![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=419536168ec9d571083ef04fed2bdf82.png\")
satisfiesStep 1 :
\Alternating Series Test :
\If the alternating series satisfies
(i) ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=0400294aba82ac72c7891adb7417c4ea.png\")
(ii) ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=948244a04c2bbf957b3ebb7a9bd6bcdc.png\")
then the series is convergent.
\Step 2 :
\The series is ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=954b08d56fdfc6891aa30cfe9515fa83.png\")
.
Verify condition (i) :
\Since the series is alternating, verify condition (i) and (ii) of the Alternating Series Test.
\It is not obvious that the sequence given by ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=702c742a6ac677dfd2161e98be41e8ef.png\")
is decreasing.
So consider the related function ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=3ab9269b301ce2c40b9f01a397287014.png\")
.
Differentiate the function with respect to x .
\![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=b091fd8d54f1538d9484dcec808f197c.png\")
Since we are considering only positive x , consider ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=61cd0c30b37fef3daecfe1cc2eb76114.png\")
.
![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=517dc9877f86be9f3b8ad7ab60b5d6bc.png\")
The above statement is false.
\Since the above statement is false, the series does not satisfies condition (i).
\Thus, the given series is divergent by the Alternating Series Test.
\Solution :
\The series is divergent.