Instantaneous Rate of Change

This calculus video tutorial provides a basic introduction into the instantaneous rate of change of functions as well as the average rate of change. The average rate of change is equal to the slope of the secant line and the instantaneous rate of change is equal to the slope of the tangent line. You can find the instantaneous rate of change by evaluating the first derivative function at a point. Derivative Applications - Formula Sheet: https://www.video-tutor.net/calculus-... Final Exam and Test Prep Videos: https://bit.ly/41WNmI9 __________________________________ Derivatives - Fast Review:    • Calculus 1 - Derivatives   Equation of the Tangent Line:    • How To Find The Equation of The Tangent Li...   Derivatives - Horizontal Tangent Line:    • How to Find The Point Where The Graph has ...   The Equation of The Normal Line:    • How To Find The Equation of the Normal Line   The Equation of The Secant Line:    • How To Find The Equation of a Secant Line   _________________________________ Average and Instantaneous Velocity:    • Average Velocity and Instantaneous Velocity   Instantaneous Rate of Change:    • Instantaneous Rate of Change   Derivatives of Rational Functions:    • Derivatives of Rational Functions   Derivatives of Radical Functions:    • Derivatives of Radical Functions   Derivatives of Fractions:    • How To Find The Derivative of a Fraction -...   ________________________________ Derivatives - Higher Order:    • Higher Order Derivatives   Simplifying Derivatives:    • Simplifying Derivatives   Derivatives - The Product Rule:    • Product Rule For Derivatives   Derivatives - The Quotient Rule:    • Quotient Rule For Derivatives   Derivatives - The Chain Rule:    • Chain Rule For Finding Derivatives   _______________________________________ Final Exams and Video Playlists: https://www.video-tutor.net/ Full-Length Videos and Worksheets:   / collections