# Need to find the angle of adjustment here

I have 2 sets of points, say AB and CD. They may or may not be in a straight line. I know their x, y co-ordinates and the angles they make with the horizontal plane. I need to adjust the angle that line AB forms with the horizontal plane in such a way that the points AB are perfectly aligned with CD. Meaning, they form a trapezoid. The image will make it clearer:

Any ideas as how to find the required angle between AB and the horizontal plane? The distance between any of the points should not be changed.

Important: Since I'll be implementing the solution in a browser, all the co-ordinates are read from top, left = 0, 0. I'm rotating around the center, in a clockwise direction.

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Implemented in a browser ? So you'll use HTML-JS ? – Aralicia May 22 '13 at 10:49
That said : this question belong more to math.stackexchange.com than to stackoverflow. – Aralicia May 22 '13 at 10:51
Yes. HTML-JS. I've everything in place, just need the math to get the new angle! – Rutwick Gangurde May 22 '13 at 11:35

You want

``````AB x sin angle-AB = Dy - Cy
angle-AB = arcsin((Dy - Cy)/AB)
``````

Dy is y coordinate of D

Cy is y coordinate of C

AB is length of AB

angle-AB is angle of AB relative to horizontal line

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Thanks! Let me try this. – Rutwick Gangurde May 22 '13 at 11:38
Thanks, it gives the angle! But there is a situation, where the line AB can never be aligned with CD without changing its distance. I'm looking into it now. Yours is the closest answer! – Rutwick Gangurde May 22 '13 at 14:07
You're right, I did not consider the corner cases. Left as an exercise for the reader. But I'm glad to have helped. :) – lurker May 22 '13 at 15:12
The trick is to change AB's angle to match CD's, then zoom the image on which the points lie in order to align them in a straight line. – Rutwick Gangurde May 23 '13 at 5:15

You've initially said you know the angles between the lines and horizontal

I know their x, y co-ordinates and the angles they make with the horizontal plane.

but then you ask for them in the question?

how to find the required angle between AB and the horizontal plane

Plus AB and CD lengths must be changed to form a parallelogram (as parallelogram has opposite sides equal in length and parallel)

The distance between any of the points should not be changed. Can't be true

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Please read the question properly. I need to adjust, meaning reset the angle for the line AB to align the points with CD. – Rutwick Gangurde May 22 '13 at 11:35
And yes, if you rotate the line AB around A to align the co-ordinates, the distance stays the same. – Rutwick Gangurde May 22 '13 at 11:37
If you rotate around A, Bx and By coordinates are surely going to change? – churchley May 22 '13 at 11:47
The distance AB and BD will be reduced, I can't see it any other way. Yes all Other lengths should remain the same – churchley May 22 '13 at 11:49
If you align A with C, and then rotate B around A, then you can have B aligned with D without changing the distance. – Rutwick Gangurde May 22 '13 at 11:52