Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

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: enter image description here

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?

share|improve this question

1 Answer 1

up vote 1 down vote accepted

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
share|improve this answer
    
Just what was needed, thanks a lot! –  Abdulla Sep 7 '12 at 20:25

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.