Questions tagged [partial-derivative]

For questions regarding partial derivatives. The partial derivative of a function of several variables is the derivative of the function with respect to one of those variables, with all others held constant.

The partial derivative of a function of several variables is the derivative of the function with respect to one of the variables, with the others held constant. The partial derivative, like the ordinary derivative, describes the rate of change of a function in a particular direction.

If $f = f(a_1, a_2, \dots, a_n)$ is a function of $n$ variables, then the partial derivative of $f$ with respect to the variable $a_i$ can be written as a limit:

$$\frac{\partial f}{\partial a_i} = \lim_{h \to 0} \frac{f(a_1, \dots, a_i + h, \dots, a_n) - f(a_1, \dots, a_i, \dots, a_n)}{h}.$$

Alternatively, this quantity can be denoted as $f_{a_i}$.

If the function has continuous partial second derivatives, then:

$$\frac{\partial}{\partial x_i}\left(\frac{\partial}{\partial x_j}\right)=\frac{\partial}{\partial x_j}\left(\frac{\partial}{\partial x_i}\right)$$

a result known as Schwarz's Theorem.

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If mixed partials are equal of $G$, what can one conclude about the map $G$?

Let $G:{\mathbb{R}^3} \to {\mathbb{R}^3}$ be defined by $G\left( {\rho ,\theta ,\phi } \right) = \left( {\rho \cos \theta \sin \phi ,\rho \sin \theta \sin \phi ,\rho \cos \phi } \right)$. I've found that ${G_{\rho \theta \phi }}\left( {\rho…
pabhp
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Trouble solving a question from Boas

Question: Consider $\Phi (x,h)= (1-2xh+h^2)^{-1/2}$. Show that $$(1-x^2){\partial^2 \Phi\over\partial x^2} -2x{\partial\Phi\over\partial x} +h{\partial^2\over\partial h^2} (h\Phi)=0$$ This is what I’m able to come up with (again, now third…
Atom
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How does function $x_i \rightarrow f(x_1,x_2, ..., x_i, ..., x_n)$ Lipschitz imply existence of partial derivatives?

How does function $x_i \rightarrow f(x_1,x_2, ..., x_i, ..., x_n)$ Lipschitz imply existence of partial derivatives? Particularly, is there a way to write this in such form that expresses component-wise differentiability?
mavavilj
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Calculating partial derivatives of functions defined by an equation system

The functions $A(x,y)$ and $B(x,y)$ are defined by the following equation system: $$x+y^2+2AB = 0 \text{ and } x^2-xy+y^3+A^2+B^2 = 0$$ Calculate the partial derivatives of $A_x, A_y, B_x$ and $B_y$. I do not understand what I am supposed to do…
3nondatur
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How to deal with such partial derivative

Suppose that $f(x,y,z,w)=0=g(x,y,z,w)$ determine $z$ and $w$ as differentiable functions of $x$ and $y$ . I need to find out $\dfrac{\partial z}{\partial x}$ at $y$ . I tried to approach using total differential form but got stuck. Please provide…
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find all points $(a,b,c)$ for which the the spheres $(x-a)^{2}+(y-b)^{2}+(z-c)^{2}=1$ and $x^{2}+y^{2}+z^{2}=1$ intercect orthogonally

find all points $(a,b,c)$ in space for which the the spheres $(x-a)^{2}+(y-b)^{2}+(z-c)^{2}= 1$ and $x^{2}+y^{2}+z^{2}=1$ will intersect orthogonally I used the fact that the dot products of the gradients must be zero but I got equations which…
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Does partial of $f(w+y,y)$ w.r.t $y$ hold $w+y$ constant, or just $w$ (or something else)

The partial means we hold everything else constant, but I am unsure of what we mean by everything else (does it mean all other arguments -- in which case we would hold $w+y$ constant -- or does it mean all other endogenous variables are held…
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derivative of a function in two variables notation

Quick question. What does $$\frac{\delta^2 f}{\delta x \delta y}$$ mean? Is it to multiply $\frac{\delta f}{\delta x}$ with $\frac{\delta f}{\delta y}$ or something else and if so, what?
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Partial differentiation of implicit function

How do calculate Partial differentiation of implicit function $$f( x+y+z,x^2+y^2+z^2)=0$$
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Partial derivative condition

Does $\frac{\partial^2{z} }{\partial{x} \partial{y} }$ always equal $\frac{\partial^2{z} }{\partial{y} \partial{x}}$? I find myself in situations where using one will be easier and faster than the other.
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elementary partial derivative proof.

If $z=e^{k(r-x)} r^2=x^2+y^2,\\$ show that: $\\\biggr(\frac{\partial{z}}{\partial{x}}\biggr)^2 +\biggr(\frac{\partial{z}}{\partial{y}}\biggr)^2+2zk\frac{\partial{z}}{\partial{x}}=0\\$ $My\;attempt :\\…
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Partial derivative: Change of variable

If $f=F(x, y)$ and $x=re^\theta$ and $y=re^{-\theta}$, prove that $2x\frac{\partial{f}}{\partial{x}}=r\frac{\partial{f} } {\partial{r}} +\frac{\partial{f} } {\partial{\theta}} $ I'm not even making headway on this question. I need some…
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Elementary partial derivative

$ \mathrm{If ~u=(x^2-y^2)f(t) where~ t=xy~and~ f ~denotes~ an ~arbitrary~ function,~ prove~ that~ \frac{\partial^2{u}} {\partial{x} {y}}=(x^2-y^2){\{t\cdot{f''(t)} } +3f'(t)}\} $ My attempt:$ \frac{\partial {u} } {\partial{x} } =(2x)f(t)+f'(t)…
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Prove that $\frac{\partial}{\partial x}f(x-x')=-\left(\frac{\partial}{\partial x'}\right)f(x-x')$

I haven't formally studied partial derivatives. My attempt: $\displaystyle\frac{\partial}{\partial x}f(x-x')=\frac{\partial f}{\partial x}(x-x')\times\left(1-\frac{d x'}{d x}\right)$ $\displaystyle\frac{\partial}{\partial x'}f(x-x')=\frac{\partial…
Siddhartha
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How to calculate this composite partial derivative?

I have the expressions : H = $p^2/2 - 1/(2q^2)$ D = (pq)/2 - Ht And I want to calculate the Poisson bracket [H,D] and show that it is -H = $-p^2/2 + 1/(2q^2)$ Here is the definition of a Poisson bracket (here we can drop the i subscript because I'm…