# Get Coordinates from Angle

Given an angle and having drawn a line from the center of a bounding box, how can we compute the coordinates at which the line will intersect the bounding box?

Please have a look at the following diagram:

As you can see, for example, at angle 0 the line intersects point (0.5, 1)

How can we turn this problem into a computable formula that accepts an angle and returns x and y coordinates?

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You can solve by using trigonometry and handling each 45 degree section separately:

Given:

• xmin, xmax (limits of x axis for boxed region)
• ymin, ymax (limits of y axis for boxed region)
• a (angle)
• output coordinates of x and y
• width = (xmax - xmin)
• height = (ymax - ymin):

Angle range; x; y

• (0<= a <= 45); x = xmin + (tan(a)*(width/2) + width/2; y = ymax
• (45<= a <= 90); x = xmax; y = ymin + (tan(90-a)*height/2) + height/2
• (90<= a <= 135); x = xmax;y = ymin + (tan(a-90)*height/2) + height/2
• (135<= a <= 180); x = xmin + (tan(180-a)*width/2)+width/2; y = ymin
• (180<= a <= 225); x = xmin - (tan(a-180)*width/2)+width/2; y = ymin
• (225<= a <= 270); x = xmin; y = ymin -(tan(270-a)*height/2)+height/2
• (270<= a <= 315); x = xmin; y = ymin + (tan(a-270)*height/2)+height/2
• (315<= a <= 360); x = xmin -(tan(360-a)*width/2)+width/2; y = ymax
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Just what was needed, thanks a lot! –  Abdulla Sep 7 '12 at 20:25