Recursive Relationship.  

     The Chebyshev polynomials can be generated recursively in the following way.  First, set

        [Graphics:Images/ChebyshevPolyMod_gr_31.gif]  

  and use the recurrence relation

        [Graphics:Images/ChebyshevPolyMod_gr_32.gif].  

Exploration 1.

This is a "classic example" of recursion programming. Enter the following lines into Mathematica to recursively define Chebyshev polynomials.  

 

[Graphics:../Images/ChebyshevPolyMod_gr_33.gif]

Now check it out and see how recursion works.

[Graphics:../Images/ChebyshevPolyMod_gr_34.gif]

[Graphics:../Images/ChebyshevPolyMod_gr_35.gif]


[Graphics:../Images/ChebyshevPolyMod_gr_36.gif]

[Graphics:../Images/ChebyshevPolyMod_gr_37.gif]
[Graphics:../Images/ChebyshevPolyMod_gr_38.gif]


[Graphics:../Images/ChebyshevPolyMod_gr_39.gif]

[Graphics:../Images/ChebyshevPolyMod_gr_40.gif]
[Graphics:../Images/ChebyshevPolyMod_gr_41.gif]


[Graphics:../Images/ChebyshevPolyMod_gr_42.gif]

[Graphics:../Images/ChebyshevPolyMod_gr_43.gif]
[Graphics:../Images/ChebyshevPolyMod_gr_44.gif]


[Graphics:../Images/ChebyshevPolyMod_gr_45.gif]

[Graphics:../Images/ChebyshevPolyMod_gr_46.gif]
[Graphics:../Images/ChebyshevPolyMod_gr_47.gif]


[Graphics:../Images/ChebyshevPolyMod_gr_48.gif]

[Graphics:../Images/ChebyshevPolyMod_gr_49.gif]
[Graphics:../Images/ChebyshevPolyMod_gr_50.gif]

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2004