The final examination will be held Wednesday, December 16th at 1:30PM in Duffy 205.
The exam will consist of three sections:
Obviously due to time limitations the latter set of proofs will have to be relatively short ones.
The terms will be taken from the following list:
Term | Text Reference |
epsilon neighborhood | Topology Introduction (part 1) |
open set | |
limit point | |
isolated point | |
closed set | |
closure of a set | |
perfect set | |
compliment of a set | |
F-sigma set | |
G-delta set | |
compact set | Topology Introduction (part 2) |
open cover | |
finite subcover | |
separated sets | |
disconnected sets | |
totally disconnected | |
infinitely differentiable | The nth derivative of |
E is dense in R | There is and element of E between any two elements of R |
E is nowhere dense | The closure of E contains no nonempty open intervals |
differentiable at a point | Definition 4.1 |
derivative at a point | |
f is real analytic at x=a | f has a Taylor series expansion that converges to f(x) in some neighborhood of a |
continuously differentiable | Definition 4.6 ii) |
characteristic function of E | takes the value 1 if x is in E, 0 otherwise |
monotone | Definition 4.16 iii) |
partition | Definition 5.1 |
upper Riemann sum | Definition 5.3 i) |
Lower Riemann sum | Definition 5.3 ii) |
Riemann integrable function | Definition 5.9 |
upper integral | Definition 5.13 i) |
lower integral | Definition 5.13 ii) |
The theorems (on the matching section) will be taken from the following list:
Term | Text Reference |
Baire's theorem | Class notes |
Heine-Borel theorem | Class notes |
Taylor's theorem | Theorem 4.24 |
Mean Value theorem | Theorem 4.15 i) |
Generalized Mean Value theorem | Theorem 4.15 ii) |
Rolle's theorem | Lemma 4.12 |
Extreme Value theorem | Class notes |
Inverse Function theorem | Theorem 4.32 |
Topological characterization of continuity | Class notes |
Fundamental Theorem of Calculus | Theorem 5.28 |
Chain Rule | Theorem 4.11 |