Approximation
Approximation
Approximation is a process of finding values that are close enough to the correct answer, usually within a specified tolerance. It is a fundamental concept in various fields such as mathematics, physics, engineering, and computer science. Approximations are used when exact values are either unknown or difficult to obtain.
Types of Approximation[edit | edit source]
There are several types of approximations, including:
- **Numerical Approximation**: This involves methods like numerical integration and numerical differentiation to approximate the values of functions.
- **Analytical Approximation**: Techniques such as Taylor series and Fourier series are used to approximate functions analytically.
- **Statistical Approximation**: Involves using statistical methods to estimate parameters and make predictions, such as in regression analysis.
Applications[edit | edit source]
Approximation is widely used in various applications:
- **Engineering**: Engineers use approximation methods to solve complex problems in structural analysis, fluid dynamics, and thermodynamics.
- **Physics**: Physicists use approximations to model physical systems and predict their behavior, such as in quantum mechanics and relativity.
- **Computer Science**: Approximation algorithms are used in optimization problems, machine learning, and data compression.
Methods[edit | edit source]
Some common methods of approximation include:
- **Interpolation**: Estimating values between known data points using methods like linear interpolation and polynomial interpolation.
- **Extrapolation**: Estimating values outside the range of known data points.
- **Least Squares Method**: A statistical method used to minimize the differences between observed and predicted values.
Error Analysis[edit | edit source]
Error analysis is crucial in approximation to determine the accuracy and reliability of the approximated values. Common types of errors include:
- **Absolute Error**: The difference between the exact value and the approximated value.
- **Relative Error**: The absolute error divided by the exact value, often expressed as a percentage.
- **Truncation Error**: The error made by truncating an infinite sum and approximating it with a finite sum.
Related Concepts[edit | edit source]
See Also[edit | edit source]
Categories[edit | edit source]
Search WikiMD
Ad.Tired of being Overweight? Try W8MD's physician weight loss program.
Semaglutide (Ozempic / Wegovy and Tirzepatide (Mounjaro / Zepbound) available.
Advertise on WikiMD
WikiMD's Wellness Encyclopedia |
Let Food Be Thy Medicine Medicine Thy Food - Hippocrates |
Translate this page: - East Asian
中文,
日本,
한국어,
South Asian
हिन्दी,
தமிழ்,
తెలుగు,
Urdu,
ಕನ್ನಡ,
Southeast Asian
Indonesian,
Vietnamese,
Thai,
မြန်မာဘာသာ,
বাংলা
European
español,
Deutsch,
français,
Greek,
português do Brasil,
polski,
română,
русский,
Nederlands,
norsk,
svenska,
suomi,
Italian
Middle Eastern & African
عربى,
Turkish,
Persian,
Hebrew,
Afrikaans,
isiZulu,
Kiswahili,
Other
Bulgarian,
Hungarian,
Czech,
Swedish,
മലയാളം,
मराठी,
ਪੰਜਾਬੀ,
ગુજરાતી,
Portuguese,
Ukrainian
Medical Disclaimer: WikiMD is not a substitute for professional medical advice. The information on WikiMD is provided as an information resource only, may be incorrect, outdated or misleading, and is not to be used or relied on for any diagnostic or treatment purposes. Please consult your health care provider before making any healthcare decisions or for guidance about a specific medical condition. WikiMD expressly disclaims responsibility, and shall have no liability, for any damages, loss, injury, or liability whatsoever suffered as a result of your reliance on the information contained in this site. By visiting this site you agree to the foregoing terms and conditions, which may from time to time be changed or supplemented by WikiMD. If you do not agree to the foregoing terms and conditions, you should not enter or use this site. See full disclaimer.
Credits:Most images are courtesy of Wikimedia commons, and templates Wikipedia, licensed under CC BY SA or similar.
Contributors: Prab R. Tumpati, MD