Example 4.  Use the composite Simpson's rule for multiple integrals to numerically approximate the iterated integral  [Graphics:Images/SimpsonsRule2DMod_gr_108.gif].  
Remark. This is the volume of the solid bounded by the surface  [Graphics:Images/SimpsonsRule2DMod_gr_109.gif],  that lies above the square  [Graphics:Images/SimpsonsRule2DMod_gr_110.gif]  in the xy-plane.

Solution 4.

For illustration, we use the grid with  m = 5 and  n = 5.
Enter the integrand.

[Graphics:../Images/SimpsonsRule2DMod_gr_111.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_112.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_113.gif]

The region of integration in the xy-plane can be seen in the following graphical plot.

[Graphics:../Images/SimpsonsRule2DMod_gr_114.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_115.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_116.gif]
[Graphics:../Images/SimpsonsRule2DMod_gr_117.gif]

Execute our subroutine Simpson2D.

[Graphics:../Images/SimpsonsRule2DMod_gr_118.gif]



[Graphics:../Images/SimpsonsRule2DMod_gr_119.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_120.gif]

If you need more decimal places, Mathematica can get them.

[Graphics:../Images/SimpsonsRule2DMod_gr_121.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_122.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_123.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_124.gif]

Next, we find the approximation by using a finer mesh grid.

Execute our subroutine Simpson2D.

[Graphics:../Images/SimpsonsRule2DMod_gr_125.gif]



[Graphics:../Images/SimpsonsRule2DMod_gr_126.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_127.gif]

If you need more decimal places, Mathematica can get them.

[Graphics:../Images/SimpsonsRule2DMod_gr_128.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_129.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_130.gif]

[Graphics:../Images/SimpsonsRule2DMod_gr_131.gif]

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2004