This site is being phased out.
Search results
From Mathematics Is A Science
Jump to navigationJump to searchCreate the page "Total derivative" on this wiki! See also the search results found.
- It's just a limit. But we recognize that this is the derivative of some function. We compare the expression to the formula in the definitio Now, find the derivative of $x\cdot e^{x}$ with PR: above set49 KB (8,436 words) - 17:14, 8 March 2018
- Furthermore, the derivative is defined as a limit. Unlike the limits we saw prior to derivatives, this ...unctions differentiable at a point is differentiable at that point and its derivative is equal to the sum of their derivatives; i.e., for any two functions $f,g$82 KB (14,116 words) - 19:50, 6 December 2018
- ...nes on ${\mathbb R}_x$ are called ''primal chain functions''. The exterior derivative is also given: ==The derivative of a $0$-chain map is a $1$-chain map==41 KB (7,344 words) - 12:52, 25 July 2016
- ...-g(c_{i})$. Then, its area is $(f(c_{i})-g(c_{i})) \Delta x_2$. Hence, the total area of the rectangles is: *we represent the total quantity $Q$ as the sum of its values $Q_i$ over simpler, or smaller, regio103 KB (18,460 words) - 01:01, 13 February 2019
- ==The instantaneous rate of change: derivative== ...es of change and, after the limit, the two components of the vector of the derivative of the curve.130 KB (22,842 words) - 13:52, 24 November 2018
- ...ay the cells are attached to each other affects the matrix of the exterior derivative: ...ere we start to need geometry is when we move from the first to the second derivative.42 KB (7,131 words) - 17:31, 30 November 2015
- <!--150-->[[image:first derivative and Monotonicity.png| center]] ==The derivative==64 KB (11,521 words) - 19:48, 22 June 2017
- ==The derivative of a $0$-cochain is a $1$-cochain== Even though we are familiar with the derivative of a function as the ''rate of change'', the ''change'' will be initially o40 KB (6,983 words) - 19:24, 23 July 2016
- ...ay the cells are attached to each other affects the matrix of the exterior derivative: ...ere we start to need geometry is when we move from the first to the second derivative.41 KB (6,928 words) - 17:31, 26 October 2015
- *the derivative of a function is the ''rate of change'', while *the exterior derivative of a $0$-form is the ''change''.36 KB (6,218 words) - 16:26, 30 November 2015
- *the derivative of a function is the ''rate of change'', while *the exterior derivative of a $0$-form is the ''change''.35 KB (6,055 words) - 13:23, 24 August 2015
- <!--150-->[[image:first derivative and Monotonicity.png| center]] ==The derivative==42 KB (7,443 words) - 14:18, 1 August 2016
- ...le ''ordinary differential equations (ODEs)'' with respect to the exterior derivative $d$ that have explicit solutions. *the first derivative $f'$ instead of the exterior derivative, and47 KB (8,415 words) - 15:46, 1 December 2015
- ...e time is in the first column progressing from $0$ every $.05$. The second derivative is in the next, $0$ and $-32$, respectively. In the next column, the initia A ''pattern'' is clear: growth by $2$. We have the total of six (linear) functions!76 KB (13,017 words) - 20:26, 23 February 2019
- ...o each other affects the matrix of the boundary operator (and the exterior derivative): that is closed: $A_N=A_0$. The ''total curvature'' of curve $C$ is the sum of the curvatures at the vertices (exce35 KB (5,871 words) - 22:43, 7 April 2016
- We now combine all the tangent spaces into one total tangent space. It contains all possible directions in each location: each t The total work over a path in the complex is the ''line integral''<!--\index{line int16 KB (2,753 words) - 13:55, 16 March 2016
- \text{the derivative }&\text{ the integral}\quad\\ ==The total value of a function: the Riemann sum==66 KB (11,473 words) - 21:36, 19 January 2019
- Warning: the method fails when it reaches a point where the derivative is equal to (or even close to) $0$. The most important use of the latter notation is in the definition of the derivative:59 KB (10,063 words) - 04:59, 21 February 2019
- To define [[derivative]]s we need limits and for [[limits]] we need to understand better the [[top These two cases lead to the concept of [[partial derivative]]s.34 KB (5,636 words) - 23:52, 7 October 2017
- ...portion $h$, dependent on the presumed length of the time interval, of the total amount is shared. ...of the ODE of population growth and decay -- with respect to the exterior derivative $d_t$ over time. This time, however, for each cell there are four adjacent44 KB (7,469 words) - 18:12, 30 November 2015
- ...ote that the total amount of heat in the rod remains the same (seen under “total” in the spreadsheet shown above). ...ortion, $k$, dependent on the presumed length of the time interval, of the total amount is exchanged.53 KB (9,682 words) - 23:19, 18 November 2018
- ==The derivative of a function of several variables== '''Definition.''' The ''partial derivative of $z=f(X)=f(x_1,...,x_n)$ with respect $x_k$ at'' $X=A=(a_1,...,a_n)$ are42 KB (6,904 words) - 15:15, 30 October 2017
- This is a vertical flip; there are also the horizontal and diagonal flips, a total of $4$. Only these four axes allow condition (A) to be satisfied. $\square$ is the (total) ''chain map''<!--\index{chain map}--> generated by $f$.31 KB (5,330 words) - 22:14, 14 March 2016
- *Chapter 3. The derivative 4 The limit of the difference quotient: the derivative16 KB (1,933 words) - 19:50, 28 June 2021
- ...portion $h$, dependent on the presumed length of the time interval, of the total amount is exchanged. The two images below are the initial state (a single i ...of the ODE of population growth and decay -- with respect to the exterior derivative $d_t$ over time. For each cell there are four adjacent cells and four tempe35 KB (5,917 words) - 12:51, 30 June 2016
- Assuming a fixed mass, the total force gives us our acceleration. We to compute: What is the total flow along this “staircase”? We simply add the values located on these91 KB (16,253 words) - 04:52, 9 January 2019
- and its derivative equals Find the directional derivative $D_v f(1,0,1)$, where46 KB (8,035 words) - 13:50, 15 March 2018
- But we don't recognize $\sin (x^{2})$ as the derivative of any function we know... *the derivative of the “inside” function is present as a factor.69 KB (11,727 words) - 03:34, 30 January 2019
- The expression can be understood as the total flux of $a$ across a region of area $1$ on $a^\star$: ...ve” is always trivial. Instead, one can define the “Hodge-dualized” second derivative computed following these four steps:21 KB (3,445 words) - 13:53, 19 February 2016
- The expression can be understood as: the total flux of $a$ across a region of area $1$ on $a^\star$. ...ve” is always trivial. Instead, one can define the “Hodge-dualized” second derivative computed following these four steps:20 KB (3,354 words) - 17:37, 30 November 2015
- ...r pound. How much of each do you need to have $6$ pounds of blend with the total price of $\$14$? ...the Kenyan coffee and let $y$ be the weight of Colombian coffee. Then the total price of the blend is $\$ 14$. Therefore, we have a system:46 KB (7,625 words) - 13:08, 26 February 2018
- The ''material derivative'' is the [[rate of change]] of some physical quantity ([[heat]], or [[momen ...d the physical quantity is the temperature of the fluid. Then the material derivative describes the temperature evolution of a certain fluid parcel in time, as i2 KB (388 words) - 21:31, 17 July 2012
- *$d_t$ is the exterior derivative with respect to time (just the difference since the dimension is $1$); and *$d_x$ is the exterior derivative with respect to location.39 KB (6,850 words) - 15:29, 17 July 2015
- ...opulation $\Delta y$ is proportional to $y$... and $T-y$, where $T$ is the total possible population: In the meantime, the derivative, if any, would satisfy the following:64 KB (11,426 words) - 14:21, 24 November 2018
- ...r pound. How much of each do you need to have $6$ pounds of blend with the total price of $\$14$? ...the Kenyan coffee and let $y$ be the weight of Colombian coffee. Then the total price of the blend is $\$ 14$. Therefore, we have a system:113 KB (18,750 words) - 02:33, 10 December 2018
- <center>''a function on the right and its derivative is on the left''. </center> ...as differential forms. The form on the left is what we call the ''exterior derivative'' of the form on the right.34 KB (5,619 words) - 16:00, 30 November 2015
- ...linear map evaluated at $x-a$. This linear map $L_a$ is called the ''total derivative of $f$ at $x = a$''. Then, the total derivative7 KB (1,162 words) - 03:25, 22 August 2011
- We collect the tangent spaces into the (dimension $1$) ''total tangent space'' of $K$: Then $\varphi$ is a function on the total tangent space,13 KB (2,459 words) - 03:27, 25 June 2015
- ..., however, can take the squaring function as an input. This means that the derivative takes all the information of the squaring function—such as that two is se ...me. For example, travelling a steady 50 mph for 3 hours results in a total distance of 150 miles. In the diagram on the left, when constant velocity27 KB (4,329 words) - 16:02, 1 September 2019
- *Goals: good understanding of limits, the derivative and the integral, fluent differentiation. i.e., the total score is the following weighted average of the five scores:13 KB (2,075 words) - 13:35, 27 November 2017
- *$J$: ''total current density'' (including both free and bound current); *$d$ and $d^*$ are the [[exterior derivative]] of the primal and the dual complex respectively (they are [[adjoint]] ope6 KB (922 words) - 00:30, 9 April 2016
- *Grade Breakdown: TOTAL = .05×A + .40×(Q + H) + .20×M + .35×F **2.1 The Derivative and the Slope of a Graph9 KB (1,141 words) - 16:08, 26 April 2015
- '''Theorem.''' Given a [[vector field]] $F = ( p, q )$ with continuous [[derivative]]. Then '''Theorem.''' Suppose vector field $F = ( p, q )$ has continuous derivative. Then16 KB (2,752 words) - 14:18, 28 December 2012
- ...differential equations (ODEs) of cochains'' with respect to their exterior derivative $d$. We choose a few simple examples that have explicit solutions. *the first derivative $f'$ instead of the exterior derivative, and16 KB (2,913 words) - 22:40, 15 July 2016
- ...of the ODE of population growth and decay -- with respect to the exterior derivative $d_t$ over time. For each cell there are two adjacent cells and two tempera *$d_t$ is the exterior derivative with respect to time; and16 KB (2,843 words) - 21:41, 23 March 2016
- How do we understand the [[derivative]] of [[functions of several variables]]? *The [[directional derivative]] $\nabla_e f(a)$ is a number for each $e$, $||e||=1$, there are infinitely6 KB (962 words) - 15:45, 17 August 2011
- *derivative, ...at any point: the slope] of the tangent line is equal to the value of the derivative of $f$ at the point.32 KB (5,426 words) - 21:57, 5 August 2016
- This is what we have learned about the [[derivative]]: *Geometrically, the derivative is about ''[[slope]]s''.3 KB (466 words) - 17:26, 20 July 2011
- The early calculus is about the derivative, i.e., the rate of change of a function. This doesn't seem like a part of T ==The derivative==13 KB (2,233 words) - 14:41, 20 February 2015
- Name:_________________________ $\qquad$ 10 problems, 100 points total ...The graph of a function $f(x)$ is given below. Estimate the values of the derivative $f'(x)$ for $x=0,4,$ and $6$. (Just the answer)2 KB (263 words) - 21:54, 6 March 2017
- We know how to compute the derivative of the product of, say, three functions. We simply apply the product rule t ...olved and each contains all three, except one of them is replaced with its derivative. Applying the rule for boundaries above will have the exact same effect. Th34 KB (5,644 words) - 13:35, 1 December 2015
- <center>total area of rectangles $= f(c_1) {\Delta}x + f(c_2) {\Delta}x + ... + f(c_k) {\ ...$k$ intervals. Then the volume is the sum of the volumes of the boxes, in total there are $k^n$. Integrate over $B$ to get the $( n + 1 )$-dimensional volu33 KB (5,415 words) - 05:58, 20 August 2011
- ...ay}{|c|}\hline \quad \text{function} \quad \longrightarrow \quad \text{its derivative}. \quad \\ \hline\end{array}$$ and the total amount becomes $\$1010$. After the second year we have the interest:113 KB (18,425 words) - 13:42, 8 February 2019
- *Prerequisites: excellent algebra skills, good understanding of limits, the derivative, and the integral, fluent differentiation -- [[Calculus I -- Fall 2017|Calc i.e., the total score is the following weighted average of the five scores:12 KB (1,928 words) - 19:15, 12 April 2018
- Note that for a constant $k$, we are dealing with the second derivative of the $0$-form $u$ with respect to space: Compare it to the second derivative of a $1$-form $U$ with respect to space:10 KB (1,775 words) - 02:40, 9 April 2016
- We will start our exploration with familiar idea of the [[derivative]] from [[calculus 1:_course|calculus 1]]. Consider the two notations for the [[derivative]] at $a$ of $f$:5 KB (959 words) - 13:15, 12 August 2015
- ...we acquire first the derivative $f'$ of $f$, and then we find the exterior derivative (a $1$-form) $dg$ by integrating $f'$ on the segments: '''Exercise.''' Show that, in this case, all the values of the derivative $f'$ of $f$ are the limits of sequences of values of $g_k'$, under the assu21 KB (3,664 words) - 02:02, 18 July 2018
- After all, the derivative of a monotonic function is either all positive or all negative. ...ch voter's rating vote into a comparison vote, then tally the votes into a total comparison vote, and then finally convert it back to a rating vote. (The la41 KB (6,942 words) - 05:04, 22 June 2016
- *Goals: good understanding of limits, the derivative and the integral, fluent differentiation. i.e., the total score is the following weighted average of the five scores:8 KB (1,184 words) - 17:55, 29 October 2018
- *Find the matrix of the total derivative of $F(x,y)=(x\sin y,x-y)$ at $(1,0).$ ...n such that the matrix of $F'(0,0)$ is the identity matrix. Find the total derivative of the vector function $H(x,y)=F(xy-1,x+y-2)$ at $(1,1)$.14 KB (2,538 words) - 18:35, 14 October 2017
- *Goals: good understanding of limits, the derivative and the integral, fluent differentiation *Grade Breakdown: TOTAL $= .05 \times P + .25\times (Q + H) + .20\times FP + .20\times M + .30\time11 KB (1,671 words) - 23:11, 13 December 2016
- *Goals: good understanding of limits, the derivative and the integral, fluent differentiation *Grade Breakdown: TOTAL $= .05 \times P + .25\times (Q + H) + .20\times FP + .20\times M + .30\time12 KB (1,803 words) - 20:50, 1 May 2017
- After all, the derivative of a monotonic function is either all positive or all negative. ...nt the web as a directed graph and let $E$ be the set of edges and $N$ the total number of nodes in the graph. Then the PageRank is defined by the recursive47 KB (8,030 words) - 18:48, 30 November 2015
- Warning: A common mistake in elementary calculus is to assume that the derivative of the product is the product of the derivatives. Don't make a similar mist ...-\index{chain groups}--> $L$ and we call, within this section, $C_k$ the ''total $k$th chain group''.32 KB (5,480 words) - 02:23, 26 March 2016
- ...ow of adjacent pieces cancel each other, the total of these numbers is the total amount of liquid leaving the region. ...em of Calculus]]. Thus, the divergence is simply a generalization of the [[derivative]].2 KB (385 words) - 20:18, 28 August 2011
- *Prerequisites: excellent algebra skills, good understanding of the derivative and the integral, fluent differentiation and integration. i.e., the total score is the following weighted average of the five scores:10 KB (1,596 words) - 13:34, 27 November 2017
- *$J$: ''total current density'' (including both free and bound current); *$d$ and $d^*$ are the [[exterior derivative]] of the primal and the dual complex respectively,4 KB (655 words) - 14:51, 13 July 2012
- ...the word comes from: this k-form is (or is not) ''exactly'' the [[exterior derivative]] of some (k-1)-form. ...for [[differential form]]s of higher degree when we deal with the exterior derivative not gradient. Why not simply call it a "1-form that isn't exact"?8 KB (1,251 words) - 03:54, 29 March 2011
- ...iation exercises -- use properties and the list of derivatives (7 items in total). We don't recognize $\sin (x^{2})$ as the derivative of any function we know.7 KB (1,114 words) - 18:15, 21 July 2011
- *Prerequisites: excellent algebra skills, good understanding of limits, the derivative, and the integral, fluent differentiation -- [[Calculus I -- Fall 2017|Calc i.e., the total score is the following weighted average of the five scores:3 KB (431 words) - 17:55, 29 October 2018
- *Prerequisites: excellent algebra skills, good understanding of limits, the derivative, and the integral, fluent differentiation -- [[Calculus I -- Fall 2017|Calc i.e., the total score is the following weighted average of the five scores:3 KB (392 words) - 04:56, 26 January 2019
- Later, we will use the derivative. Now we use the fact that this is a [[parabola]]. Later, we'll use the [[derivative]].19 KB (2,850 words) - 15:04, 19 March 2011
- 2. Find the matrix of the total derivative of $f(x,y)=(x\sin y,x-y)$ at $(1,0).$ 3. Suppose $f$ is a differentiable function with $f'(0)=3$. Find the derivative of $g(x,y)=f(x^2+x+y^2+y)$ at $(0,0)$.1 KB (261 words) - 02:55, 22 August 2011
- <td class="TableCell">derivative of circle graph</td> <td class="TableCell">derivative as a linear operator</td>24 KB (3,456 words) - 13:01, 30 September 2011
- $$\text{total flux }\approx \sum_{i=1}^n V(X(c_i))\cdot D^\perp_i.$$ ...segment from $(0,0)$ to $(1,3)$. First parametrize the curve and find its derivative:12 KB (2,194 words) - 14:37, 5 December 2017
- The next column contains the sum of the two, the ''total sampled energy'': Here, the value of the function and its derivative are provided for a particular value of the variable, $x=0$. These are calle50 KB (8,692 words) - 14:29, 24 November 2018
- ...n such that the matrix of $f'(0,0)$ is the identity matrix. Find the total derivative of the vector function $h(x,y)=f(xy-1,x+y-2)$ at $(1,1)$.2 KB (375 words) - 02:58, 22 August 2011
- $$\text{Sum of the two areas } = \text{ The total area from } a \text{ to } c$$ For the most important property see [[Derivative and integral: Fundamental Theorem of Calculus]].3 KB (456 words) - 23:26, 20 July 2011
- We can restate this in calculus terms: ''the derivative of $y$ is proportional to $y$''. Or: ...nnually, with the same APR? After $\frac{1}{2}$ year, $1000\cdot 0.05$, or total8 KB (1,201 words) - 15:45, 2 May 2011
- *Grade Breakdown: TOTAL $= .05 \times P + .30\times (Q + H) + .30\times P + .35\times F$ ...r [http://inperc.com/files/pva.xlsx download], some explanations are [[The derivative#A ball is thrown...|here]].9 KB (1,360 words) - 15:10, 1 June 2017
- 5. Find the directional derivative of the function $f(x,y)=1+2x\sqrt{y}$ at 6. Find the dimensions of a rectangular box of maximal volume such that the total surface area is equal to 64.4 KB (652 words) - 15:22, 9 March 2014
- *Prerequisites: excellent algebra skills, good understanding of limits, the derivative, and the integral, fluent differentiation -- [[Calculus 1: course|Calculus *Grade Breakdown: TOTAL = .05×A + .30×Q + .25×M + .40×F3 KB (431 words) - 18:53, 19 December 2012
- ...a [[directed graph]]. Let $E$ be the set of edges of the graph and $N$ the total number of nodes in the graph. This is the formula for the PageRank: where $d$ stands for the [[exterior derivative]].4 KB (580 words) - 14:58, 5 January 2013
- *Prerequisites: excellent algebra skills, good understanding of limits, the derivative, and the integral, fluent differentiation -- [[Calculus 1: course|Calculus *Grade Breakdown: TOTAL = .05×A + .40×(Q + H) + .20×M + .35×F5 KB (744 words) - 02:44, 10 December 2014
- ...would be as the limit of \( B - A \) approaches zero. This is called the ''derivative'' of \(AB\) and is the slope of the tangent line. We find the total area under the curve by adding the areas of all the rectangles. We can impr4 KB (703 words) - 14:34, 9 September 2016
- *Goals: good understanding of limits, the derivative and the integral, fluent differentiation *Grade Breakdown: TOTAL = .05×A + .30×Q + .25×M + .40×F4 KB (604 words) - 20:49, 13 December 2012
- ...would be as the limit of \( B - A \) approaches zero. This is called the ''derivative'' of \(AB\) and is the slope of the tangent line. We find the total area under the curve by adding the areas of all the rectangles. We can impr10 KB (1,532 words) - 00:07, 2 May 2011
- Name:_________________________ $\qquad$ 10 problems, 100 points total $\bullet$ '''3.''' Calculate the derivative of $f(x) = x^{\pi} + \pi^{x} + x + \pi$ indicating the rules you use.2 KB (242 words) - 21:56, 12 December 2016
- We will consider a new examples of applications of the [[derivative]] as the rate of change of a variable. However, let's recall ''the'' exampl 1 lbs/in & 2 lbs/in. What is the total mass?4 KB (678 words) - 15:47, 2 May 2011
- *Prerequisites: excellent algebra skills, good understanding of the derivative and the integral, fluent differentiation and integration -- [[Calculus I -- *Grade Breakdown: TOTAL = .05×A + .40×(Q + H) + .20×M + .35×F (see the [http://inperc.com/files6 KB (805 words) - 13:38, 6 May 2015
- It follows that the total number of $(m-1)$-faces is $2m$. Warning: A common mistake in elementary calculus is to assume that the derivative of the product is the product of the derivatives. Don't make a similar mist46 KB (7,844 words) - 12:50, 30 March 2016
