# MATLAB Rotate and move 2d object in the same time

I made star using this code:

``````t = 0:4/5*pi:4*pi;
x = sin(t);
y = cos(t);
star = plot(x, y);
axis([-1 11 -1 11])
``````

Now I need to rotate and move this star at the same time. I tried this:

``````for i=1:0.1:10;
zAxis = [0 0 1];
center = [0 0 0];
rotate(star, zAxis, 5, center);
x = x+0.1;
y = y+0.1;
set(star, 'x', x, 'y', y);
pause(0.1);
end
``````

But this code only moves star and doesn't rotate it. If I delete "set" command then it rotates. How can I combine those two actions?

-

This can do the job..

``````t = 0:4/5*pi:4*pi;
x = sin(t);
y = cos(t) ;
y = y-mean(y);
x = x-mean(x);  % # barycentric coordinates

% # rotation and translation
trasl = @(dx,dy) [dy; dx];  % # this vector will be rigidly added to each point of the system
rot = @(theta)  [cos(theta) -sin(theta); sin(theta) cos(theta)];  % # this will provide rotation of angle theta

for i = 1:50
% # application of the roto-translation
% # a diagonal translation of x = i*.1 , y = i*.1 is added to the star
% # once a rotation of angle i*pi/50 is performed
x_t = bsxfun(@plus,rot(i*pi/50)*([x;y]), trasl(i*.1,i*.1) );

star = plot(x_t(1,:), x_t(2,:));
axis([-1 11 -1 11])
pause(.1)

end
``````

In principle, homogeneous coordinates (in this case in the 2D projective space) allow one to do the same job in a neater way; in fact, they would allow one to use just one linear operator (3x3 matrix).

Homogeneous coordinates version:

``````Op = @(theta,dx,dy) [ rot(theta) , trasl(dx,dy) ; 0 0 1];

for i = 1:50
x_t = Op(i*pi/50,i*.1,i*.1)*[x;y;ones(size(x))];

star = plot(x_t(1,:), x_t(2,:));
axis([-1 11 -1 11])
pause(.1)
end
``````
-
Thank you, this works. But star have to move to oposite corner (top right). When I run your code it goes to top left corner, and since I have no clue what your code means I can't fix it :) –  Alen Apr 5 '13 at 16:22
@Alen, I will add some explanation –  Acorbe Apr 5 '13 at 16:24
@Alen, btw now the code on top moves the star in the opposite corner –  Acorbe Apr 5 '13 at 16:25
@Alen, I added some comment, btw now the direction is correct..you may want to try to play with it a little bit.. –  Acorbe Apr 5 '13 at 16:28
Thank you, now I understand –  Alen Apr 5 '13 at 16:29

You can just use a rotation matrix to compute the correct transformation on the vectors `[x; y]`:

``````theta = 5 * (pi / 180); % 5 deg in radians
Arot = [cos(theta) -sin(theta); sin(theta) cos(theta)];
xyRot = Arot * [x; y]; % rotates the points by theta
xyTrans = xyRot + 0.1; % translates all points by 0.1
set(star, 'x', xyTrans(1, :), 'y', xyTrans(2, :));
``````
-
this doesn't work, now star just stands still, no motion. –  Alen Apr 5 '13 at 15:51
That's presumably because you're still doing `set(star, 'x', x, 'y', y);` rather than `set(star, 'x', xyTrans(1, :), 'y', xyTrans(2, :));`. You will also need to put `x = get(star, 'x'); y = get(star, 'y');` at the beginning of your loop. –  wakjah Apr 5 '13 at 15:56
I just coppied your code: screencloud.net/v/k7OJ you see it on this screenshot. –  Alen Apr 5 '13 at 16:16