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The Velocity Problem | Part I: Numerically

The Velocity Problem | Part II: Graphically

A Tale of Three Functions | Intro to Limits Part I

A Tale of Three Functions | Intro to Limits Part II

What is an infinite limit?

Limit Laws | Breaking Up Complicated Limits Into Simpler Ones

Building up to computing limits of rational functions

Limits of Oscillating Functions and the Squeeze Theorem

Top 4 Algebraic Tricks for Computing Limits

A Limit Example Combining Multiple Algebraic Tricks

Limits are simple for continuous functions

Were you ever exactly 3 feet tall? The Intermediate Value Theorem

Example: When is a Piecewise Function Continuous?

Limits "at" infinity

Computing Limits at Infinity for Rational Functions

Infinite Limit vs Limits at Infinity of a Composite Function

How to watch math videos

Definition of the Derivative | Part I

Applying the Definition of the Derivative to 1/x

Definition of Derivative Example: f(x) = x + 1/(x+1)

The derivative of a constant and of x^2 from the definition

Derivative Rules: Power Rule, Additivity, and Scalar Multiplication

How to Find the Equation of a Tangent Line

The derivative of e^x.

The product and quotient rules

The derivative of Trigonometric Functions

Chain Rule: the Derivative of a Composition

Interpreting the Chain Rule Graphically

The Chain Rule using Leibniz notation

Implicit Differentiation | Differentiation when you only have an equation, not an explicit function

Derivative of Inverse Trig Functions via Implicit Differentiation

The Derivative of ln(x) via Implicit Differentiation

Logarithmic Differentiation | Example: x^sinx

Intro to Related Rates

Linear Approximations | Using Tangent Lines to Approximate Functions

The MEAN Value Theorem is Actually Very Nice

Relative and Absolute Maximums and Minimums | Part I

Relative and Absolute Maximums and Minimums | Part II

Using L'Hopital's Rule to show that exponentials dominate polynomials

Applying L'Hopital's Rule to Exponential Indeterminate Forms

Ex: Optimizing the Volume of a Box With Fixed Surface Area

Folding a wire into the largest rectangle | Optimization example

Optimization Example: Minimizing Surface Area Given a Fixed Volume

Tips for Success in Flipped Classrooms + OMG BABY!!!

What's an anti-derivative?

Solving for the constant in the general anti-derivative

The Definite Integral Part I: Approximating Areas with rectangles

The Definite Integral Part II: Using Summation Notation to Define the Definite Integral

The Definite Integral Part III: Evaluating From The Definition

"Reverse" Riemann Sums | Finding the Definite Integral Given a Sum

Fundamental Theorem of Calculus 1 | Geometric Idea + Chain Rule Example

Fundamental Theorem of Calculus II

Intro to Substitution - Undoing the Chain Rule

Adjusting the Constant in Integration by Substitution

Substitution Method for Definite Integrals **careful!**

Back Substitution - When a u-sub doesn't match cleanly!

Average Value of a Continuous Function on an Interval

Exam Walkthrough | Calc 1, Test 3 | Integration, FTC I/II, Optimization, u-subs, Graphing

♥♥♥ Thank you Calc Students♥♥♥ Some final thoughts.

Description:

Embark on a comprehensive journey through Single Variable Calculus in this 7-hour playlist covering limits, derivatives, and the fundamentals of integrals. Begin with the velocity problem, exploring it numerically and graphically, before delving into the concept of limits. Master limit laws, algebraic tricks, and continuous functions. Explore the Intermediate Value Theorem and piecewise functions. Progress to derivatives, learning their definition, rules, and applications, including the power rule, product and quotient rules, and chain rule. Tackle implicit differentiation, logarithmic differentiation, and related rates. Discover linear approximations, the Mean Value Theorem, and optimization problems. Grasp L'Hopital's Rule and its applications. Transition to anti-derivatives and definite integrals, understanding Riemann sums and the Fundamental Theorem of Calculus. Practice integration techniques, including substitution methods and back substitution. Conclude with the average value of continuous functions and a comprehensive exam walkthrough, solidifying your understanding of this essential mathematical foundation. Read more

Calculus I - Limits, Derivative, Integrals

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