Complements (Elementary)
Complements (elementary) is a term used in mathematics to describe two sets of numbers that, when added together, equal zero. In other words, the sum of the two sets of numbers is equal to zero. This concept is often used in financial analysis, as it can help to identify relationships between different financial instruments. For example, if two stocks have a negative correlation, then the sum of their returns will be zero.
History of Complements (Elementary)
The concept of complements (elementary) was first introduced by the French mathematician Augustin-Louis Cauchy in the early 19th century. Cauchy was interested in the properties of numbers and their relationships to each other. He developed the concept of complements (elementary) to describe the relationship between two sets of numbers that, when added together, equal zero. Since then, the concept has been used in various fields, including finance, economics, and statistics.
Comparison Table
Set 1 | Set 2 | Sum |
---|---|---|
2 | -2 | 0 |
4 | -4 | 0 |
6 | -6 | 0 |
Summary
Complements (elementary) is a mathematical concept used to describe two sets of numbers that, when added together, equal zero. This concept is often used in financial analysis to identify relationships between different financial instruments. For more information about this term, you can visit websites such as Investopedia and The Balance.
See Also
- Correlation
- Covariance
- Linear Regression
- Risk Management
- Portfolio Theory
- Time Series Analysis
- Financial Modeling
- Financial Ratios
- Financial Statement Analysis
- Capital Asset Pricing Model (CAPM)