the Derivatives of inverse trigonometric

We introduced the six basic inverse trigonometric functions in Section 1.6, but focused
there on the arcsine and arccosine functions. Here we complete the study of how all six inverse
trigonometric functions are defined, graphed, and evaluated, and how their derivatives
are computed.
Inverses of and
The graphs of all six basic inverse trigonometric functions are shown in Figure 3.39. We
obtain these graphs by reflecting the graphs of the restricted trigonometric functions (as
discussed in Section 1.6) through the line Let’s take a closer look at the arctangent,
arccotangent, arcsecant, and arccosecant functionWe introduced the six basic inverse trigonometric functions in Section 1.6, but focused
there on the arcsine and arccosine functions. Here we complete the study of how all six inverse
trigonometric functions are defined, graphed, and evaluated, and how their derivatives
are computed.
Inverses of and
The graphs of all six basic inverse trigonometric functions are shown in Figure 3.39. We
obtain these graphs by reflecting the graphs of the restricted trigonometric functions (as
discussed in Section 1.6) through the line Let’s take a closer look at the arctangent,
arccotangent, arcsecant, and arccosecant functionWe introduced the six basic inverse trigonometric functions in Section 1.6, but focused
there on the arcsine and arccosine functions. Here we complete the study of how all six inverse
trigonometric functions are defined, graphed, and evaluated, and how their derivatives
are computed.
Inverses of and
The graphs of all six basic inverse trigonometric functions are shown in Figure 3.39. We
obtain these graphs by reflecting the graphs of the restricted trigonometric functions (as
discussed in Section 1.6) through the line Let’s take a closer look at the arctangent,
arccotangent, arcsecant, and arccosecant function