Week Date Subject Material Reference
37 Mon 13.9.
Wed 15.9. 		Sequences, limits, functions
Derivative 		Sequences Continuity
Derivative 		Adams: 1 Limits and Continuity
Adams: 2.2 Derivative
38 Mon 20.9.
Wed 22.9. 		Optimisation, differentiation techniques
Taylor polynomials, pointwise approximation		 Elementary Functions
Taylor Polynomial 		Adams: 2 Differentiation
Adams: 3 Trancendental Functions
Adams: 4 More Applications of Differentiation
Adams: 4.10 Taylor Polynomials
39 Mon 27.9.
Wed 29.9. 		Series
Definition of a definite integral as a limit and numerical quadratures 		Series
Integral 		Adams: 9 Series
Adams: 5.3 The Definite Integral, 6.6 The Trapezoid Rule and Midpoint Rules
40 Mon 4.10.
Wed 6.10. 		Integration techniques
Integration by parts 		Adams: 5.6 The Method of Substitution
Adams: 6.1 Integration by Parts
41 Mon 11.10.
Wed 13.10. 		Ordinary differential equations
Solution techniques, Euler's method 		Differential Equation
Adams: 7.9 First-Order Differential Equations
42 Mon 18.10.
Wed 20.10. 		Harmonic oscillator
Revision 		Adams: 3.7 Second-Order Linear DEs with Constant Coefficients
Adams: Appendix I Complex Numbers
Last modified: Thursday, 26 August 2021, 11:44 AM