Internet Resources

for

Maclaurin and Taylor Series

Return to Numerical Methods - Numerical Analysis

 

 

  1. Calculus, Taylor Polynomials  
    William W. Farr, Worcester Polytechnic Institute, Worcester, MA  
  2. Taylor Polynomials and Higher Order Approximation  
    Undergraduate Computational Engineering and Science, The Department of Energy (DOE), Krell Institute       
  3. Polynomial Approximation with Taylor's Theorem  
    Graeme Chandler, University of Queensland, Brisbane, Queensland, AU  
  4. MATH-abundance, Taylor and Maclaurin     
    Johan Claeys     
  5. Derivation of Taylor Series Expansion with Remainder  
    Julius O. Smith III, Center for Computer Research in Music and Acoustics (CCRMA),  Stanford University  
  6. Mathematical Tutorial, Taylor Polynomials and Approximations  
    University of Idaho's Engineering Outreach, University of Idaho, Boise, Idaho  
  7. Calculus Tutorial, Taylor's Theorem  
    Mathematics Department, Harvey Mudd College, Claremont, CA  
  8. Theory of the Taylor Expansion  
    Charles C. Dyer and Peter S. S. Ip, Division of Physical Sciences, University of Toronto at Scarborough, CA  
  9. Taylor's Theorem      
    Ian Craw, Department of Mathematical Sciences, Aberdeen, UK     
  10. Approximation by means of Taylor Polynomials Historical perspective, new tools     
    Hebrew University of Jerusalem, Jerusalem, Israel   
  11. Taylor's Theorem      
    G. S. Gill, Brigham Young University, Provo, Utah      
  12. Multivariate polynomial interpolation  
    Shayne Waldron, University of Auckland, New Zealand  
  13. Taylor Polynomial  
    Math. Dept.,  National Tsing Hua Universuty, Hsinchu,Taiwan, Republic of China  
  14. Taylor's Theorem with Several Variables      
    Eric A. Carlen, School of Mathematics, Georgia Institute of Technology, Atlanta, GA  
  15. Taylor Expansion   
    eFunda, engineering fundamentals   
  16. Taylor Series - Why We Want Them and How We Find Them  
    James A. Sellers, Department of Science and Math, Cedarville College     
  17. Taylor Series   
    G. S. Gill, Department of Mathematics , Brigham Young University, Provo, UT  
  18. The Taylor series  
    William A.Cooper, National Center for Atmospheric Research, Boulder, CO      
  19. Approximation to functions, The Taylor series  
    R.J.Hosking, S.Joe, D.C.Joyce, and J.C.Turner, Mahidol University, Bangkok, Thailand  

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2004