OEF arccos --- Introduction ---

This module actually contains 7 exercises on inverse trigonometric functions: arccos, arcsin, arctg, et leurs compositions.

arccos(cos)

Compute x=arc(()), writing it under the form x=+, where and are rational numbers.

Linear arccos(cos)

For x within the interval [,], one can simplify the function (x)=arc((x)) to a linear function of the form + . What is this linear function?

Definition domain (Arcsin, Arcos)

Let be the function defined by . The definition domain of is composed of disjoint intervals. The definition domain is the reunion of intervals : What are their bounds (in increasing order)
,   , .
if a bound is infinity, write +inf or -inf

arccos(sin)

Compute x=arc(()), writing it under the form x=+, where and are rational numbers.

arctg(tg)

Compute x=arctg(tg()), writing it under the form x=+, where and are rational numbers.

Composed differentiability

Is the function (x)=arc((x)) differentiable in the interval [,] ?

Composed range

Consider the function (x) = . Determine the (maximal) interval of definition I and the image interval J of .

To give your reply, let I=[,] (open or closed), J=[,] (open or closed). Write "pi", "F" or "-F" to designate , or -. The most recent version


This page is not in its usual appearance because WIMS is unable to recognize your web browser.

In order to access WIMS services, you need a browser supporting forms. In order to test the browser you are using, please type the word wims here: and press ``Enter''.

Please take note that WIMS pages are interactively generated; they are not ordinary HTML files. They must be used interactively ONLINE. It is useless for you to gather them through a robot program.

Description: collection of exercises on inverse trigonometric functions. exercises interactifs, calcul et tracÚ de graphes en ligne

Keywords: interactive mathematics, interactive math, server side interactivity, analysis, arccos, acos, arcsin, asin, arctan, atan, arctg