Content: This is the first part of a three semester introduction into the basic mathematical field of Analysis. Differential and integral calculus in a real variable will be covered.
Topics:
- fundamentals, elementary logic, ordered pairs, relations, functions, domain and range of a function, inverse functions (injectivity, surjectivity)
- numbers, induction, calculations in R, C
- arrangement of R, maximum and minimum, supremum and infimum of real sets, supremum / infimum completeness of R, absolute value of a real number, Q is dense in R
- sequences and series, limits, cauchy sequences, convergence criteria, series and basic principles of convergence
- topological aspects of R, open, closed, and compact real sets
- sequences of functions, series of functions, power series
- properties of functions, boundedness, monotony, convexity
- continuity, limits and continuity of functions, uniform continuity, intermediate value theorems, continuity and compactness
- differentiability, concept of the derivative, differentiation rules, mean value theorem, local and global extrema, curvature, monotony, convexity
- elementary functions, rational functions, root functions, exponential functions, angular functions, hyperbolic functions, real logarithm, inverse trigonometric functions, curve sketching
- beginnings of integral calculus
Detailed Information can be found on the Homepage of 19202801 Analysis I.