Fundamental+Theorem+of+Calculus+Part+2

Part II of the ** __Fundamental Theorem of Calculus__ ** tells us that **f** has an indefinite integral.

 * We use the Fundamental Theorem to represent a particular antiderivative. As well as to find the analytical and graphical analysis of functions so defined.
 * ====With Part II of the Fundamental Theorem, we do NOT assume that f is continuous.====
 * ==== When an antiderivative exists, there are several antiderivatives for // f //, by adding an arbitrary constant. ====

(where F is the anti-derivative of f)
 * We know from part one: ** If f is continuous on the closed interval [a,b] and F is the antiderivative of f on [a,b] then....


 * Part 2: **

Practice Problems:

 * 1. **

=2. ? ? ? ? =

=3. ? ? ? ? =

This video is also helpful if you still need help understanding. ---> []

__**Sources:**__ [] [|http://www.wolframalpha.com] []