Suppose that some value, c, is a point of a local minimum point.
The theorem states that if a function f is differentiable at a point c of local extremum, then f'(c) = 0.
This implies that the function f is continuous over the given interval. So there must be some value h such that f(c + h) - f(c) >= 0, where h is some infinitesimally small quantity.
As h approaches 0 from the negative side, then: [tex]\frac{f(c + h) - f(c)}{h} \leq 0 \text{, where h is approaching 0 from the negative side}[/tex]
As h approaches 0 from the positive side, then: [tex]\frac{f(c + h) - f(c)}{h} \geq 0[/tex]
Thus, f'(c) = 0
