![\"\"](\"http://www.mathskey.com/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=91b049cfac417525ea0dfadf3249657c.png\")
has exactly n distinct complex ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=903feea4806a25e1e1fb2d61704a91b1.png\")
roots. Step 1 :
\Theorem :
\If n is a positive integer, the complex number has exactly n distinct complex roots.
The complex roots are ![\"\"](\"http://www.mathskey.com/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=155deef4d79c9e18a01aa04af73f79a1.png\")
, where ![\"\"](\"http://www.mathskey.com/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=1c4e82e71b5229eb4cbb63c239bf73a6.png\")
.
Step 2 :
\The complex number is ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=a1318b3369f2b6b75d07b1758043c280.png\")
.
First convert the complex number into polar form.
\ Compare the complex number with ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=a4671e6db6ddaeb646363a670e838b2e.png\")
.
![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=5cf0d763650091d0db6728cafe4b12f2.png\")
.
![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=4a50a2097f0e66192d0c29f64fe20ca5.png\")
The angle is ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=1325dbd64f978abfd4681af91eb29979.png\")
.
\
![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=34e91d216a5a6cc553c86d4328a780d7.png\")
The polar form of ![\"\"](\"http://www.mathskey.com/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=a1318b3369f2b6b75d07b1758043c280.png\")
is ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=374f49b6973e3a4831516b942cc7d2e2.png\")
.
The complex fourth roots of ![\"\"](\"http://www.mathskey.com/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=374f49b6973e3a4831516b942cc7d2e2.png\")
are :
![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=b446cb413a2195857f38d3a093ce4444.png\")
, here n = 4 and k = 0, 1, 2 and 3.
Step 3 :
\The four complex roots are :
\For k = 0,
\![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=643a8db8e1130ba3f93306294bf4e451.png\")
For k = 1,
\![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=7c1518a81dbf69f6293f2d118fe4961c.png\")
For k = 2,
\![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=ab755a26c7da87f7f9776783be91b0fe.png\")
\
For k = 3,
\![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=fd61efb028f7ea64f0d0896ab0aeeca6.png\")
The complex fourth roots of are ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=16763e5e7e74e0b67468e4ea134a6b17.png\")
Step 4:
\Graph the complex number is,
![\"\"](\"/userfiles/26644.gif\")
Solution :
\The complex fourth roots of are
Graph the complex number is,