Week 1 (Aug 27 - Aug 31)
- Introductory Day + Preliminaries
- Ch 1: Completeness Axiom
- Ch 1: Integers, Rationals
- Ch 1: Inequalities, Identities
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- Labor Day (No Class)
- Ch 2: Covergence of Sequences
- Ch 2: Sequences and Sets
- Hands On Day
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- Ch 2: Monotone Convergence Thm
- Ch 2: Sequential Compactness
- Hands On Day
- Ch 3: Continuity
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Week 4 (Sep 17 - Sep 21)
- Ch 3: Extreme Value Theorem
- Ch 3: Intermediate Value Theorem
- Ch 3: Uniform Continuity
- Hands On Day
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Week 5 (Sep 24 - Sep 28)
- Ch 3: ε-δ Criterion for Continuity
- Hands On Day
- Exam One
- Ch 3: Images and Inverses
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Week 6 (Oct 1 - Oct 5)
- Ch 3: Limits
- Ch 4: Algebra of Derivatives
- Hands On Day
- Ch 4: Differentiating Inverses/Compositions
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- Ch 4: Mean Value Theorem
- Ch 4: Cauchy Mean Value Theorem
- Hands On Day
- Ch 4: Leibnix Notation
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Week 8 (Oct 15 - Oct 19)
- Fall Break
- Fall Break
- Ch 5: Solutions of ODE's
- Ch 5: Logs and Exps
- Skip Trigs, Inverse Trigs
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Week 9 (Oct 22 - Oct 26)
- Ch 6: Darboux Sums
- Hands On Day
- Exam Two
- Ch 6: Archimedes-Riemann
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Week 10 (Oct 29 - Nov 2)
- Ch 6: Additivity, Montonicity, Linearlty
- Ch 6: Continuity and Integrability
- Ch 6: First Fundamental Theorem
- Hands On Day
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- Ch 6: Second Fundamental Theorem
- Ch 7: Solutions of ODE's
- Hands On Day
- Ch 7: Integration by Parts, Substitution
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- Ch 7: Convergence of Darboux/Riemann sums
- Hands On Day
- Exam Three
- Ch 7: Approximating Integrals
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Week 13 (Nov 19 - Nov 23)
- Ch 8: Taylor Polynomials
- Ch 8: Lagrange Remainder Theorem
- Thanksgiving
- Thanksgiving
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Week 14 (Nov 26 - Nov 30)
- Ch 8: Convergence of Taylor Polynomials
- Ch 8: Logarithm as Power Series
- Hands On Day
- Ch 8: Cauchy Integral Remainder Theorem
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Week 15 (Dec 3 - Dec 7)
- Ch 8: A Monstrous Function
- Weierstrass Approximation Theorem
- No Class (Reading Period)
- No Class (Reading Period)
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