| 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)
🔗 CLUE Exam Archive (UW students only) Google “UW CLUE past exams” → select Math → 327 (requires UW login)
This is a for finding and using the UW Math 327 (Advanced Calculus / Introduction to Real Analysis) exam archive.
If you're looking to calculate wet bulb temperature for many states, basic Excel is not going to be the best option. You're really going to want an actual programming language for that.
If you're looking to calculate wet bulb temperature for many states, basic Excel is not going to be the best option. You're really going to want an actual programming language for that.
| 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)
🔗 CLUE Exam Archive (UW students only) Google “UW CLUE past exams” → select Math → 327 (requires UW login) uw math 327 exam archive
This is a for finding and using the UW Math 327 (Advanced Calculus / Introduction to Real Analysis) exam archive. | Midterm 1 | Midterm 2 | Final