# OpenGL rotating towards a point

Using openGL (just 2d), I'm trying to rotate a texture so it's pointing towards a point on screen. I'll show an image first to help me explain.

Say my texture is the blue dot at point 1 and it is moving to its destination at point 2. I want to rotate #1 so that it is "pointing" towards point 2 (the texture is a bird so it has a defined "front"). To do this, I need to find out angle 3. Similarly, if my bird is at point #4 travelling towards point 5, I need to work out angle 6.

What's the secret to doing this?

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The solution is the super-useful `std::atan2` function. Subtract the current position from the target position of a bird, and stuff `y` and `x` (note the order!) into `atan2` to get the angle.

Edit: Note that atan usually assumes 0° to be at the X+ axis (right). However, you seem to align your 'base direction' to Y+ instead (up), so you might want to subtract 90° or fiddle with the order and signs of parameters to the atan functions (using the basic symmetries in a circle, i.e. `atan2(-x,y)`).

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Sounds good, but quit hard to understand, I do not get what you exactly mean. –  Julius F Feb 4 '11 at 14:15
Which part exactly? –  ltjax Feb 4 '11 at 14:19
knowing math helps in these situations.... :p –  Tony The Lion Feb 4 '11 at 14:27
@ltjax: I don't want to be taxed as pedant, but I'm curious why you use substract rather than subtract. Just FWIW, Subtract vs Substract. That's just my curiosity, please don't take it as pedantry. –  jweyrich Feb 4 '11 at 20:03
@jweyrich: Thanks for the hint, I fixed it! I can never remember which one is right, especially since I usually just write "-" :) –  ltjax Feb 5 '11 at 8:31

Say your target position is at T, and your sprites position is P, then the vector T-P points into the direction from P to T. So you've to align your texture in that direction. You don't need to do trigonometry for this! So here is how it goes:

T.x and T.y are the x and y positions of T, and in the same way P.x and P.y for P. The vector T - P => (T.x - P.x, T.y - P.z) = D_l. We want this vector to be normalized, which can be done by scaling the elements of the vector with 1/length(D_l). So we obtain D_l by

``````D.x = D_l.x / sqrt( D.x^2 + D.y^2 ) = (T.x - P.x) / sqrt( (T.x - P.x)^2 + (T.y - P.y)^2 )
D.y = D_l.y / sqrt( D.x^2 + D.y^2 ) = (T.y - P.y) / sqrt( (T.x - P.x)^2 + (T.y - P.y)^2 )
``````

and just for completenes

``````D.z = 0
``````

So D is now the vector containing the direction toward the target, i.e. the Up-direction for the sprite. Now we need the Right-direction. We could now do some fancy tricks with slopes, but there's a leaner way: We want to find the vector perpendicular to the plane spanned by the direction vector and the vector looking down onto the scene, i.e. the Z direction. I.e. we want to find the cross product yielding the bi-direction D × Z = B

Remembering the definition of the cross product, and considering Z.x = Z.y = 0, Z.z = 1

``````B.x = D.y · Z.z - D.z · Z.y =  D.y
B.y = D.z · Z.x - D.x · Z.z = -D.x
B.z = D.x · Z.y - D.y · Z.x = 0
``````

Just like expected B.z = 0. From this you can create the rotation matrix:

``````B.x   D.x   0   0
B.y   D.y   0   0
0     0    1   0
0     0    0   1

=

D.y   D.x   0   0
-D.x   D.y   0   0
0     0    1   0
0     0    0   1
``````

which is a orthonormal matrix and thus describes a rotation. You can apply the rotation this matrix using `glMultMatrix`, or if you want to put the position therein, too, then load the following vaiant using `glLoadMatrix`

``````B.x   D.x   0   P.x
B.y   D.y   0   P.y
0     0    1   P.z
0     0    0    1
``````
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+1 there's no need to use atan2 is this case. –  rotoglup Feb 4 '11 at 19:20