y=arcsinxy = \arcsin x

Inverse Sine (Arcsine) y=arcsinxy = \arcsin x

arcsinx\arcsin x (the inverse sine, or arcsine) is the inverse of the sine function sin\sin. Because sin\sin is periodic, it is not one-to-one over its whole domain. We therefore restrict it to the interval [π2,π2]\left[-\frac{\pi}{2}, \frac{\pi}{2}\right] on which it is increasing and define the inverse there (the principal value) as arcsin\arcsin.

Definition

y=arcsinxy = \arcsin x is the value yy satisfying siny=x\sin y = x with π2yπ2-\dfrac{\pi}{2} \le y \le \dfrac{\pi}{2}.

Domain and range

The domain is 1x1-1 \le x \le 1, that is [1,1][-1, 1], because sin\sin only takes values between 1-1 and 11. The range is [π2,π2]\left[-\dfrac{\pi}{2}, \dfrac{\pi}{2}\right].

Symmetry and monotonicity

arcsin\arcsin is an odd function with arcsin(x)=arcsinx\arcsin(-x) = -\arcsin x, so its graph is symmetric about the origin. Its derivative

ddxarcsinx=11x2(1<x<1)\frac{d}{dx}\arcsin x = \frac{1}{\sqrt{1 - x^2}} \quad (-1 < x < 1)

is always positive, so the function is strictly increasing over its whole domain.

Notable points and tangents

The graph passes through the three points (1,π2)\left(-1, -\dfrac{\pi}{2}\right), (0,0)(0, 0), and (1,π2)\left(1, \dfrac{\pi}{2}\right). At the endpoints x=±1x = \pm 1 the denominator of the derivative tends to 00, so the slope becomes infinite and the tangent is vertical. Near the origin arcsinxx\arcsin x \approx x.

Relation to other functions

There is an important relation with the inverse cosine:

arcsinx+arccosx=π2\arcsin x + \arccos x = \frac{\pi}{2}

so their sum is always a right angle.

Specific values

For example arcsin12=π6\arcsin \dfrac{1}{2} = \dfrac{\pi}{6}, arcsin22=π4\arcsin \dfrac{\sqrt{2}}{2} = \dfrac{\pi}{4}, and arcsin1=π2\arcsin 1 = \dfrac{\pi}{2}.

Applications

It is widely used for inverse problems that recover an angle, for phase calculations in simple harmonic motion and waves, for solving triangles, and for evaluating the integral dx1x2\displaystyle\int \frac{dx}{\sqrt{1 - x^2}}.