Bounded subsets of the real line; supremum and infimum, completeness axiom; convergent sequences, Cauchy criterion, subsequences; series of numbers, generalized tests of convergence; limits of functions, continuity on an interval, intermediate value property, extrema; differentiability, mean value theorem and its consequences, Taylor's theorem; Riemann integral; Uniform convergence of sequences and series of functions, tests for uniform convergence, power series. Prerequisites: MATH 201