Lagrange Interpolating Polynomial -- from Wolfram MathWorld
The Lagrange interpolating polynomial is the polynomial P(x) of degree <=(n-1) that passes through the n points (x_1,y_1=f(x_1)), (x_2,y_2=f(x_2)), , (x_n,y_n=f(x_n)), and is given by P(x)=sum_(j=1)^nP_j(x), (1) where P_j(x)=y_jproduct_(k=1; k!=j)^n(x-x_k)/(x_j-x_k). (2) Written explicitly, P(x) = (3) The formula was first published by Waring (1779), rediscovered by Euler in 1783, and published by Lagrange in 1795 (Jeffreys and Jeffreys 1988). Lagrange interpolating
Lagrange Interpolating Polynomial -- from Wolfram MathWorld
Lagrange polynomial - Wikipedia
Limitations of the polynomial interpolation
Lagrange polynomial - Wikipedia
WOLFRAM MATHEMATICA STUDENT EDITION Demonstrations
Legrangian interpolation using mathematica part 1
PDF) A Computational Approach for Estimating Croatia's Gini Coefficient using Lagrange Interpolation Method for Lorenz Curve Approximation
PDF) Constructing mathematical Models, by Interpolation Methods, of people's interest to listening to Quran's voice or music
Lagrange Interpolating Polynomial -- from Wolfram MathWorld
Lagrange Interpolating Polynomial -- from Wolfram MathWorld
