Continuity and Differentiability
The Continuity of a function can be defined as the characteristic of a function by which, the graphical form of that function is a continuous wave. A differentiable function is a function whose derivative exists at each point in its domain area. A continuous function may be differentiable but a differentiable function may not be continuous. Check the videos below to know more about it:
MathonGo
Vedantu
| Introduction | Limit Problems | Exponential and Logarithmic Limits |
| Limits and Continuity | Continuity & Differentiability | Continuity Problems |
| Derivability Problems | Differentiability Problems | Advanced Differentiability Problems |
Unacademy
| L-1 | L-2 | L-3 | L-4 |
| L-5 | L-6 | L-7 | L-8 |
| L-9 | L-10 | L-11 | L-12 |