Exercise 3.  Find the radius of convergence of the following.  

3 (i).  [Graphics:Images/ComplexPowerSeriesModHome_gr_432.gif].  

Solution 3 (i).

See text and/or instructor's solution manual.

Answer   The radius of convergence of  [Graphics:../Images/ComplexPowerSeriesModHome_gr_433.gif]  is   [Graphics:../Images/ComplexPowerSeriesModHome_gr_434.gif].

Solution.  For   [Graphics:../Images/ComplexPowerSeriesModHome_gr_435.gif],  we have  [Graphics:../Images/ComplexPowerSeriesModHome_gr_436.gif].  

Use Theorem 4.16 and calculate the limit superior in the Cauchy-Hadamard Formula:    

                    [Graphics:../Images/ComplexPowerSeriesModHome_gr_437.gif].

The radius of convergence of the series  [Graphics:../Images/ComplexPowerSeriesModHome_gr_438.gif]  is  [Graphics:../Images/ComplexPowerSeriesModHome_gr_439.gif].  

Thus   [Graphics:../Images/ComplexPowerSeriesModHome_gr_440.gif]  converges for all  [Graphics:../Images/ComplexPowerSeriesModHome_gr_441.gif].

We are done.   

Aside.  Make the substitution [Graphics:../Images/ComplexPowerSeriesModHome_gr_442.gif], and notice that this is the geometric series  [Graphics:../Images/ComplexPowerSeriesModHome_gr_443.gif],  which converges for  [Graphics:../Images/ComplexPowerSeriesModHome_gr_444.gif].

                    [Graphics:../Images/ComplexPowerSeriesModHome_gr_445.gif],

which converges for  [Graphics:../Images/ComplexPowerSeriesModHome_gr_446.gif],  has radius of convergence [Graphics:../Images/ComplexPowerSeriesModHome_gr_447.gif].

We are really done.   

Aside.  We can let Mathematica double check our work.

[Graphics:../Images/ComplexPowerSeriesModHome_gr_448.gif]

[Graphics:../Images/ComplexPowerSeriesModHome_gr_449.gif]

                                                                                [Graphics:../Images/ComplexPowerSeriesModHome_gr_450.gif]

                              The domain set  [Graphics:../Images/ComplexPowerSeriesModHome_gr_451.gif]  that is used to produce the images
                              under  [Graphics:../Images/ComplexPowerSeriesModHome_gr_452.gif]

 

[Graphics:../Images/ComplexPowerSeriesModHome_gr_453.gif]          [Graphics:../Images/ComplexPowerSeriesModHome_gr_454.gif]          [Graphics:../Images/ComplexPowerSeriesModHome_gr_455.gif]


[Graphics:../Images/ComplexPowerSeriesModHome_gr_456.gif]          [Graphics:../Images/ComplexPowerSeriesModHome_gr_457.gif]          [Graphics:../Images/ComplexPowerSeriesModHome_gr_458.gif]

     Graphs of the mappings  [Graphics:../Images/ComplexPowerSeriesModHome_gr_459.gif],   [Graphics:../Images/ComplexPowerSeriesModHome_gr_460.gif],   [Graphics:../Images/ComplexPowerSeriesModHome_gr_461.gif],   [Graphics:../Images/ComplexPowerSeriesModHome_gr_462.gif],   [Graphics:../Images/ComplexPowerSeriesModHome_gr_463.gif],   and   [Graphics:../Images/ComplexPowerSeriesModHome_gr_464.gif].

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

This solution is complements of the authors.

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

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