This calculus video tutorial explains how to find the local maximum and minimum values of a function. In order to determine the relative extrema, you need to find the first derivative, set it equal to zero, and solve for x which represents the critical numbers of the function. You need to put these numbers on a number line and create a sign chart. According to the first derivative test, if the sign changes from - to +, it's a relative maximum. If it changes from + to -, it's a relative minimum. This video contains plenty of examples and practice problems for you to work on.
Derivative Applications - Formula Sheet: [ Ссылка ]
____________________________
Introduction to Limits:
[ Ссылка ]
Derivatives - Fast Review:
[ Ссылка ]
Introduction to Related Rates:
[ Ссылка ]
_____________________________
Extreme Value Theorem:
[ Ссылка ]
Finding Critical Numbers:
[ Ссылка ]
Local Maximum & Minimum:
[ Ссылка ]
Absolute Extrema:
[ Ссылка ]
Rolle's Theorem:
[ Ссылка ]
________________________________
Mean Value Theorem:
[ Ссылка ]
Increasing and Decreasing Functions:
[ Ссылка ]
First Derivative Test:
[ Ссылка ]
Concavity & Inflection Points:
[ Ссылка ]
Second Derivative Test:
[ Ссылка ]
_________________________________
L'Hopital's Rule:
[ Ссылка ]
Curve Sketching With Derivatives:
[ Ссылка ]
Newton's Method:
[ Ссылка ]
Optimization Problems:
[ Ссылка ]
_______________________________________
Final Exams and Video Playlists:
[ Ссылка ]
Full-Length Videos and Worksheets:
[ Ссылка ]
Ещё видео!