# Search results

• by where the comma is a partial derivative. For example The Christoffel symbols are part of a covariant derivative opperation, represented by a semicolin
371 bytes (56 words) - 19:15, 18 January 2014
• of proper-time-derivative is a differential operator and the relativistic generalization of material derivative (substantial derivative) in four-dimensional
6 KB (453 words) - 13:43, 13 May 2016
• graphed like the graph above. Now, I hope you know how to take a normal derivative by now. If you do not, you probably don't belong here. You are hopefully
8 KB (1,189 words) - 23:21, 30 January 2016
• The acceleration of an object is the time derivative of its velocity. Like velocity, acceleration can therefore be considered either as a vector quantity
2 KB (205 words) - 02:49, 1 July 2015
• us calculate the first four derivatives using : Setting equal to zero, we obtain Let us write for the -th derivative of  We also write — think
884 bytes (156 words) - 19:47, 29 July 2012
• the time derivative of its position. It is usually denoted by the symbol or by (where stands for position and the dot for the time derivative). Velocity
4 KB (419 words) - 01:10, 30 June 2015
• the derivative of with respect the the deformation gradient . From tensor calculus we have, for any second order tensor Therefore, The derivative of
55 bytes (261 words) - 14:03, 12 April 2016
• differential equation is an equation where a given function and an order of its derivative are in some way added or multiplied together in the same equation. The
525 bytes (59 words) - 20:35, 7 March 2014
• passing through a common point, and so they are called concurrent forces. derivative of the Public domain work of [Broxon]. Broxon, James W. "Mechanics"
2 KB (309 words) - 03:47, 1 July 2015
• . It represents a directed rate of change of . A directed derivative or vector derivative of , so to speak. In cartesian coordinates It is common to
4 KB (247 words) - 03:29, 1 July 2015
• operations is called differentiation, and the new function is called the derivative of the original function. This set of notes deals with the fundamentals
26 KB (2,513 words) - 09:27, 29 April 2016
• Introduction to Calculus. Because of this, you are expected to know derivatives inside and out, and also know basic integrals. In this course, we will
1 KB (113 words) - 01:35, 1 March 2015
• We denote the derivative of a function at a number as . The derivative of a function at a number a is given by the following limit (if it exists):
793 bytes (148 words) - 15:27, 21 February 2010
• time derivative (unsteadiness of the flow) and the change in space is the change along the path of the particle by means of the convective derivative.
56 KB (1,445 words) - 08:36, 26 February 2015
• shown as below: Find the 1st derivative of (Eq. 5.1 ): and show it is a N1-ODE. Find the first derivative by applying chain-rule to (Eq. 5
3 KB (150 words) - 04:40, 12 February 2016
• all genres covered. Careful with licenses that restrict comercial or derivative use Youtube Creative Commons - A large and rapidly growing collection
3 KB (352 words) - 01:56, 16 September 2015
• on page 18. On this particular problem, we have taken the derivative of f(x). The derivative of this equation gives us another equation which will tell
6 KB (972 words) - 17:29, 28 June 2016
• vector function that can be represented as where is a scalar. Then the derivative of with respect to is Note: In the above equation, the unit vectors
12 KB (927 words) - 22:57, 22 June 2014
• A differential equation is any equation involving derivatives of a dependent variable with respect to one or more independent variables. Thus are
4 KB (347 words) - 03:12, 1 July 2015
• derivative of 4-velocity. When curvalinear coordinates are used such as in general relativity, the acceleration 4-vector is the covariant derivative of
1 KB (80 words) - 10:13, 15 April 2016

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