Function to get X/Y coordinates for move on triangle with soft edges

i want to make an animation in javascript where an object moves on a path. For this i need a function that returns me X/Y coordinates on the path for a given time. The path should be a triangle with soft edges.

At the beginning of the animation it should soft move into the triangle path - but this i could solve maybe in a different function .. more important to me is the function which can return me the X/Y coordinates for the move on the triangle.

The animation should then loop endless on the triangle path.

Are there (online) tools to create coordinates for such a animation?

Can someone help me with the function?

-

migrated from mathematica.stackexchange.comSep 27 '12 at 22:19

This question came from our site for users of Mathematica.

i would try a pursuit curve, where your drawing cursor follows an invisible point which moves on a hard triangle path at a certain distance, thereby smoothing the edges. This would also enable to ease into the triangle. –  Thies Heidecke Sep 27 '12 at 21:14
I'd recommend a loop of Beziers to the rescue, they are nicely documented and easily implemented, and you can get the exact position at any time. However, they have an annoying property of not maintaining a constant speed along the path, and your animation will be much slower at the rounded ends than along the edges. –  Lyth Sep 27 '12 at 22:37
a superformula with a=3 could help –  Bergi Sep 27 '12 at 22:45
Uh, this question gave me more points than my whole reputation. that´s nice!. Can somebody assign it to my account please? –  Benjamin Sep 28 '12 at 6:55
@Benjamin: I guess you'd need to link your two stackexchange accounts –  Bergi Sep 29 '12 at 13:21

I'd recommend something like sqrt(x²+y²)=2.5+sin(atan2(y,x)*3)/5 - polar: ρ(θ)=2.5+sin(3θ)/5. It's a simple polar coordinate system, and adding a compressed sine wave (3 periods per turn) on a circle:

``````θ(t) = t // angle
ρ(t) = 2.5 + 0.2 * sin (t * 3) // radius
// of course, you can play with the parameters :-)
``````

You can easily convert those polar coordinates into cartesion ones.

The animation at the beginning, moving from the center into the path, would need an extra function of course. Yet, it could be done with the same mechanic - leaving out the circle part: ρ(θ)=2.5*sin(3θ)

-
Thanks - thats exactly what i needed. Here is a prototype: jsfiddle.net/qgPVn/4 I am still working on the beginning of the animation .. As soon as i got this account mess cleared up, i will accept your answer! –  Benjamin Sep 29 '12 at 23:18