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3.4 *The Cantor Set.Limits of Functions
4.1 Definition of Limit for Functions.
4.2 Algebra of Limits of Functions
4.3 One-Sided Limits
4.4 *Infinity in Limits.Continuous Functions
5.1 Continuity of a Function at a Point
5.2 Discontinuities and Monotone Functions
5.3 Continuity on Compact Sets and Intervals
5.
5.
5.
5.Uniform Continuity.. ..........
*Monotonicity, Continuity, and Inverses.
*Exponentials, Powers, and Logarithms.
*sets of Points of Discontinuity (Project)Differentiable Functions
6.1 The Derivative and Differentiability
6.2 Rules for Differentiation ......
6.
6.
6.
6.Local Extrema and Monotone Functions
Mean-Value Type Theorems
Taylor's Theorem
*L'Hopital's RuleThe Riemann Integral
7.1 Refresher on Suprema, Infima , and the Forcing Principle
7.2 The Riemann Integral Defined .......
7.3 The Integral as a Limit of Riemann Sums.
7.
7.
7.
7.
7.
7.Basic Existence and Additivity Theorems.
Algebraic Properties of the Integral..
The Fundamental Theorem of Calculus
*Elementary Transcendental Functions
*Improper Riemann Integrals.....
*Lebesgue's Criterion for Riemann IntegrabilityInfinite Series of Real Numbers
8.1 Basic Concepts and Examples
8.
8.
8.Nonnegative Series.. .... ......
Series with Positive and N~gative Terms
The Cauchy Product of Series...... 164
177. 177
. 187
. 203
. 209
225. 226
. 237
. 245
. 256
. 267
. 276
. 290
297. 297
. 305
. 316
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357. 357
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. 397
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453. 453
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