• Study Resource
  • Explore
    • Arts & Humanities
    • Business
    • Engineering & Technology
    • Foreign Language
    • History
    • Math
    • Science
    • Social Science

    Top subcategories

    • Advanced Math
    • Algebra
    • Basic Math
    • Calculus
    • Geometry
    • Linear Algebra
    • Pre-Algebra
    • Pre-Calculus
    • Statistics And Probability
    • Trigonometry
    • other →

    Top subcategories

    • Astronomy
    • Astrophysics
    • Biology
    • Chemistry
    • Earth Science
    • Environmental Science
    • Health Science
    • Physics
    • other →

    Top subcategories

    • Anthropology
    • Law
    • Political Science
    • Psychology
    • Sociology
    • other →

    Top subcategories

    • Accounting
    • Economics
    • Finance
    • Management
    • other →

    Top subcategories

    • Aerospace Engineering
    • Bioengineering
    • Chemical Engineering
    • Civil Engineering
    • Computer Science
    • Electrical Engineering
    • Industrial Engineering
    • Mechanical Engineering
    • Web Design
    • other →

    Top subcategories

    • Architecture
    • Communications
    • English
    • Gender Studies
    • Music
    • Performing Arts
    • Philosophy
    • Religious Studies
    • Writing
    • other →

    Top subcategories

    • Ancient History
    • European History
    • US History
    • World History
    • other →

    Top subcategories

    • Croatian
    • Czech
    • Finnish
    • Greek
    • Hindi
    • Japanese
    • Korean
    • Persian
    • Swedish
    • Turkish
    • other →
 
Profile Documents Logout
Upload
(1) 2 `M«) = 0(x/log log x). - American Mathematical Society
(1) 2 `M«) = 0(x/log log x). - American Mathematical Society

An Introduction to Proofs and the Mathematical Vernacular 1
An Introduction to Proofs and the Mathematical Vernacular 1

Curriculum Map: Pre-Algebra B 2015 PA Core
Curriculum Map: Pre-Algebra B 2015 PA Core

Properties of Logarithms
Properties of Logarithms

Algebra II Curriculum
Algebra II Curriculum

Chapter 12 - Arms-A
Chapter 12 - Arms-A

Math Review for Algebra and Precalculus
Math Review for Algebra and Precalculus

EXERCISES
EXERCISES

ON SIMILARITIES BETWEEN EXPONENTIAL POLYNOMIALS AND
ON SIMILARITIES BETWEEN EXPONENTIAL POLYNOMIALS AND

A Mathematical Analysis of Akan Adinkra Symmetry
A Mathematical Analysis of Akan Adinkra Symmetry

Math 13 — An Introduction to Abstract Mathematics
Math 13 — An Introduction to Abstract Mathematics

To add fractions, the denominators must be equal
To add fractions, the denominators must be equal



How to Help Your Child Excel in Math
How to Help Your Child Excel in Math

PROGRAMMING IN MATHEMATICA, A PROBLEM
PROGRAMMING IN MATHEMATICA, A PROBLEM

LOGARITHMS
LOGARITHMS

Ch 5 Inverse, Exponential and Logarithmic Functions
Ch 5 Inverse, Exponential and Logarithmic Functions

... 5.6 Further Applications and Modeling with Exponential and Logarithmic Functions ...
Sieving and the Erdos-Kac theorem
Sieving and the Erdos-Kac theorem

Properties of Logarithms
Properties of Logarithms

Chapter 5A - Polynomial Functions
Chapter 5A - Polynomial Functions

An Introduction to Proofs and the Mathematical Vernacular 1
An Introduction to Proofs and the Mathematical Vernacular 1

AN A-Z OF TRIGONOMETRY The unit circle is the curve in the plane
AN A-Z OF TRIGONOMETRY The unit circle is the curve in the plane

1 log log log MN M N = + log 9 2 log 9 log 2 ∙ = + log 100000 log
1 log log log MN M N = + log 9 2 log 9 log 2 ∙ = + log 100000 log

i+1
i+1

Discrete Mathematics
Discrete Mathematics

< 1 ... 4 5 6 7 8 9 10 11 12 ... 152 >

Big O notation



In mathematics, big O notation describes the limiting behavior of a function when the argument tends towards a particular value or infinity, usually in terms of simpler functions. It is a member of a larger family of notations that is called Landau notation, Bachmann–Landau notation (after Edmund Landau and Paul Bachmann), or asymptotic notation. In computer science, big O notation is used to classify algorithms by how they respond (e.g., in their processing time or working space requirements) to changes in input size. In analytic number theory, it is used to estimate the ""error committed"" while replacing the asymptotic size, or asymptotic mean size, of an arithmetical function, by the value, or mean value, it takes at a large finite argument. A famous example is the problem of estimating the remainder term in the prime number theorem.Big O notation characterizes functions according to their growth rates: different functions with the same growth rate may be represented using the same O notation. The letter O is used because the growth rate of a function is also referred to as order of the function. A description of a function in terms of big O notation usually only provides an upper bound on the growth rate of the function. Associated with big O notation are several related notations, using the symbols o, Ω, ω, and Θ, to describe other kinds of bounds on asymptotic growth rates.Big O notation is also used in many other fields to provide similar estimates.
  • studyres.com © 2025
  • DMCA
  • Privacy
  • Terms
  • Report