functionsarcsin

The term functionsarcsin refers to the inverse sine function, commonly written as arcsin(x) or sin^{-1}(x). It returns an angle y in radians such that sin(y) = x, with the angle chosen in the principal value range.

Domain and range: The input x must lie in [-1, 1]. The output y lies in [-π/2,

Properties: Functionsarcsin is an increasing function on its domain, and it is odd, meaning arcsin(-x) = -arcsin(x).

Relations and identities: For any real θ, arcsin(sin(θ)) equals θ only when θ lies in the principal range [-π/2,

Series and computation: arcsin(x) has a power series about x = 0: arcsin(x) = ∑_{n=0}^∞ [(2n)! / (4^n (n!)^2

Applications: Functionsarcsin is used in solving triangles, integrating certain expressions, and in fields requiring inverse trigonometric