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• Week 1: Computer Arithmetic; approximations and errors
• Week 2: Methods for the solutions of non-linear equations and their convergence
• Week 3: Bisection method
• Week 4: Regular Falsi method
• Week 5: Fixed point iteration method, Newton's Rephson method
• Week 6: Secant method, error analysis of iterative method
• Week 7: Gauss-Elimination method, Gauss-Jordan method
• Week 8: Muller's Method, Graeffe's root squaring method, Bairstow Method
• Week 10: Matrix inversion, LU-factorization
• Week 11: Doolittle's Crount's, Cholesk's methods
• Week 12: Gauss-Seidal and Jacobi methods
• Week 13: Interpolation and polynomial approximation
• Week 14: Lagrange interpolation
• Week 15: Newton's divided difference, forward difference and backward difference formulae
• Week 16: Hermite interpolation, Numerical integration and error estimates
• Week 17: Rectangular rule, Trapezoidal rule, Simpson's rule
• Week 18: Final Term Exam
• Week 9: Mid Term Exam