Answered You can hire a professional tutor to get the answer.

QUESTION

Assume that f : R - R is continuous, and for all x not = 0, f'(x) exists. If lim as x approaches 0 of f'(x) = L exists, does it follow that f'(0)

Assume that f : R -> R is continuous, and for all x not = 0, f'(x) exists. If lim as x approaches 0 of f'(x) = L exists, does it follow that f'(0) exists? Prove or disprove

Take the curve4x3 + 27y 2 = 0And define f (x) = y . Given by above equation.If we are plotting the given curve, we have a cusp point at the origin.And we know that at cusp point derivative...
Show more
LEARN MORE EFFECTIVELY AND GET BETTER GRADES!
Ask a Question