Become A Calculus 1 Master
Published 9/2025
MP4 | Video: h264, 1920x1080 | Audio: AAC, 44.1 KHz
Language: English | Size: 10.17 GB | Duration: 38h 15m
Published 9/2025
MP4 | Video: h264, 1920x1080 | Audio: AAC, 44.1 KHz
Language: English | Size: 10.17 GB | Duration: 38h 15m
Calculus Demystified: Visual, Intuitive, and Application-Driven Learning
What you'll learn
How to represent, evaluate, and analyze functions graphically and algebraically
echniques for identifying domain, range, symmetry, and monotonicity of functions
Composition and decomposition of functions, including transformations and piece-wise definitions
Core trigonometric concepts including radian measure, unit circle, and trigonometric graphs
Properties and applications of exponential and logarithmic functions
How to compute and interpret limits, including limits at infinity and discontinuities
The formal definition of a limit and its role in defining continuity and derivatives
How to compute derivatives using first principles and differentiation rules (power, product, quotient, chain)
Applications of derivatives in velocity, acceleration, optimization, and curve sketching
Implicit differentiation and derivatives of inverse, logarithmic, and trigonometric functions
Real-world applications of derivatives in science, economics, and engineering
Techniques for solving related rates problems and optimization scenarios
Introduction to antiderivatives and indefinite integrals
How to approximate area under curves using Riemann sums and sigma notation
The Fundamental Theorem of Calculus and its use in computing definite integrals
Integration techniques including u-substitution and symmetry-based strategies
How to apply integrals to model displacement, cost, growth, and net change
Requirements
A solid understanding of Algebra (including solving equations, manipulating expressions, and working with functions)
Familiarity with Trigonometry is helpful but not required—key concepts are reviewed in the course
Commitment to practice regularly and review lessons as needed
Description
Are you ready to conquer calculus with confidence? Whether you're a high school student, college learner, or lifelong math enthusiast, this course is your ultimate guide to mastering Calculus I—from foundational functions to advanced integration techniques.This course is meticulously structured to take you on a journey through the essential concepts of calculus, with over 200+ bite-sized lessons, real-world applications, and step-by-step walkthroughs that make even the most complex topics feel intuitive.What You’ll ExperienceYou’ll begin with the language of functions, learning how to interpret, manipulate, and visualize them in multiple forms. You’ll explore how functions behave—how they grow, shrink, reflect, and transform—and how they form the backbone of all calculus concepts.From there, you’ll dive into trigonometry, exponentials, and logarithms, building the tools needed to understand more complex relationships. You’ll learn how to work with inverse functions, how to graph them, and how they relate to real-world phenomena like sound waves and population growth.Then comes the heart of calculus: limits. You’ll explore both the intuitive and rigorous definitions, learning how to compute limits graphically and algebraically. You’ll understand why limits matter, how they define continuity, and how they lead to the concept of the derivative.With derivatives, you’ll unlock the ability to measure instantaneous change—velocity, acceleration, slope, and more. You’ll master the power rule, product rule, quotient rule, and the chain rule, and apply them to a wide variety of functions, including trigonometric, exponential, and logarithmic ones.But this course doesn’t stop at computation. You’ll explore real-world applications: how derivatives help us solve optimization problems, model physical systems, and understand rates of change in science and economics. You’ll sketch curves, analyze critical points, and use the Mean Value Theorem to make powerful inferences about function behavior.Finally, you’ll enter the world of integration—the reverse process of differentiation. You’ll learn how to compute antiderivatives, use Riemann sums to approximate area, and apply the Fundamental Theorem of Calculus to connect everything you’ve learned. You’ll explore definite integrals, u-substitution, and how integrals are used to calculate displacement, cost, and growth.What Makes This Course Different?Comprehensive Coverage: Every major topic in Calculus I is covered in depth—from functions and trigonometry to derivatives, optimization, and integrals.Visual Learning: Graphs, diagrams, and animations help you see the math and build intuition.Real-World Applications: Learn how calculus is used in science, engineering, and everyday problem-solving.Practice-Driven: Includes guided examples, exercises, and walkthroughs to reinforce every concept.Modular Design: Learn at your own pace, revisit topics anytime, and build your understanding layer by layer.
Overview
Section 1: Functions
Lecture 1 Four Ways to Represent a Function
Lecture 2 Evaluation of Functions (Graphical)
Lecture 3 The Monotonicity of the Function (Graphical)
Lecture 4 A Survey of Computing Domains of Functions
Lecture 5 Difference Quotient of a Quadratic
Lecture 6 Symmetry of Functions
Section 2: Library of Functions
Lecture 7 Power Functions
Lecture 8 Reciprocal Functions and their Graphs
Lecture 9 Radical Functions
Lecture 10 Piece-wise Functions
Section 3: Composition
Lecture 11 Graph Transformations
Lecture 12 Algebra of Functions (Algebraic)
Lecture 13 Function Composition
Lecture 14 Composition of Square Root Functions
Lecture 15 Composition of Rational Functions
Lecture 16 Function Decomposition
Section 4: Trigonometry
Lecture 17 Radian Measure
Lecture 18 Arc Length
Lecture 19 Definitions of the Six Trigonometric Ratios
Lecture 20 Right Triangle Trigonometry
Lecture 21 The Unit Circle Diagram
Lecture 22 The Graph of Sine
Section 5: Exponentials
Lecture 23 Exponential Laws (College Algebra)
Lecture 24 Graphs of Exponential Functions
Lecture 25 Curve Fitting Exponential Functions
Lecture 26 Exponential Growth
Section 6: Logarithms and Inverse Trigonometry
Lecture 27 One-to-One Functions
Lecture 28 Inverse Functions
Lecture 29 The Inverse Function Property
Lecture 30 Computing Inverse Functions Algebraically
Lecture 31 Finding Inverse Functions of Square Root Functions
Lecture 32 Inverses of Linear Fractionals
Lecture 33 An Introduction to Logarithms
Lecture 34 Logarithms ARE the Exponents
Lecture 35 Graphs of Logarithms
Lecture 36 Laws of Logarithms
Lecture 37 The Change of Base Formula (Logarithms)
Lecture 38 Solving Logarithmic Equations
Lecture 39 The Inverse Trigonometric Functions
Lecture 40 Computing Inverse Trigonometric Functions
Lecture 41 Inverse Trigonometric Expressions and Triangle Diagrams
Section 7: Error
Lecture 42 Error and Allowance (A Precursor to Limits)
Lecture 43 An Example of Computing Delta for a Function Given an Epsilon
Lecture 44 The Precise Definition of the Limit
Section 8: Limits
Lecture 45 The Intuitive Definition of a Limit
Lecture 46 Computing Limits from the Graph of a Function
Lecture 47 Why Do We Need a Precise Definition of a Limit?
Section 9: Limit Laws
Lecture 48 Using Limit Laws to Compute Limits
Lecture 49 Computing Limits of a Function using a Simplified Form
Lecture 50 Limits of Piece-wise Functions
Lecture 51 Simplifying a Limit of a Difference Quotient (Polynomial)
Lecture 52 Simplifying a Limit of a Difference Quotient (Radical)
Lecture 53 Simplifying a Limit of a Difference Quotient (Rational)
Section 10: The Squeeze Theorem
Lecture 54 The Squeeze Theorem
Lecture 55 Simplifying a Limit of a Difference Quotient (Exponential)
Lecture 56 Simplifying a Limit of a Difference Quotient (Trigonometric)
Section 11: Discontinuities
Lecture 57 Continuous Functions
Lecture 58 Discontinuities
Lecture 59 Continuity of Piece-wise Functions
Section 12: Continuity Laws
Lecture 60 Finding Values to Make Piece-wise Functions Continuous
Lecture 61 Combining Continuous Functions
Lecture 62 Composition of Continuous Functions
Lecture 63 The Intermediate Value Theorem (Calculus I)
Section 13: Limits at Infinity
Lecture 64 Vertical Asymptotes
Lecture 65 Limits at Infinity
Lecture 66 Arithmetic at Infinity
Lecture 67 Horizontal Asymptotes
Lecture 68 Vertical and Horizontal Asymptotes
Lecture 69 Limits at Infinity and the Squeeze Theorem
Lecture 70 Limits at Infinity Involving Radicals
Lecture 71 Limits at Infinity Involving Exponentials
Lecture 72 The End Behavior of Dampened Harmonic Motion
Lecture 73 Limits at Infinity Involving Arctangent
Section 14: Tangent Lines
Lecture 74 Tangent Lines
Lecture 75 Instantaneous Rate of Change and Velocity
Section 15: Instantaneous Rates of Change
Lecture 76 The Derivative of a Function
Lecture 77 Computing Derivatives from the Definition (Tangent Lines)
Lecture 78 The Reverse-FOIL Method
Lecture 79 Computing Derivatives from the Definition (Rational)
Lecture 80 Computing Derivatives from the Definition (Velocity)
Lecture 81 Derivatives
Lecture 82 Criteria for a Function Being Differentiable
Lecture 83 Graphing the Derivative of a Function from Its (Sometimes Non-Differentiable)
Section 16: Power Rule
Lecture 84 The Power Rule
Lecture 85 The Linearity of the Derivative
Lecture 86 Finding Acceleration of a Motion Function
Lecture 87 The Derivative of e^x
Section 17: Product Rule
Lecture 88 The Product Rule
Lecture 89 The Quotient Rule
Lecture 90 Combining the Quotient and Product Rules
Lecture 91 We Don't Always Need the Quotient Rule
Section 18: Trigonometric Derivatives
Lecture 92 Trigonometric Limits
Lecture 93 The Derivatives of Sine and Cosine
Lecture 94 The Derivatives of Tangent and Other Trigonometric Functions
Lecture 95 Higher Derivatives of Sine
Section 19: Chain Rule
Lecture 96 The Chain Rule
Lecture 97 Trigonometric Derivatives and the Chain Rule
Lecture 98 Exponential Derivatives and the Chain Rule
Lecture 99 Combining the Product Rule and the Chain Rule
Lecture 100 The Chain Rule and the Quotient Rule
Lecture 101 Examples of the Chain Rule
Lecture 102 Using the Chain Rule on the Composition of Three Functions
Lecture 103 Finding the Equation of a Tangent Line using the Chain Rule
Lecture 104 Using the Chain Rule Graphically
Lecture 105 Derivatives of Exponential Functions
Lecture 106 The Chain Rule and a Story Problem
Section 20: Implicit Differentiation
Lecture 107 Implicit Differentiation
Lecture 108 Implicit Differentiation vs. Explicit Differentiation
Lecture 109 Implicit Differentiation (Polynomial Relation)
Lecture 110 Implicit Differentiation (Radical Relation)
Lecture 111 Implicit Differentiation (Trigonometric Relation)
Lecture 112 Implicit Differentiation (Folium of Descartes)
Lecture 113 Second Derivatives with Implicit Differentiation
Lecture 114 Derivatives of Inverse Trigonometric Functions
Section 21: Logarithmic Differentiation
Lecture 115 Derivatives of Logarithms
Lecture 116 Derivatives of Logarithms with Absolute Value
Lecture 117 Logarithmic Differentiation
Lecture 118 The Proof of the Power Rule by Logarithmic Differentiation
Lecture 119 Taking Derivatives of Functions involving Exponents and Bases
Lecture 120 Taking Derivatives of Functions involving Absolute Values
Section 22: Derivatives in Science
Lecture 121 Rates of Change in Science
Lecture 122 Derivatives and Linear Density
Lecture 123 Derivatives and Isothermal Compressibility
Lecture 124 Derivatives and Population Growth
Lecture 125 Derivatives and Economics
Section 23: Related Rates
Lecture 126 Related Rates
Lecture 127 Related Rates and a Falling Ladder
Lecture 128 Related Rates and an Inverted Conical Tank of Water
Lecture 129 Related Rates and Two Approaching Cars
Lecture 130 Strategies for Solving Related Rates Problems
Lecture 131 Related Rates and a Trapezoidal Trough
Lecture 132 Related Rates and Expanding Gases
Lecture 133 Related Rates and Rotating Searchlight
Section 24: Hyperbolic Derivatives
Lecture 134 The Hyperbolic Functions
Lecture 135 Derivatives of the Hyperbolic Functions
Lecture 136 The Inverse Hyperbolic Functions
Lecture 137 Derivatives of the Inverse Hyperbolic Functions
Section 25: Extreme Value Theorem
Lecture 138 Local Extrema
Lecture 139 Critical Numbers
Lecture 140 Absolute Extrema
Lecture 141 The Extreme Value Theorem
Lecture 142 The Extreme Value Problem
Section 26: Mean Value Theorem
Lecture 143 Rolle's Theorem
Lecture 144 The Mean Value Theorem
Lecture 145 Proving that an Equation has Exactly One Solution
Lecture 146 The Assumptions of the Mean Value Theorem
Lecture 147 Inferences of the Mean Value Theorem
Lecture 148 Two Functions with the Same Derivative Differ by a Constant
Section 27: First and Second Derivative Tests
Lecture 149 The First Derivative Test
Lecture 150 Determining Local Extrema using the First Derivative Test
Lecture 151 A Remark about Critical Numbers
Lecture 152 The Test for Concavity
Lecture 153 The Second Derivative Test
Section 28: l'Hospital's Rule
Lecture 154 l'Hospital's Rule
Lecture 155 More Practice on l'Hospital's Rule
Lecture 156 l'Hospital's Rule and Product Indeterminants
Lecture 157 l'Hospital's Rule and Exponential Indeterminants
Lecture 158 l'Hospital's Rule and Difference Indeterminants
Section 29: Curve Sketching
Lecture 159 Curve Sketching (Calculus I)
Lecture 160 Curve Sketching (Polynomial Function)
Lecture 161 Curve Sketching (Rational Function with Oblique Asymptote)
Lecture 162 Curve Sketching (Rational Function with Horizontal Asymptote)
Lecture 163 Curve Sketching (Radical Ratio)
Lecture 164 Curve Sketching (Logarithmic Ratio)
Lecture 165 Curve Sketching (Trigonometric Ratio)
Section 30: Optimization
Lecture 166 Optimization (Calculus I)
Lecture 167 (Optimization) Maximizing the Product of Two Points on a Line
Lecture 168 (Optimization) - Finding the Minimal Distance between a Point and a Parabola
Lecture 169 (Optimization) - Finding a Maximum Rectangle in a Semicircle
Lecture 170 (Optimization) - Finding Minimum Distance of a Path
Lecture 171 (Optimization) - Finding Minimum Distance of a Path Reprise
Lecture 172 (Optimization) - Finding the Maximum Volume of a Box
Section 31: Newton's Method
Lecture 173 Tangent Line Approximation
Lecture 174 Newton's Method
Section 32: Antiderivatives
Lecture 175 What is an Antiderivative?
Lecture 176 The Power Rule for Antiderivatives
Lecture 177 Linearity Property of Antiderivatives
Lecture 178 Basic Antiderivatives
Lecture 179 Initial Value Problem for Antiderivatives
Section 33: Summation Notation
Lecture 180 Sigma Notation
Lecture 181 Properties of Sigma
Lecture 182 Examples of Sigma Notation
Lecture 183 Geometric Sums
Section 34: Area Under the Curve
Lecture 184 Approximating π using Rectangles
Lecture 185 Area under the Curve
Lecture 186 Riemann Sum Calculators
Lecture 187 Upper and Lower Sums
Lecture 188 Velocity, Displacement, and Area under the Curve
Section 35: Definite Integrals
Lecture 189 The Definite Integral
Lecture 190 The Definition of Definite Integrals
Lecture 191 Computing Definite Integrals by the Definition
Lecture 192 Computing Definite Integrals by the Definition involving a Geometric Sum
Lecture 193 Properties of Definite Integrals
Lecture 194 Comparison Test of Definite Integrals
Section 36: The Fundamental Theorem of Calculus
Lecture 195 Integral Functions
Lecture 196 The Fundamental Theorem of Calculus - Part 1
Lecture 197 Computing Derivatives using the Fundamental Theorem of Calculus - Part 1
Lecture 198 Computing Derivatives using the Fundamental Theorem of Calculus, where the limit
Lecture 199 Computing Derivatives using the Fundamental Theorem of Calculus, where the limit
Lecture 200 The Fundamental Theorem of Calculus - Part 2
Lecture 201 Computing Integrals using the Fundamental Theorem of Calculus
Lecture 202 Finding Areas using the Fundamental Theorem of Calculus
Lecture 203 The Limitations of the Fundamental Theorem of Calculus
Lecture 204 Integrals in Science
Lecture 205 Integrals and Displacement
Lecture 206 The Net Change Theorem and Cost
Lecture 207 The Net Change Theorem and Growth
Section 37: u-Substitution
Lecture 208 What is u-Substitution?
Lecture 209 u-Substitution and Indefinite Integrals
Lecture 210 Examples of Finding Antiderivatives Using u-Substitution
Lecture 211 u-Substitution When the Inner Derivative Isn't Quite Right
Lecture 212 The Antiderivative of Tangent
Lecture 213 u-Substitution and Definite Integrals
Lecture 214 Definite Integrals and Symmetry
High school or college students taking Calculus I,STEM professionals needing a refresher,Self-learners passionate about mathematics,Anyone who’s ever said, “I wish someone had explained calculus this way”