المشتقة الثالثة

(تم التحويل من Third derivative)

في التفاضل، الذي هو فرع من الرياضيات، المشتقة الثالثة third derivative هي معدل تغير المشتقة الثانية، أو معدل تغير لمعدل التغير، وتُستخدم لتعريف الشذوذ aberrancy.[1] The third derivative of a function y=f(x) can be denoted by

Other notations can be used, but the above are the most common.

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تعريفات رياضية

Let . Then , and . Therefore, the third derivative of f(x) is, in this case,

or, using Leibniz notation,

Now for a more general definition. Let be any function of x. Then the third derivative of is given by the following:

The third derivative is the rate at which the second derivative (f''(x)) is changing.


تطبيقات في الهندسة

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.[2]

تطبيقات في الفيزياء

مقال رئيسي: 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:

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.

مثال اقتصادي

U.S. President Richard Nixon, when campaigning for a second term in office 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."[3] 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, or the second derivative of the function of purchasing power of money with respect to time. 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—or the third derivative of purchasing power—is negative.

Nixon's statement allowed for the rate of inflation to increase, however, so his statement was not as indicative of stable prices as it sounds.[بحاجة لمصدر]

انظر أيضاً

الهامش

  1. ^ Schot, Stephen (November 1978). "Aberrancy: Geometry of the Third Derivative". Mathematics Magazine. 5. 51: 259–275. doi:10.2307/2690245. JSTOR 2690245.
  2. ^ do Carmo, Manfredo (1976). Differential Geometry of Curves and Surfaces. ISBN 0-13-212589-7.
  3. ^ 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.