Gwybodaeth Modiwlau

Learning Outcomes

On completion of this module, students should be able to:
1. construct an interpolating polynomial using either the Lagrange or Newton formula, and describe their relative advantages and disadvantages;
2. prove the error formula for Lagrange interpolation;
3. construct divided and forward difference tables for prescribed data;
4. construct a cubic spline interpolant and discuss the advantage of this approach over the use of the Lagrange interpolant;
5. derive the trapezoidal and Simpson's rules for approximating an integral;
6. derive the error term for the trapezoidal rule;
7. derive the formula for Romberg integration;
8. derive Gauss-type integration rules;
9. determine the root(s) of a nonlinear equation using the bisection method, functional iteration and Newton's method;
10. state and prove the conditions under which the sequence x_{r+1}=g(x_[r}) converges to a unique root of the equation x=g(x);
11. determine the order of an iterative process for computing the root of an equation;
12. give a geometrical interpretation of Newton's method;
13. state the conditions under which an initial value problem possesses a unique solution;
14. define the concepts of consistency, convergence and stability for one-step methods for solving initial value problems;
15. compute numerical approximations to the solution of initial value problems using one-step methods including predictor-corrector methods;
16. determine the consistency, convergence and stability of given one-step methods.

Brief description

Aims

Content