Simple Question about Continuity

Rozy · Apr 6, 2006

I'm just working through some differentiability questions and have a quick question - are functions continuous at a cusp or corner? I know that functions are not differentiable at cusps or corners because you cannot draw a unique tangent at these points, but I'm not sure about continuity. From my understanding, a function is continuous if at point a if

1. The limit as x approaches a exists
2. f(a) exists or is defined
3. the limit of x approaching a = f(a)

Can you define the function at a cusp or corner and thus have a continuous function?

Thanks!
Rozy

0rthodontist · Apr 6, 2006

Yes, you can.

arildno · Apr 6, 2006

On a side-note, you can construct functions that are everywhere continuous, but nowhere differentiable..

Rozy · Apr 6, 2006

Thanks

Thanks for responding!

HallsofIvy · Apr 6, 2006

For example f(x)= |x| has a "cusp" or corner at x= 0. Of course, f(0)= |0|= 0 so the function is certainly define there- and continuous for all x.

Simple Question about Continuity

1. What is continuity?

2. How do you determine if a function is continuous?

3. What is the difference between continuity and differentiability?

4. Can a function be continuous at a point but not on an interval?

5. How is continuity used in real-world applications?

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