# Shooting projectiles given an angle and power

I'm doing a prototype game like Worms and I would like not only to shot, but also see the whole projection curve where my shot will travel before it hit the ground. The only information given by the player is an angle and a power. There is also some level elements like wind and gravity.

Can I have a code for the projection curve? its like a parabola I think. I research about parabola but I had some difficult to apply these math formulas into the programming code.

Thanks.

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Welcome to Stack Overflow. What have you tried so far? –  zzzzBov Dec 31 '11 at 14:21
Also, please take some time to read through the faq. –  zzzzBov Dec 31 '11 at 14:24
This seems more like a "do my work for me" type of question than a "what's wrong with my code" question. Read the faq, you'll notice such questions are not really appreciated. nevertheless, I'm writing an answer below, it'll be ready soon –  Pranav Hosangadi Dec 31 '11 at 14:25
My apologies to everyone if I did some unappreciated question. I have no code about that because I just don't know how to do it. I have tried to apply the formula "y = a*x^2 + b*x + c" in a very noob way trying to plot 3 points of the parabola, but no sucess. If you insist i can put that in my post. But its just like nothing, i think. Sorry and thanks for feedback. Im trying my best. –  Fabricio Dec 31 '11 at 14:54
It seems the simplest thing to be would be to keep an x increment of 5px and then find the y coordinate for every x coordinate and then join them with lines. I trust this should be simple enough –  Pranav Hosangadi Jan 2 '12 at 13:29

The math (and physics) part

So this seems like 10th grade physics to me.

The path trced by a projectile is (as you said) a parbola describable by the equation

Now, if you solve this equation, you get the following parameters:

Range:

Height:

(vi = initial velocity, theta i = initial angle of shooting wrt horizontal)

And, the equation in `(x, y)` for the parabolic path will be

(v0 = initial velocity, theta = firing angle)

The programming part

assuming the following constants:

``````const g:Number = 9.81; //9.81 m/s, the grav const
``````

The sin function is available as `Math.sin`

The power function is available as `Math.pow`. This means, sine squared will be

``````Math.pow(Math.sin(theta), 2)
``````

You could write the range function as

``````function projectileRange(vel:Number, angle:Number):Number {
var vsquare:Number = vel * vel;
var rv:Number = vsquare * Math.sin(2 * angle) / g;
return rv;
}
``````

and the height function as

``````function projectileHeight(vel:Number, angle:Number):Number {
var vsquare:Number = vel * vel;
var rv:Number = vsquare * Math.pow(Math.sin(angle), 2) / (2 * g);
return rv;
}
``````

and the yPosition function as

``````function yPosition(xPos:Number, vel:Number, angle:Number):Number {
return xPos * Math.tan(angle) - (g * xPos * xPos / (2 * vel * vel * Math.cos(angle) * Math.cos(angle)));
}
``````

Note that the angles are in RADIANS

``````function toRadians(degrees:Number):void {
return degrees * Math.PI / 180;
}
``````