Example 5.  Find the rational approximation [Graphics:Images/RationalApproxMod_gr_375.gif]for [Graphics:Images/RationalApproxMod_gr_376.gif]  over the interval [-1,1].  
5 (b).  Use Chebyshev interpolation nodes.

Solution 5 (b).

Set up the formula for  [Graphics:../Images/RationalApproxMod_gr_415.gif].

[Graphics:../Images/RationalApproxMod_gr_416.gif]



[Graphics:../Images/RationalApproxMod_gr_417.gif]

Calculate the values for the  [Graphics:../Images/RationalApproxMod_gr_418.gif] Chebyshev interpolation nodes.   

[Graphics:../Images/RationalApproxMod_gr_419.gif]

[Graphics:../Images/RationalApproxMod_gr_420.gif]

Form the  [Graphics:../Images/RationalApproxMod_gr_421.gif] ordinates.  

[Graphics:../Images/RationalApproxMod_gr_422.gif]

[Graphics:../Images/RationalApproxMod_gr_423.gif]

Form the set of  [Graphics:../Images/RationalApproxMod_gr_424.gif] equations to solve and find the solution.

[Graphics:../Images/RationalApproxMod_gr_425.gif]



[Graphics:../Images/RationalApproxMod_gr_426.gif]

Form the Chebyshev rational approximation.

[Graphics:../Images/RationalApproxMod_gr_427.gif]



[Graphics:../Images/RationalApproxMod_gr_428.gif]

Plot graphs of the function and its Chebyshev rational approximation over the interval  [-1,1].  But we will draw the graphs over [-2,2].

[Graphics:../Images/RationalApproxMod_gr_429.gif]

[Graphics:../Images/RationalApproxMod_gr_430.gif]

[Graphics:../Images/RationalApproxMod_gr_431.gif]

Find the error  over the interval  [-1,1].  

[Graphics:../Images/RationalApproxMod_gr_432.gif]

[Graphics:../Images/RationalApproxMod_gr_433.gif]

[Graphics:../Images/RationalApproxMod_gr_434.gif]

Comparison with the Taylor approximation.  

There were 9 coefficients to determine for the rational approximation, and a Maclaurin polynomial of degree 8 requires 9 coefficients.
Compare with the error in a [Graphics:../Images/RationalApproxMod_gr_435.gif] degree Maclaurin polynomial over the interval  [Graphics:../Images/RationalApproxMod_gr_436.gif].  

[Graphics:../Images/RationalApproxMod_gr_437.gif]

[Graphics:../Images/RationalApproxMod_gr_438.gif]

[Graphics:../Images/RationalApproxMod_gr_439.gif]


[Graphics:../Images/RationalApproxMod_gr_440.gif]

[Graphics:../Images/RationalApproxMod_gr_441.gif]

[Graphics:../Images/RationalApproxMod_gr_442.gif]

We can determine how much smaller the error is for the Chebyshev rational approximation.

[Graphics:../Images/RationalApproxMod_gr_443.gif]



[Graphics:../Images/RationalApproxMod_gr_444.gif]

Comparison with the Padé approximation.  

[Graphics:../Images/RationalApproxMod_gr_445.gif]

[Graphics:../Images/RationalApproxMod_gr_446.gif]

[Graphics:../Images/RationalApproxMod_gr_447.gif]


[Graphics:../Images/RationalApproxMod_gr_448.gif]

[Graphics:../Images/RationalApproxMod_gr_449.gif]

[Graphics:../Images/RationalApproxMod_gr_450.gif]

We can determine how much smaller the error is for the Chebyshev rational approximation.

[Graphics:../Images/RationalApproxMod_gr_451.gif]



[Graphics:../Images/RationalApproxMod_gr_452.gif]

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2004