\displaystyle\text{slope}=-{9} Explanation: In this context, you have, with the essential limit idea added: \displaystyle\text{slope}=\frac{{{f{{\left({x}+{h}\right)}}}-{f{{\left({x}\right)}}}}}{{{h}}}{\mid}_{{{\left({h}\to{0}\right)}}} ...

Hint: note that the value f(x) lets us determine all the values f(x+k \cdot h) for k \in \mathbb{Z} and doesn't affect any other value. Consider the equivalence relation {\sim} \subseteq \mathbb{R} \times \mathbb{R} ...

Note that if a<b then a < {1 \over 2} (a+b) < b. We are given that f is strictly increasing. If f(x) > x then f(x) > {1 \over 2} (f(x)+x) > x and applying f to all of these gives f(f(x)) > f({1 \over 2} (f(x)+x)) > f(x) ...

For your case: \frac{f(x+h)-f(x)}{h}=\frac{2(x+h)^2-2x^2}{h}\\ =2\frac{(x+h)^2-x^2}{h}\\ =2\frac{x^2+h^2+2hx-x^2}{h}\\ =2\frac{h^2+2hx}{h}\\ =2\frac{h(h+2x)}{h}\\ =2(h+2x) Now just substitute ...

Yes. What you call the "most natural" value is the value that ensures continuity (when possible). A function is continuous at a point when it has no "jump" there; this is formalized by the \epsilon/\delta ...

Consider f(x) = \sqrt[3]{x^5} . Then f'(x) = \lim\limits_{h\to 0}\frac{f(x+h)-f(x)}{h} = \lim\limits_{h\to 0}\frac{\sqrt[3]{(x+h)^5}-\sqrt[3]{x^5}}{h} Therefore, by substituting x = -8, we ...