# Arctan > 1 newbie question

It has been quite some time since I've had to compute the theta of an angle. But given a right angle:

``````  |
|
b |
-----------------
a
``````

I'm trying to compute theta (the slope of the angle). My understanding of trigonometry (as rusty as it is) is that theta = arctan(b/a). So if b = 50 and a = 1811. Then using the windows calculator, 50 / 1811 = 0.027609055770292655991165102153506. Therefore the arctan(b/a) = 1.5814806205083755492980816356377. If my math is correct, how do I translate this value into the slope of the angle? It should be around 30-40 degrees, right?

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If a is 50 and b is 1811, a result of 1.6 degrees seems reasonable. You can convert between radians and degrees via : degrees = (180/pi) * radians –  Mikeb Sep 15 '09 at 21:14
Yep...not sure exactly where you're guessing 30-40 degrees...but no...50/1811 won't give you something like 30-40 degrees. Think of it this way...50/50 would give you 45 degrees. –  Beska Sep 15 '09 at 21:25
There seems to be some confusing terminology here ... usually theta is used to represent an angle (not the 'slope' of the angle). Slope describes a LINE, it the angle between the line and the x-axis. –  pavium Sep 15 '09 at 21:32

``````atan2(y, x)
``````

will return you the angle in radians (and successfully cope with the cases where x and/or y are 0).

To convert to degrees apply the following formula:

``````double degrees = radians * (180 / PI)
``````

Where `PI` is 3.141592... or `math.pi` in c#

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If you use a C dialect then there a useful function for just this purpose

``````atan2(y, x);
``````
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It seems worth pointing out that the reason this 2-argument function is nice is because a single argument (atan(r)) cannot distinguish between all possible angles, so you will see only 2 quadrants of 4 in the outputs of this function. The 2-arg version notes what quadrant the x-y coords are in and adjusts the result appropriately. –  Mikeb Sep 15 '09 at 21:16