Table 2.8.1 contains a graph of the principal branch for each of the six trig functions, and the graph of the corresponding inverse function.

Table 2.8.2 lists the derivatives of the six inverse trigonometric functions.

Maple's differentiation formulas are correct for $x$ complex, but in the typical calculus text, the formulas are stated for $x$ real. That is why the textbook formulas have restrictions and vary slightly from the Maple form.

The second column in the table uses the formal name of each inverse function. However, in 2D math mode, Maple understands the usage ${\sin }^{-1}\left(x\right)$ for $\arcsin \left(x\right)$, etc.

The graph of $f^{-1}$, the functional inverse of the function $f$, is the set of ordered pairs in which the abscissas and ordinates have been reversed. This interchange of the values of $x$ and $f\left(x\right)$ can be accomplished graphically by drawing the curve defined parametrically by $x\=f\left(t\right)\,y\=t$, that is, by graphing the points $\left(f\left(x\right)\,x\right)$.

See Example 2.8.1.

The curve drawn parametrically by $x\=f^{-1}\left(t\right)\,y\=t$, that is, the graph of the points $\left(f^{-1}\left(x\right)\,x\right)$, is the graph of the inverse of the inverse, and is therefore the graph of $f$. This device will work to determine the principal branch of each of the trig functions.

See Example 2.8.2.