Big O Magnitude Notation: Difference between revisions
From Rest of What I Know
No edit summary |
No edit summary |
||
Line 3: | Line 3: | ||
== Formal Definition for Functions == | == Formal Definition for Functions == | ||
A function <math>f(n) = O(10^k)</math> for some fixed <math>k \in \mathbb{Z+}</math> if <math>\exists n_0 \in \mathbb{R+}</math> such that <math>\forall n \geq n_0 : 10^k \leq f(n) < 10^{k+1}</math> | A function <math>f(n)=O(10^k)</math> for some fixed <math>k \in \mathbb{Z+}</math> if <math>\exists n_0 \in \mathbb{R+}</math> such that <math>\forall n \geq n_0 : 10^k \leq f(n) < 10^{k+1}</math> | ||
== Formal Definition for Random Variables == | == Formal Definition for Random Variables == |
Latest revision as of 00:24, 29 August 2024
Like Big O Unit Notation, Big O Magnitude Notation refers to a notation used to express orders of magnitude.
Formal Definition for Functions[edit]
A function for some fixed if such that
Formal Definition for Random Variables[edit]
A random variable if .