# Archery game programming algorithm

I need the algorithm to animate the arrow based on 2 parameters, angle while shooting and power while drawing the bow. Ive tried to use y=asinx but it works only when shooting in up direction. Doesnt work well while shooting with straight or down direction. Thanks.

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`y=asinx` ? What are `y`, `a` and `x` ? `x` is the angle and `a` the power? –  Richard JP Le Guen Mar 16 '10 at 0:39
Y = y coordinate a = angle x = x coordinate Power variable i added it to x coordinate. –  user294403 Mar 16 '10 at 0:43
Is this going to be 'The Golden Shot' with Bob Monkhouse? –  amelvin Mar 16 '10 at 0:45

The flight of your projectile is described by

``````x(t) = v * cos(theta) * t
y(t) = v * sin(theta) * t - 1/2 * g * t^2
``````

where t is time, v the initial velocity (power), theta the angle, g the acceleration due to gravity (e.g. 9.8 m/s^2), x the horizontal coordinate and y the height.

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Assuming no wind and negligible air resistance –  Tim Goodman Mar 16 '10 at 0:55
Thanks ill try this and will update if it works for me or not. Thanks –  user294403 Mar 16 '10 at 1:01
And neglecting coriolis force ;-) –  Steve Jessop Mar 16 '10 at 1:02
And neglecting bufferflies :) –  Jimmy Mar 16 '10 at 1:09
Power = how hard you can pull the bow back, stored energy, or velocity, I wonder? The first two are proportional to v^2, not v. –  Rex Kerr Mar 16 '10 at 3:40

You could try simulating the motion instead of deriving the analytic function. i.e. keep track of the current position, velocity and acceleration vectors for the arrow, and each time-increment, update the position based on the velocity and the velocity based on the acceleration.

otherwise, if you need an analytic function, See @bnaul's answer for the analytic version

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Simulating the motion would require extra logic compare to using function. Could you describe what is x, y, a, b, c here? –  user294403 Mar 16 '10 at 0:59
Why use a slow and inaccurate brute-force solution to a trivially-solvable analytic equation? –  Rex Kerr Mar 16 '10 at 3:36
@Rex: because the usual game-related case involves non-analytic components -- collisions with arbitrary terrain shapes or objects, for example. –  Jimmy Mar 16 '10 at 16:34
Intersection of a quadratic flight path with a triangle in the terrain is also easily analytically solved (i.e. use the quadratic formula). You still might want to do time stepping, but then you take steps along the analytic solution. –  Rex Kerr Mar 16 '10 at 17:26
+1 for correct answer. This is how it's done in actual games. If the world is in any way complex - for instance, you have to hit a moving target, or one of non-trivial shape - this is far far simpler than using equations of motion. –  BlueRaja - Danny Pflughoeft Mar 16 '10 at 23:25