1---
2geometry: margin=2cm
3<!-- columns: 2 -->
4graphics: yes
5tables: yes
6author: Andrew Lorimer
7classoption: twocolumn
8header-includes: \pagenumbering{gobble}
9---
10
11# Exponential and Index Functions
12
13## Index laws
14
15$a^m \times a^n = a^{m+n}$
16$a^m \div a^n = a^{m-n}4$
17$(a^m)^n = a^{_mn}$
18$(ab)^m = a^m b^m$
19${({a \over b})}^m = {a^m \over b^m}$
20
21## Fractional indices
22
23$^n\sqrt{x}=x^{1/n}$
24
25## Logarithms
26
27$$\log_b (x) = n \quad \operatorname{where} \hspace{0.5em} b^n=x$$
28
29## Using logs to solve index eq's
30
31Used for equations without common base exponent
32
33Or change base:
34$$\log_b c = {{\log_a c} \over {\log_a b}}$$
35
36If $a<1, \quad \log_{b} a < 0$ (flip inequality operator)
37
38## Exponential functions
39
40$e^x$ - natural exponential function
41
42
43$$\lim_{h \rightarrow 0} {{e^h-1} \over h}=1$$