sin(X)^-1

arcsin(X)

cos(X)

1/sin(X)

They are also known as arc functions.

The notation -1 indicates an inverse function, not an exponent.

They can be expressed as 1 over the trigonometric function.

They are used to find angles from trigonometric ratios.

Set DV as sin^(-1)(X) and U as 1*dx

Integrate sin^(-1)(X)

Set U as sin^(-1)(X) and DV as 1*dx

Differentiate sin^(-1)(X)

1/sqrt(1 + X^2)

1/sqrt(1 - X^2)

1/(1 - X^2)

1/(1 + X^2)

UV + integral of VDU

U/V - integral of VDU

UV - integral of VDU

U/V + integral of VDU

X * sin^(-1)(X) + integral of X/sqrt(1 - X^2) dx

X * sin^(-1)(X) - integral of X/sqrt(1 - X^2) dx

X * sin^(-1)(X) - integral of 1/sqrt(1 - X^2) dx

X * sin^(-1)(X) + integral of 1/sqrt(1 - X^2) dx

Let W = 1 + X^2

Let W = sqrt(1 - X^2)

Let W = 1 - X^2

Let W = X^2