# Mathematical game wondering

Imagine an arm that is 50 px long. It is placed at 100,100. The rotation center is at 100, 100. The arm rotates all the time. On the arm there is a hook that travels back and forth the full distance of the arm.

My variables:

X = 100;
Y = 100;
RotationAngel = 120; // Loops up to 360.
HookDistanceFromCenter = 25; // Goes 0 -> 50 -> 0 by a loop.

How do I get the position (x,y) of the hook?

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Is this a homework? –  Krom Stern Dec 27 '11 at 14:00
Haha. No! Building a game with a hook! (i am 34, but bad at math...) –  Johan Albertsson Dec 27 '11 at 14:02

x = 100 - HookDistanceFromCenter * cos(180 - RotationAngle)
y = 100 + HookDistanceFromCenter * sin(180 - RotationAngle)

but it changes depending on which quadrant you are in. This is basic trigonometry. You should be able to use the info here: http://en.wikipedia.org/wiki/Unit_circle except that the radius of your circle is HookDistanceFromCenter and you have to add your rotation center coordinates to the result to get the actual (x,y).

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By "which quadrant" you mean RotationAngle < 90 || RotationAngle < 180 || RotationAngle < 270 || RotationAngle < 360 ? –  Johan Albertsson Dec 27 '11 at 14:21
yes, although to be pedantic I mean 0 < RA <= 90, 90 < RA <= 180, 180 < RA <= 270, 270 < RA < 360 –  Mathletics Dec 27 '11 at 14:24
And in which way does the result of this change your code example? –  Johan Albertsson Dec 27 '11 at 14:26
the x,y distance from the rotation center changes sign as it goes from quadrant to quadrant; in 1 they are both positive, in 2 x is negative, in 3 both are negative, and in 4 only y is negative. Does that make sense? –  Mathletics Dec 27 '11 at 14:44
So in case 2: the result might be x=-60 but then i change it to x=60? –  Johan Albertsson Dec 27 '11 at 14:47