Take the hardest question from each archived exam. Reverse-engineer it: Why did the professor choose those specific numbers? What theorem is being tested? Often, you will discover that exams test the same 8-10 core theorems cyclically:
| Midterm 1 | Midterm 2 | Final (cumulative) | |-----------|-----------|--------------------| | Supremum/infimum, Archimedean property | Sequences & series (Cauchy, limit sup/inf) | Uniform continuity | | ε-N proofs for limits | Continuity (ε-δ on metric spaces) | Riemann integrability | | Open/closed sets in R | Compactness (Heine-Borel) | Monotone & dominated convergence | | | | : Metric spaces (if instructor finishes) uw math 327 exam archive
. These resources typically cover topics such as number systems, sequences, limits, series convergence tests, and uniform continuity. Department of Mathematics | University of Washington Primary Exam Archives Take the hardest question from each archived exam
Key differentiators of Math 327:
The archive reveals your weak spots. Missed the proof about diagonalizability? Re-read that section in Lay’s Linear Algebra and Its Applications (the course textbook). Often, you will discover that exams test the