Append[{ptx, pty}, eyelevel] + crd};

Grid[{{Show[{gr,
Graphics3D[{{Red, Sphere[vv[[1]], .5]},
{Opacity[.3], Cone[{vv[[1]] + 100 crd, vv[[1]]}, 100 Tan[a/2]]}}]},
ImageSize -> 350],
Show[gr, Axes -> False, ViewVertical -> {0, 0, 1},
ViewVector -> vv, ViewAngle -> a , ImageSize -> 350]}}]]],
{{a, 50 Degree, "View Angle"}, 10 Degree, 180 Degree},
{{ptx, 100, "Camera Position x"}, Sequence @@ xrange},
{{pty, 200, "Camera Position y"}, Sequence @@ yrange},
{{phi, Pi, "Horizontal Angle"}, 0, 2 Pi},
{{theta, Pi/2, "Vertical Angle"}, 0, Pi}]]
``````

The image on the left shows an bird's eye view of the buildings where the red dot is the location of the camera and the cone the field of view.

-

Is this what you want?

``````Manipulate[
Show[Graphics3D[ReleaseHold[tab], PlotRange -> Automatic,
ImageSize -> {500, 500}, Boxed -> True,
AxesLabel -> {"x", "y", "z"}, Axes -> True,
ViewPoint -> {x, y, z}]], {x, -2, 2}, {y, -2, 2}, {z, -2, 2}]
``````

-
thank you for you Help .. This looks Good , however what i really wanted to achieve is a camera like view to view the structures inside .I have come across a few videos in Youtube and they seem to look awesome , however i was unable to achieve anything close to that – user1277399 Apr 28 '12 at 21:46
how can i use ViewAngle and ViewVector on the Manipulate to make it more camera like while moving around . – user1277399 Apr 29 '12 at 3:23