Internet Resources

for

Simpson's Rule for Numerical Integration

Return to Numerical Methods - Numerical Analysis

 

 

  1. Visual Calculus, Simpson's Rule  
    Lawrence S. Husch, University of Tennessee, Knoxville, TN  
  2. Simpson's Rule  
    Dept. of Math. and Computer Science, Emory University, Atlanta, Georgia  
  3. Numerical Integration - Simpson's Rule  
    Ron Winther, The Undergraduate Computational Engineering and Sciences (UCES) Project  
  4. Mathematics ducation Technology-Research at Imperial College, Simpson's Rule  
    Phil Ramsden, The METRIC Project, Mathematics Department, Imperial College, London, England  
  5. Numerical Integration, Simpson's Rule for the HP-33E/C  
    David G. Hicks, The Museum of HP Calculators  
  6. Simpson's Rule  
    Charles C. Dyer and Peter S. S. Ip, University of Toronto, Scarborough, Canada  
  7. Simpson's Rule  
    Gilberto Schleiniger, University of Delaware, Newark, DE  
  8. Adaptive Simpson's rule
    J. Thomas King, University of Cincinnati, Cincinnati, OH  
  9. Matlab, Adaptive Gaussian Quadrature  
    European Laboratory for Particle Physics, Organisation Européenne pour la Recherche Nucléair (CERN), Geneva  
  10. Adaptive Integration using Simpson's rule  
    Graeme Chandler, University of Queensland, Brisbane, Queensland, Australia   
  11. Numerical Integration, Newton - Cotes rules  
    Jun Ni, College of Engineering. The University of Iowa, Iowa City, Iowa   
  12. Numerical Integration, Simpson's Rule  
    R. J. Hosking, Mahidol University, Mahidol University, Bangkok, Thailand        

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2004