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Calculus I

Here is a set of notes used by Paul Dawkins to teach his Calculus I course at Lamar University. Included are detailed discussions of Limits (Properties, Computing, One-sided, Limits at Infinity, Continuity), Derivatives (Basic Formulas, Product/Quotient/Chain Rules L'Hospitals Rule, Increasing/Decreasing/Concave Up/Concave Down, Related Rates, Optimization) and basic Integrals (Basic Formulas, Indefinite/Definite integrals, Substitutions, Area Under Curve, Area Between Curves, Volumes of Revolution, Work).

En bref

Ajouté le

18 mars 2026

Matière et domaine

math · calculus

Niveaux scolaires

10e année (2de)–12e année (Terminale)

Type de page

Article

Mots-clés

Calculus Tutorial online calculus tutorial calculus notes online calculus notes Calculus I notes Limit Notes Limit Help Derivatives Notes Derivatives Help Integrals Notes Integrals Help

Introduction

Calculus I Course Notes Overview

These notes are provided by Lamar University as a self-contained resource for students learning Calculus I or seeking a refresher on foundational topics.

Important Student Warnings

  • Not a substitute for class: These notes do not cover every insight or topic discussed in lectures.
  • Content variance: The notes include extra material not always covered in class and may omit specific examples or paths explored during live instruction.
  • Collaboration: Students are advised to compare these notes with classmates to capture missed information or unique classroom discussions.

Course Content Sections

  • Review (Algebra & Trig):
    • Inverse functions, trigonometric functions, and the unit circle.
    • Solving trigonometric, exponential, and logarithmic equations.
    • Review of common function graphs.
  • Limits:
    • Conceptual introduction, one-sided limits, and limit properties.
    • Computing limits (piecewise functions, Squeeze Theorem).
    • Infinite limits and limits at infinity (vertical/horizontal asymptotes).
    • Continuity and the Intermediate Value Theorem.
    • Precise definition of a limit.
  • Derivatives:
    • Interpretations: Rate of change, velocity, and slope of tangent lines.
    • Differentiation formulas: Product rule, quotient rule, and chain rule.
    • Derivatives of specific functions: Polynomials, roots, trigonometric, inverse trigonometric, hyperbolic, exponential, and logarithmic functions.
    • Advanced techniques: Implicit differentiation, related rates, higher-order derivatives, and logarithmic differentiation.
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