Calculus, developed by Newton and Leibniz, is the branch of mathematics that helps us study how quantities change and how they accumulate. It allows us to understand motion, growth, rates and areas under curves.
Calculus has two main parts:
- Differential Calculus: study of derivatives and rates of change
- Integral Calculus: study of accumulation, areas and total values
CALCULUS 1
Build a strong foundation in limits, derivatives and the fundamental concepts of calculus.
Limits and Continuity
- Graphs and Limits
- Definition of a Limit
- One-Sided Limits
- Limit Laws
- Limits of Piecewise Functions
- Squeeze Theorem
- Limits and Continuity
- Limits at Infinity
- Intermediate Value Theorem
Derivatives Basics
- Average Rate of Change
- Limit Definition of Derivative
- Tangent Line Equations
- Differentiability
- Power Rule
- Product
- Quotient Rules
Trigonometric, Exponential, Logarithmic
- Derivatives of Trigonometric Functions
- Chain Rule
- Derivatives of Exponential Functions
- Derivatives of Logarithmic Functions
- Logarithmic Differentiation
- Derivatives of Inverse Trigonometric Functions
Applications of Derivatives
- Maximums and Minimums
- First & Second Derivative Tests
- Extreme Value Examples
- Mean Value Theorem (and Proof)
- Concavity
- Curve Sketching
- Higher Order Derivatives
- Linear Approximation and Differentials
- L'Hôpital's Rule
- Indeterminate forms
- Newton's Method
- Real-Life Application
Introduction to Integration
CALCULUS 2
Explore advanced integration techniques, infinite series and multivariable concepts.
Integration Techniques
- Substitution
- Integration by Parts
- Trigonometric Integrals
- Trigonometric Substitution
- Partial Fractions
- Improper Integrals
Applications of Integration
Sequences and Series
Parametric, Polar, and Differential Equations
Practice for Calculus
Strengthen your understanding of calculus concepts through quizzes and practice problems.
- Limits Quiz
- Continuity of Function Quiz
- Maxima and Minima Quiz
- Integration Quiz
- Practice Questions on Calculus
Programs for Calculus
Apply calculus concepts using programming tools such as Python and MATLAB.