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Understanding the mean value theorem

Differential Calculus: Master Limits and Derivatives

Limits

Intermediate value theorem

Proving the Existence of Real Roots Using IVT

Intermediate Value Theorem

Application of Intermediate Value Theorem

Proving the Existence of a Real Root Using IVT

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Finding limits from graphs  

Continuity

Discontinuities of Rational Functions (denominator=0)

Finding limits algebraically - direct substitution 

Finding limits algebraically - when direct substitution is not possible

Infinite limits - vertical asymptotes  

Limits at infinity - horizontal asymptotes

Limit Evaluation

Limits at Infinity of Exponential Functions

Squeeze theorem

Quadratic Function with Integer Vertex

Limit laws

Evaluating Limits of Functions

limit laws

Evaluating Limits with specific limits given

Introduction to Calculus - Limits 

Differentiation

Estimating derivatives from a table

Slope and equation of tangent line

Chain rule

Chain Rule

Differentiation of Trigonometric Function

Differentiate Radical Functions with Chain Rule

Differentiate: Trigonometric Functions

Chain rule: Differentiate Trigonometric Functions

Differentiation of Exponential Function

Differentiation of Exponential Functions

Differentiation: Chain Rule with Logarithmic Functions

Differentiation of Logarithmic Function

Product rule

Quotient rule

Differentiation using Quotient Rule

Differentiation using Chain Rule and Quotient Rule

Derivative of inverse trigonometric functions

Definition of derivative  

Definition of Derivative

Definition of derivative

Derivative using Definition

Vertical Tangent Line of a Function

Applications to definition of derivative

Power rule

Power Rule

Application of the Power Rule

Power rule application

Applying Power Rule

Power Rule with Negative Exponents

Power rule with rational exponents

Power rule and rational exponents

Derivative of trigonometric functions  

Derivative of Trigonometric Functions

Derivative of Composite Trig Functions

Derivative of exponential functions

Derivative of Exponential Functions

Differentiation of Composite Functions

Derivative of power and exponential functions

Derivative of logarithmic functions

Derivative of log with arbitrary base

Derivative of Natural Logarithm Functions

Derivative of Logarithmic Functions

Implicit differentiation

Higher order derivatives

Higher Order Derivatives

First and second derivatives

First and Second Derivatives

Second derivatives with implicit differentiation

Implicit Differentiation

Higher Order Derivatives with Repeating Patterns

Applications of differentiation

Mean value theorem 

Mean Value Theorem

Mean value theorem

Mean Value Theorem Application

Critical number & maximum and minimum values

Critical Number & Maximum and Minimum Values

Linear approximation

Use of Linear Approximations in Estimating Square Roots

Linearization of Radical Functions

Linearization of Polynomial Functions

Linearization of Rational Functions

Linearization of Exponential Functions

Linearization of Logarithmic Functions

Linear Approximation of Trigonometric Functions

Optimization

Position velocity acceleration

Velocity of a Particle

Total Distance Traveled by a Particle

Comparative Analysis of Particle's Velocity and Acceleration

Curve sketching

Related rates

l'Hospital's rule

l'Hopital's rule

l'Hospital's Rule

Evaluating the limit using L'Hospital's Rule

l"Hospital"s rule

Parent Assignments

Challenge Zone

Foundation Review

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With our walkthrough calculus videos, you will gain a solid understanding on all calculus topics like Limits, Differentiation, Chain rule, Power rule, Implicit differentiation, Intermediate value theorem, Squeeze theorem, Linear approximation, Limit laws, and more. Learn the concepts with our calculus tutorials that show you step-by-step solutions to even the hardest calculus problems. Then, reinforce your understanding with tons of differential calculus practice.
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Differential Calculus

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math

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Finding the smallest possible value of f(10) using the Mean Value Theorem

Verifying MVT hypotheses for a cubic polynomial on [0,2]

Finding the value of c that satisfies the Mean Value Theorem on [0,2]

The idea of the Mean Value Theorem may be a little too abstract to grasp at first, so let's describe it with a real-life example. Let's say that if a plane travelled non-stop for 15 hours from London to Hawaii had an average speed of 500mph, then we can say with confidence that the plane must have flown exactly at 500mph at least once during the entire flight. In this section, we will learn about the concept and the application of the Mean Value Theorem in detail.

Mean value theorem

What You'll Learn

Verify that a function satisfies the continuity and differentiability requirements for the Mean Value Theorem

Apply the Mean Value Theorem to find points where the tangent slope equals the secant slope

Use the equation f'(c) = [f(b) - f(a)] / (b - a) to solve for values of c in a given interval

Interpret the Mean Value Theorem graphically by identifying parallel tangent and secant lines

Apply the Mean Value Theorem to solve optimization problems involving derivative constraints

What You'll Practice

Verifying continuity and differentiability of polynomial functions on closed and open intervals

Calculating secant line slopes between endpoints and solving for c using derivatives

Finding all numbers in an interval that satisfy the Mean Value Theorem conclusion

Determining minimum or maximum function values using derivative inequalities and the Mean Value Theorem

Why This Matters

This Unit Includes

3 Video lessons

Practice exercises

Learning resources

Skills

Mean Value Theorem

Derivatives

Continuity

Differentiability

Secant Lines

Tangent Lines

Polynomial Functions

Inequalities