Exercise 3.  Find the image of the vertical line  [Graphics:Images/ComplexFunReciprocalModHome_gr_89.gif]  under the reciprocal transformation  [Graphics:Images/ComplexFunReciprocalModHome_gr_90.gif].  

Make sketches and indicate the points  [Graphics:Images/ComplexFunReciprocalModHome_gr_91.gif]  in the z-plane and their images [Graphics:Images/ComplexFunReciprocalModHome_gr_92.gif] in the w-plane.

Solution 3.

See text and/or instructor's solution manual.

Answer.  The circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_93.gif][Graphics:../Images/ComplexFunReciprocalModHome_gr_94.gif].  

The points [Graphics:../Images/ComplexFunReciprocalModHome_gr_95.gif]  are mapped onto  [Graphics:../Images/ComplexFunReciprocalModHome_gr_96.gif].

          

              [Graphics:../Images/ComplexFunReciprocalModHome_gr_97.gif]            [Graphics:../Images/ComplexFunReciprocalModHome_gr_98.gif]

  

Graph of the vertical line  [Graphics:../Images/ComplexFunReciprocalModHome_gr_99.gif],  using the parametric equations  [Graphics:../Images/ComplexFunReciprocalModHome_gr_100.gif],  and the image circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_101.gif],  using the
parametric equations  [Graphics:../Images/ComplexFunReciprocalModHome_gr_102.gif],   and   [Graphics:../Images/ComplexFunReciprocalModHome_gr_103.gif].  

Solution using algebra.

      The inverse mapping is  [Graphics:../Images/ComplexFunReciprocalModHome_gr_104.gif][Graphics:../Images/ComplexFunReciprocalModHome_gr_105.gif].   

Now use the substitution  [Graphics:../Images/ComplexFunReciprocalModHome_gr_106.gif]  and get:

        [Graphics:../Images/ComplexFunReciprocalModHome_gr_107.gif]  

This is an equation of the circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_108.gif][Graphics:../Images/ComplexFunReciprocalModHome_gr_109.gif].  

We are done.   

          

              [Graphics:../Images/ComplexFunReciprocalModHome_gr_110.gif]            [Graphics:../Images/ComplexFunReciprocalModHome_gr_111.gif]

  

                    The vertical line  [Graphics:../Images/ComplexFunReciprocalModHome_gr_112.gif]  and the image circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_113.gif],  divide the z-plane and w-plane into two pieces.

Solution using point images.  

      The points [Graphics:../Images/ComplexFunReciprocalModHome_gr_114.gif]  lie on the vertical line  [Graphics:../Images/ComplexFunReciprocalModHome_gr_115.gif]  in the z-plane.  

Their image points are  [Graphics:../Images/ComplexFunReciprocalModHome_gr_116.gif],  and these three points  [Graphics:../Images/ComplexFunReciprocalModHome_gr_117.gif]  

determine the circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_118.gif][Graphics:../Images/ComplexFunReciprocalModHome_gr_119.gif]  in the w-plane.  

If we observe that the center of the circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_120.gif]  is  [Graphics:../Images/ComplexFunReciprocalModHome_gr_121.gif],  then an easy calculation shows that

[Graphics:../Images/ComplexFunReciprocalModHome_gr_122.gif],  [Graphics:../Images/ComplexFunReciprocalModHome_gr_123.gif],  and  [Graphics:../Images/ComplexFunReciprocalModHome_gr_124.gif],  

and we have verified this observation.  

Aside.  We can let Mathematica double check our work.

[Graphics:../Images/ComplexFunReciprocalModHome_gr_125.gif]

          

              [Graphics:../Images/ComplexFunReciprocalModHome_gr_126.gif]            [Graphics:../Images/ComplexFunReciprocalModHome_gr_127.gif]

  

                    The vertical line  [Graphics:../Images/ComplexFunReciprocalModHome_gr_128.gif]  and the image circle  [Graphics:../Images/ComplexFunReciprocalModHome_gr_129.gif].

                    The points [Graphics:../Images/ComplexFunReciprocalModHome_gr_130.gif]  and  [Graphics:../Images/ComplexFunReciprocalModHome_gr_131.gif].

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

This solution is complements of the authors.

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

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