![\"\"](\"http://www.mathskey.com/userfiles/image/steps_images/step1.JPG\")
Second part of Theorem 5.7 : If a function is one-to-one(and therefore has an inverse function), then must the function be strictly monotonic.
\This is not true.
\Counter example :
\Consider the function as ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=c5f4c05eee12b6a0ab476c623fddc81e.png\")
.
The function is one-to-one, but not monotonic.
\Draw a coordinate plane.
\Graph the function ![\"\"](\"http://www.mathskey.com/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=c5f4c05eee12b6a0ab476c623fddc81e.png\")
.
Graph :
\![\"\"](\"/userfiles/48-351-110.gif\")
Observe the above graph :
\The local maximum is ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=1acc355595661606afb7736e24ff7436.png\")
and local minimum is ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=390d44e531534585b2319ce73016c6e2.png\")
.
From the graph, the statement " If a function is one-to-one and continuous, then it isstrictly monotonic ".
\![\"\"](\"http://www.mathskey.com/userfiles/image/steps_images/solution.JPG\")
No, converse of the second part of Theorem 5.7 is not true.