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Real analysis: inequalities, the continuum property, induction, sequences, functions and limits, continuity, contraction mappings and fixed points, differentiation, mean value theorems and Taylor's theorem. Complex analysis: geometry in the complex plane, limits and continuity, holomorphic functions, line integrals, Cauchy's theorem and some elementary consequences, singularities and Laurent's theorem, the calculus of residues and some applications.
|2018||Semester One full semester||Internal||Auckland Campus|
|2018||Semester Two full semester||Internal||Manawatu Campus|
|2018||Semester Two full semester||Distance|
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