13.7 Big-Theta

Not to be confused with Big-O.

Formalizing Order of Growth

Given some function $Q(N)$ , we can apply our last two simplifications to get the order of growth of $Q(N)$ .

Order of Growth Examples

The following functions have these corresponding order of growths:

Instead of saying a function has order of growth ___, we say that the function belongs to \Theta (\text{__}). In other words, it belongs to the family of functions that have that same order of growth.

Formal Definition

Previous13.6 Simplified Analysis Process Next13.8 Big-O

Last updated 1 year ago

Formalizing Order of Growth

Given some function $Q(N)$ , we can apply our last two simplifications to get the order of growth of $Q(N)$ .

For example, if $Q(N)=3N^3+N^2$ , the order of growth is $N^3$ .

From now onward, we will refer to order of growth as $\Theta$ (pronounced "big theta").

Order of Growth Examples

The following functions have these corresponding order of growths:

Function

Order of Growth

Formal Definition

For some function $R(N)$ with order of growth $f(N)$ , we write that:

$R(N) \in \Theta(f(N))$ and there exists some positive constants $k_1$ , $k_2$ such that...

$k_1 \cdot f(N) \leq R(N) \leq k_2\cdot f(N)$ for all values $N$ greater than some $N_0$ (a very large $N$ ).

For example, if $Q(N)=3N^3+N^2$ , the order of growth is $N^3$ .

From now onward, we will refer to order of growth as $\Theta$ (pronounced "big theta").

For some function $R(N)$ with order of growth $f(N)$ , we write that:

$R(N) \in \Theta(f(N))$ and there exists some positive constants $k_1$ , $k_2$ such that...

$k_1 \cdot f(N) \leq R(N) \leq k_2\cdot f(N)$ for all values $N$ greater than some $N_0$ (a very large $N$ ).