Matrix Algebra and Solution of Matrix Equations Introduction Manipulation of Matrices Interactive Operation Solution of Matrix Equation Program Gauss - Gaussian Elimination Method Program GauJor - Gauss-Jordan Elimination Matrix Inversion, Determinant, and Program MatxInvD Transformation of Coordinate Systems, Rotation, and Animation Problems Exact, Least-Squares, and Spline Curve-Fits Introduction Exact Curve Fit Program LeastSq1- Linear Least-Squares Curve-Fit Program LeastSqG - Generalized Least-Squares Curve-Fit Program CubeSpln - Curve Fitting with Cubic Spline Problems Roots of Polynomial and Transcendental Equations Introduction Iterative Methods and Program Roots Incremental and Bisection Search Linear Interpolation Newton-Raphson Method Successive Substitution Program NewRaphG - Generalized Newton-Raphson Iterative Method Program Bairstow - Bairstow Method for Finding Polynomial Roots Problems Finite Differences, Interpolation, and Numerical Differentiation Introduction Finite Differences and Program DiffTabl - Constructing Difference Table Program LagrangI - Applications of Lagrangian Interpolation Formula Problems Numerical Integration and Program Volume Introduction Program NuIntGra - Numerical Integration by Application of the Trapezoidal and Simpson Rules Program Volume - Numerical Solution of Double Integral Problems Ordinary Differential Equations - Initial and Boundary Value Problems Introduction Program RungeKut - Application of Runge-Kutta Method for Solving the Initial-Value Problems Program OdeBvpRK - Application of Runge-Kutta Method for Solving Boundary-Value Problems Program OdeBvpFD - Application of Finite-Difference Method for Solving Boundary-Value Problems Problems Eigenvalue and Eigenvector Problems Introduction Programs EigenODE.Stb and EigenODE.Vib - for Solving Stability and Vibration Problems Progr
