Continuity and Differentiability EXPLAINED with Examples
0:00 / 0:00
John
English
College Students
Concise
Make your video stand out in seconds. Adjust voice, language, style, and audience exactly how you want!
Summary
Continuity and differentiability are explained through definitions and examples. A function is continuous at a point if it is defined, has a limit that exists, and matches the function value. Differentiability requires the existence of a derivative at a point. Functions must be smooth and without breaks to be continuous or differentiable.