I'm attempting an exercise where a vehicle is following the Lemniscate of Bernoulli (or more simply, a figure-8 track). I want to use
glRotatef to achieve this. So far, I have been able to successfully get the vehicle to follow/translate along this path by using the parametric form as follows:
X = (width * cos(t)) / (1+sin^2(t))
Y = (width * cos(t) * sin(t)) / (1+sin^2(t))
Where t is in -pi, pi
In the code, this is as follows:
carX = (float) ((Math.cos(t) / (1 + Math.sin(t)*Math.sin(t)))); carY = 0.0f; carZ = (float) ((Math.cos(t) * (Math.sin(t))) / (1 + Math.sin(t)*Math.sin(t))); gl.glTranslatef(carX,carY,carZ);
So that works well enough. My problem now is rotating the vehicle so that it follows the path defined by the Lemniscate of Bernoulli. I want to achieve this by using
glRotatef to rotate around the Y axis, but I am not sure how to proceed in regards to finding the angle to input in
glRotatef. The rotate is currently in place so that it only manipulates the vehicle, and appears to just need the correct mathematics to follow the path.
Things I have tried:
- Using the derivative of the X and Y forms listed above. I used them independently of each other, because I'm not sure how to/if they need to be combined to be used for the angle. With some minor manipulation they follow the straight areas near the origin, but broke down around the curves.
- Directly finding the tangent of the t value and converting to degrees. Erratic spinning resulted.
If anyone has any suggestions that may be better than the glRotatef method, that would be appreciated as well. I've seen that
gluLookAt may be helpful, and I may attempt to find a solution using that.
(Note: I'm working in JOGL using Java and the FFP, but I'm comfortable with C/C++ code snippets.)