Exercise 11.  Show that  [Graphics:Images/ComplexGeometryContinuedModHome_gr_379.gif].  

Solution 11.

See text and/or instructor's solution manual.

    Let  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_380.gif].  Then  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_381.gif].  

Hence,  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_382.gif],  so  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_383.gif],  or  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_384.gif].  Thus,  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_385.gif].  

    The proof that  [Graphics:../Images/ComplexGeometryContinuedModHome_gr_386.gif]  is similar.  

 

This solution is complements of the authors.

 

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