Exercise 1.  Find all values for

1 (c).  [Graphics:Images/ComplexFunLogarithmModHome_gr_63.gif].  

Solution 1 (c).

See text and/or instructor's solution manual.

Answer.  [Graphics:../Images/ComplexFunLogarithmModHome_gr_64.gif].

Solution.   Use formula (5-14)   [Graphics:../Images/ComplexFunLogarithmModHome_gr_65.gif]   where   [Graphics:../Images/ComplexFunLogarithmModHome_gr_66.gif]  and  [Graphics:../Images/ComplexFunLogarithmModHome_gr_67.gif].

Calculate   [Graphics:../Images/ComplexFunLogarithmModHome_gr_68.gif]   and   [Graphics:../Images/ComplexFunLogarithmModHome_gr_69.gif],   where  [Graphics:../Images/ComplexFunLogarithmModHome_gr_70.gif].  

Then we have  [Graphics:../Images/ComplexFunLogarithmModHome_gr_71.gif].

We are done.   

Aside.  We can let Mathematica check our work.

[Graphics:../Images/ComplexFunLogarithmModHome_gr_72.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_73.gif]

We are really done.   

Aside.  Contrast this solution with the multivalued logarithm  [Graphics:../Images/ComplexFunLogarithmModHome_gr_74.gif].  

Since  [Graphics:../Images/ComplexFunLogarithmModHome_gr_75.gif],  for this problem we have the relation

[Graphics:../Images/ComplexFunLogarithmModHome_gr_76.gif][Graphics:../Images/ComplexFunLogarithmModHome_gr_77.gif].   

That is   [Graphics:../Images/ComplexFunLogarithmModHome_gr_78.gif].  

Aside.  We can let Mathematica double check our work.

[Graphics:../Images/ComplexFunLogarithmModHome_gr_79.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_80.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_81.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_82.gif]


[Graphics:../Images/ComplexFunLogarithmModHome_gr_83.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_84.gif]


[Graphics:../Images/ComplexFunLogarithmModHome_gr_85.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_86.gif]


[Graphics:../Images/ComplexFunLogarithmModHome_gr_87.gif]

[Graphics:../Images/ComplexFunLogarithmModHome_gr_88.gif]

 

[Graphics:../Images/ComplexFunLogarithmModHome_gr_89.gif][Graphics:../Images/ComplexFunLogarithmModHome_gr_90.gif][Graphics:../Images/ComplexFunLogarithmModHome_gr_91.gif]

                                                            The point  [Graphics:../Images/ComplexFunLogarithmModHome_gr_92.gif],   and the principal value  [Graphics:../Images/ComplexFunLogarithmModHome_gr_93.gif],   
                                                            and some of the points  [Graphics:../Images/ComplexFunLogarithmModHome_gr_94.gif].

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

This solution is complements of the authors.

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) 2008 John H. Mathews, Russell W. Howell