arctan

Arctan, denoted arctan x or tan^{-1} x, is the inverse function of the tangent when the latter is restricted to its principal branch. It maps real numbers to the interval (-pi/2, pi/2) and satisfies tan(arctan x) = x for all real x. The function is strictly increasing and smooth, with derivative d/dx arctan x = 1/(1 + x^2). In particular, arctan 0 = 0 and as x approaches ±∞, arctan x approaches ± pi/2.

Arctan can be expressed as an integral and by a power series. It satisfies arctan x = ∫_0^x

Addition formulas for arctan relate sums of arctan terms to a single arctan value, typically arctan x

Applications of arctan include determining angles from slopes, evaluating certain integrals such as ∫ dx/(1 + x^2), and