This article relies largely or entirely on a single source. Relevant discussion may be found on the talk page. Please help improve this article by introducing citations to additional sources. Find sources: "Third derivative" – news · newspapers · books · scholar · JSTOR(July 2013)
In calculus, a branch of mathematics, the third derivative or third-order derivative is the rate at which the second derivative, or the rate of change of the rate of change, is changing. The third derivative of a function can be denoted by
Other notations can be used, but the above are the most common.
Now for a more general definition. Let f be any function of x such that f ′′ is differentiable. Then the third derivative of f is given by
The third derivative is the rate at which the second derivative (f′′(x)) is changing.
Applications in geometryedit
In differential geometry, the torsion of a curve — a fundamental property of curves in three dimensions — is computed using third derivatives of coordinate functions (or the position vector) describing the curve.[1]
In physics, particularly kinematics, jerk is defined as the third derivative of the position function of an object. It is, essentially, the rate at which acceleration changes. In mathematical terms:
where j(t) is the jerk function with respect to time, and r(t) is the position function of the object with respect to time.
Economic examplesedit
When campaigning for a second term in office, U.S. President Richard Nixon announced that the rate of increase of inflation was decreasing, which has been noted as "the first time a sitting president used the third derivative to advance his case for reelection."[2] Since inflation is itself a derivative—the rate at which the purchasing power of money decreases—then the rate of increase of inflation is the derivative of inflation, opposite in sign to the second time derivative of the purchasing power of money. Stating that a function is decreasing is equivalent to stating that its derivative is negative, so Nixon's statement is that the second derivative of inflation is negative, and so the third derivative of purchasing power is positive.
Since Nixon's statement allowed for the rate of inflation to increase, his statement did not necessarily indicate price stability.
^Rossi, Hugo (October 1996). "Mathematics Is an Edifice, Not a Toolbox" (PDF). Notices of the American Mathematical Society. 43 (10): 1108. Retrieved 13 November 2012.
January 01, 1970
third, derivative, this, article, relies, largely, entirely, single, source, relevant, discussion, found, talk, page, please, help, improve, this, article, introducing, citations, additional, sources, find, sources, news, newspapers, books, scholar, jstor, jul. This article relies largely or entirely on a single source Relevant discussion may be found on the talk page Please help improve this article by introducing citations to additional sources Find sources Third derivative news newspapers books scholar JSTOR July 2013 In calculus a branch of mathematics the third derivative or third order derivative is the rate at which the second derivative or the rate of change of the rate of change is changing The third derivative of a function y f x displaystyle y f x can be denoted by d 3 y d x 3 f x or d 3 d x 3 f x displaystyle frac d 3 y dx 3 quad f x quad text or frac d 3 dx 3 f x Other notations can be used but the above are the most common Contents 1 Mathematical definitions 2 Applications in geometry 3 Applications in physics 4 Economic examples 5 See also 6 ReferencesMathematical definitions editLet f x x 4 displaystyle f x x 4 nbsp Then f x 4 x 3 displaystyle f x 4x 3 nbsp and f x 12 x 2 displaystyle f x 12x 2 nbsp Therefore the third derivative of f is in this case f x 24 x displaystyle f x 24x nbsp or using Leibniz notation d 3 d x 3 x 4 24 x displaystyle frac d 3 dx 3 x 4 24x nbsp Now for a more general definition Let f be any function of x such that f is differentiable Then the third derivative of f is given by d 3 d x 3 f x d d x f x displaystyle frac d 3 dx 3 f x frac d dx f x nbsp The third derivative is the rate at which the second derivative f x is changing Applications in geometry editIn differential geometry the torsion of a curve a fundamental property of curves in three dimensions is computed using third derivatives of coordinate functions or the position vector describing the curve 1 Applications in physics editMain article Jerk physics In physics particularly kinematics jerk is defined as the third derivative of the position function of an object It is essentially the rate at which acceleration changes In mathematical terms j t d 3 r d t 3 displaystyle mathbf j t frac d 3 mathbf r dt 3 nbsp where j t is the jerk function with respect to time and r t is the position function of the object with respect to time Economic examples editWhen campaigning for a second term in office U S President Richard Nixon announced that the rate of increase of inflation was decreasing which has been noted as the first time a sitting president used the third derivative to advance his case for reelection 2 Since inflation is itself a derivative the rate at which the purchasing power of money decreases then the rate of increase of inflation is the derivative of inflation opposite in sign to the second time derivative of the purchasing power of money Stating that a function is decreasing is equivalent to stating that its derivative is negative so Nixon s statement is that the second derivative of inflation is negative and so the third derivative of purchasing power is positive Since Nixon s statement allowed for the rate of inflation to increase his statement did not necessarily indicate price stability See also editAberrancy geometry Derivative mathematics Second derivativeReferences edit do Carmo Manfredo 1976 Differential Geometry of Curves and Surfaces ISBN 0 13 212589 7 Rossi Hugo October 1996 Mathematics Is an Edifice Not a Toolbox PDF Notices of the American Mathematical Society 43 10 1108 Retrieved 13 November 2012 Retrieved from https en wikipedia org w index php title Third derivative amp oldid 1219630509, wikipedia, wiki, book, books, library,
