# what is the difference between atan and atan2 in c++?

what is the difference between `atan` and `atan2` in c++ ?

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`std::atan2` allows calculating the arctangent of all four quadrants. `std::atan` only allows calculating from, if I remember right, quadrants 1 and 4.

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From school mathematics we know that the tangent has the definition

``````tan(α) = sin(α) / cos(α)
``````

and we differentiate between four quadrants based on the angle that we supply to the functions. The sign of the `sin`, `cos` and `tan` have the following relationship (where we neglect the exact multiples of `π/2`):

``````  Quadrant    Angle              sin    cos    tan
----------------------------------------------------
I           0    < α < π/2     > 0    > 0    > 0
II          π/2  < α < π       > 0    < 0    < 0
III         π    < α < 3π/2    < 0    < 0    > 0
IV          3π/2 < α < 2π      < 0    > 0    < 0
``````

Given that the value of `tan(α)` is positive, we cannot distinguish, whether the angle was from the first or third quadrant and if it is negative, it could come from the second or fourth quadrant. So by convention, `atan()` returns an angle from the first or fourth quadrant (i.e. `-π/2 <= atan() <= π/2`), regardless of the original input to the tangent.

In order to get back the full information, we must not use the result of the division `sin(α) / cos(α)` but we have to look at the values of the sine and cosine separately. And this is what `atan2()` does. It takes both, the `sin(α)` and `cos(α)` and resolves all four quadrants by adding `π` to the result of `atan()` whenever the cosine is negative.

Remark: The `atan2(y, x)` function actually takes a `y` and a `x` argument, which is the projection of a vector with length `v` and angle `α` on the y- and x-axis, i.e.

``````y = v * sin(α)
x = v * cos(α)
``````

which gives the relation

``````y/x = tan(α)
``````

Conclusion: `atan(y/x)` is held back some information and can only assume that the input came from quadrants I or IV. In contrast, `atan2(y,x)` gets all the data and thus can resolve the correct angle.

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Looks like a great answer. –  Sergey K. Aug 27 at 14:00

Another thing to mention is that atan2 is more stable when computing tangents using an expression like atan(y/x) and x is 0 or close to 0.

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atan(x) Returns the principal value of the arc tangent of x, expressed in radians.

atan2(y,x) Returns the principal value of the arc tangent of y/x, expressed in radians.

Notice that because of the sign ambiguity, a function cannot determine with certainty in which quadrant the angle falls only by its tangent value (atan alone). You can use atan2 if you need to determine the quadrant.

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atan2(x,y) -> atan2(y,x) –  yesraaj Nov 12 '08 at 9:34
fixed. For future lazy questions I recommend cplusplus.com –  Roman M Nov 12 '08 at 9:39

With atan2 you can determine the quadrant as stated here.

You can use atan2 if you need to determine the quadrant.

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If all you have is `p=y/x` you can still use `atan2(p,1)`. –  Mark Ransom Mar 9 '12 at 21:03