A rigorous treatment of the theory of functions of a single real variable: functions, countable and uncountable sets; the axioms and basic topology of the real numbers; convergence of sequences; limits of functions, continuity and uniform continuity; differentiability and the mean value theorem; the Riemann integral and the fundamental theorem of calculus; series and convergence tests. Mathematics 355 will contain more challenging and deeper assessment than Mathematics 335.
This course may not be repeated for credit.
Prerequisite(s)
- Mathematics 267 or 277; and Mathematics 271 or 273.
Antirequisite(s)
- Credit for Mathematics 355 and 335 will not be allowed.
Sections