In mathematics, the maximum and minimum (plural: maxima and minima) of a function, known collectively as extrema (singular: extremum), are the largest and smallest value that the function takes at a point either within a given neighborhood (local or relative extremum) or on the function domain in its entirety (global or absolute extremum). Pierre de Fermat was one of the first mathematicians to propose a general technique (called adequality) for finding maxima and minima. More generally, the maximum and minimum of a set (as defined in set theory) are the greatest and least element in the set. Unbounded infinite sets such as the set of real numbers have no minimum and maximum. To locate extreme values is the basic objective of optimization.
Related Posts
Recent Posts
- An Overview of Exploring SIDBI Schemes for MSME Success
- NSE SME to Main Board – Harnessing the Benefits of SME IPOs
- Impact of Entity DigiLocker Services for MSMEs & Many More
- MSME Competitive LEAN Scheme Empowers Small Manufacturers
- Will Fintech Lending Dominate Traditional Business?
Categories
- MSME Ecommerce
- MSME finance
- MSME Finance Guide
- MSME finance/ Block chain based funding
- MSME finance/ Invoice financing for MSME/ Short-term loans
- MSME Financing Gap
- MSME financing guide/ Nasdaq
- MSME Supply Chain Finance
- Opinion
- Policies & Updates
- Regulations & Compliance
- Schemes & Programs
- Startup Business
- UOB,OCBC and SME Business loans