It follows from the fact that a function with zero derivative is constant. So, if F'(x)=G'(x), then (F(x)-G(x))'=F'(x)-G'(x)=0, so there is a constant C such that F(x)-G(x)=C.

At this line F(x) - F(x_0) = \int f(x)dx let -F(x_0)=C and you're done.

I suspect the following: \sum_{k=1}^n {1\over n+k}=\sum_{k=1}^n{1\over n} {1\over 1+{k\over n}} Now interpret the right hand sum as a Riemann sum for the function f(x)={1\over 1+x} over [a,b]=[0,1] ...

Basically yes. We need some continuity conditions on f as well. And then, your first two lines mean F_1'=f=F_2', and hence (F_1-F_2)'=0. Now the main theorem is that g'=0 \Rightarrow g= ...

The derivative of a function y(x) is defined to be \lim_{h \to 0}\frac{y(x+h) - y(x)}h y' and \frac {dy}{dx} are just two notations used for this limit. Neither is defined from the other. I ...

HINT Consider that f(x)=x \implies \int x dx = \frac12 x^2 +c and also note that f(x)=f(-x)\implies f'(x)=-1\cdot f'(-x)