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1. Derivatives: We denote the derivative of a function f {\displaystyle f} at a number a {\displaystyle a} as f ′ ( a ) {\displaystyle f'(a)\,\!} . The derivative of a function f {\displaystyle f} at a number a {\displaystyle a} a is given by ... [100%] 2024-01-01 [Calculus] [Differentiation]...
2. Derivatives (finance): Derivatives are financial instruments that derive their value from underlying assets. Derivatives can be traded (bought and sold) in a manner similar to stock. (Finance) [100%] 2023-02-23 [Finance] [Calculus]...
3. Derivative (chemistry): In chemistry, a derivative is a compound that is derived from a similar compound by a chemical reaction. In the past, derivative also meant a compound that can be imagined to arise from another compound, if one atom or group ... (Chemistry) [90%] 2024-01-01 [Chemical compounds]
4. Derivative (film): Derivative (Turkish: Türev) is a 2005 Turkish drama film, written, produced and directed by Ulaş İnaç based on a short story by Miguel de Cervantes, about the complicated relationships between three people who confess their thoughts each evening to the camera for ... (Film) [90%] 2023-12-18 [2005 drama films] [2005 films]...
5. Derivative: One of the basic concepts in mathematical analysis. Suppose that a real-valued function $f$ of a real variable $x$ is defined in a neighborhood of a point $x_0$ and that there exists a finite or infinite limit \begin{equation ... (Mathematics) [90%] 2023-12-14
6. Derivative: Derivative has more than one meaning. As such, this article is merely a disambiguation page, listing articles associated with Derivative. [90%] 2023-07-05
7. Derivative (calculus): A derivative, one of the fundamental concepts of calculus, measures how quickly a function changes as its input value changes. Given a graph of a real curve, the derivative at a specific point will equal the slope of the line ... (Calculus) [90%] 2023-02-16 [Calculus] [Differentiation]...
8. Derivative: {{Sidebar with collapsible lists | name = Finance sidebar | title = Finance | image = | listtitlestyle = background:#ddf;text-align:center; | listclass = plainlist | expanded = instruments | list1name = markets | list1title = Markets | list1 = | list2name = instruments | list2title = Instruments | list2style = padding-left:2.0em;padding-right:2.0em;. (Finance) [90%] 2023-12-31 [Derivatives (finance)] [Securities (finance)]...
9. Derivative: In mathematics, the derivative shows the sensitivity of change of a function's output with respect to the input. Derivatives are a fundamental tool of calculus. (Instantaneous rate of change (mathematics)) [90%] 2023-12-18 [Mathematical analysis] [Differential calculus]...
10. Derivative: In chemistry, a derivative is a compound that is derived from a similar compound by a chemical reaction. In the past, derivative also meant a compound that can be imagined to arise from another compound, if one atom or group ... (Chemistry) [90%] 2023-12-18 [Chemical compounds]
11. Derivatives market: The derivatives market is the financial market for derivatives, financial instruments like futures contracts or options, which are derived from other forms of assets. The market can be divided into two, that for exchange-traded derivatives and that for over ... (Finance) [70%] 2023-12-18 [Derivatives (finance)] [Financial markets]...
12. Stability derivatives: Stability derivatives, and also control derivatives, are measures of how particular forces and moments on an aircraft change as other parameters related to stability change (parameters such as airspeed, altitude, angle of attack, etc.). For a defined "trim" flight condition ... (Physics) [70%] 2023-12-18 [Aerodynamics]
13. Wirtinger derivatives: In complex analysis of one and several complex variables, Wirtinger derivatives (sometimes also called Wirtinger operators), named after Wilhelm Wirtinger who introduced them in 1927 in the course of his studies on the theory of functions of several complex variables ... (Concept in complex analysis) [70%] 2023-07-24 [Complex analysis] [Differential operators]...
14. Derivatives law: Derivatives law is the area of law governing derivatives. It is associated with principles of contract law, and practitioners must also have a good understanding of insolvency, netting and set-off, and conflict of laws. (Finance) [70%] 2023-09-07 [Contract law] [Financial regulation]...
15. Partial derivative: In mathematics, a partial derivative of a function of several variables is its derivative with respect to one of those variables while all others are kept constant. Partial derivatives are widely used in differential geometry, vector calculus, and physics. [63%] 2023-06-15
16. Derivative algebra (abstract algebra): In abstract algebra, a derivative algebra is an algebraic structure of the signature where is a Boolean algebra and is a unary operator, the derivative operator, satisfying the identities: x is called the derivative of x. Derivative algebras provide an ... (Abstract algebra) [63%] 2023-06-13 [Algebras] [Boolean algebra]...
17. Parametric derivative: In calculus, a parametric derivative is a derivative of a dependent variable with respect to another dependent variable that is taken when both variables depend on an independent third variable, usually thought of as "time" (that is, when the dependent ... [63%] 2022-08-05 [Differential calculus]
18. Parametric derivative: In calculus, a parametric derivative is a derivative of a dependent variable with respect to another dependent variable that is taken when both variables depend on an independent third variable, usually thought of as "time" (that is, when the dependent ... [63%] 2023-08-07 [Differential calculus]
19. Partial derivative: of the first order of a function in several variables The derivative of the function with respect to one of the variables, keeping the remaining variables fixed. For example, if a function $ f ( x _ {1}, \dots, x _ {n ... (Mathematics) [63%] 2023-10-17
20. Lie derivative: In differential geometry, the Lie derivative (/liː/ LEE), named after Sophus Lie by Władysław Ślebodziński, evaluates the change of a tensor field (including scalar functions, vector fields and one-forms), along the flow defined by another vector field. This change is ... (A derivative in Differential Geometry) [63%] 2023-12-09 [Differential geometry] [Differential topology]...