partial derivatives

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1—10 of 59 matching pages

1: 36.10 Differential Equations

… ►

36.10.6

\frac{{\partial}^{ln}\Psi_{K}}{{\partial x_{m}}^{ln}}=i^{n(l-m)}\frac{{% \partial}^{mn}\Psi_{K}}{{\partial x_{l}}^{mn}},

1\leq m\leq K

1\leq l\leq K

ⓘ

Symbols:: $\Psi_{\NVar{K}}\left(\NVar{\mathbf{x}}\right)$ : canonical integral function, $\mathrm{i}$ : imaginary unit, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $l$ : integer, $n$ : integer, $m$ : integer, $K$ : codimension and $x_{i}$ : real parameter
Referenced by:: §36.10(ii)
Permalink:: http://dlmf.nist.gov/36.10.E6
Encodings:: pMML, png, TeX
See also:: Annotations for §36.10(ii), §36.10 and Ch.36

… ►

36.10.7

\frac{{\partial}^{2n}\Psi_{2}}{{\partial x}^{2n}}=i^{n}\frac{{\partial}^{n}% \Psi_{2}}{{\partial y}^{n}}.

ⓘ

Symbols:: $\Psi_{\NVar{K}}\left(\NVar{\mathbf{x}}\right)$ : canonical integral function, $\mathrm{i}$ : imaginary unit, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $y$ : real parameter, $m$ : integer and $x$ : real parameter
Permalink:: http://dlmf.nist.gov/36.10.E7
Encodings:: pMML, png, TeX
See also:: Annotations for §36.10(ii), §36.10(ii), §36.10 and Ch.36

… ►

36.10.8

\frac{{\partial}^{2n}\Psi_{3}}{{\partial x}^{2n}}=i^{n}\frac{{\partial}^{n}% \Psi_{3}}{{\partial y}^{n}},

ⓘ

Symbols:: $\Psi_{\NVar{K}}\left(\NVar{\mathbf{x}}\right)$ : canonical integral function, $\mathrm{i}$ : imaginary unit, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $y$ : real parameter, $m$ : integer and $x$ : real parameter
Permalink:: http://dlmf.nist.gov/36.10.E8
Encodings:: pMML, png, TeX
See also:: Annotations for §36.10(ii), §36.10(ii), §36.10 and Ch.36

►

36.10.9

\frac{{\partial}^{3n}\Psi_{3}}{{\partial x}^{3n}}=(-1)^{n}\frac{{\partial}^{n}% \Psi_{3}}{{\partial z}^{n}},

ⓘ

Symbols:: $\Psi_{\NVar{K}}\left(\NVar{\mathbf{x}}\right)$ : canonical integral function, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : real parameter, $m$ : integer and $x$ : real parameter
Permalink:: http://dlmf.nist.gov/36.10.E9
Encodings:: pMML, png, TeX
See also:: Annotations for §36.10(ii), §36.10(ii), §36.10 and Ch.36

►

36.10.10

\frac{{\partial}^{3n}\Psi_{3}}{{\partial y}^{3n}}=i^{n}\frac{{\partial}^{2n}% \Psi_{3}}{{\partial z}^{2n}}.

ⓘ

Symbols:: $\Psi_{\NVar{K}}\left(\NVar{\mathbf{x}}\right)$ : canonical integral function, $\mathrm{i}$ : imaginary unit, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $y$ : real parameter, $z$ : real parameter and $m$ : integer
Permalink:: http://dlmf.nist.gov/36.10.E10
Encodings:: pMML, png, TeX
See also:: Annotations for §36.10(ii), §36.10(ii), §36.10 and Ch.36

…

2: 1.5 Calculus of Two or More Variables

… ►The function

f(x,y)

is continuously differentiable if

f

\ifrac{\partial f}{\partial x}

, and

\ifrac{\partial f}{\partial y}

are continuous, and twice-continuously differentiable if also

\ifrac{{\partial}^{2}f}{{\partial x}^{2}}

\ifrac{{\partial}^{2}f}{{\partial y}^{2}}

\,{\partial}^{2}f/\,\partial x\,\partial y

, and

\,{\partial}^{2}f/\,\partial y\,\partial x

are continuous. … ►

1.5.9

\frac{\partial}{\partial v}f(x(u,v),y(u,v),z(u,v))=\frac{\partial f}{\partial x% }\frac{\partial x}{\partial v}+\frac{\partial f}{\partial y}\frac{\partial y}{% \partial v}+\frac{\partial f}{\partial z}\frac{\partial z}{\partial v}.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/1.5.E9
Encodings:: pMML, png, TeX
See also:: Annotations for §1.5(i), §1.5(i), §1.5 and Ch.1

… ►

1.5.15

\nabla^{2}f=\frac{{\partial}^{2}f}{{\partial x}^{2}}+\frac{{\partial}^{2}f}{{% \partial y}^{2}}+\frac{{\partial}^{2}f}{{\partial z}^{2}}=\frac{{\partial}^{2}% f}{{\partial r}^{2}}+\frac{1}{r}\frac{\partial f}{\partial r}+\frac{1}{r^{2}}% \frac{{\partial}^{2}f}{{\partial\phi}^{2}}+\frac{{\partial}^{2}f}{{\partial z}% ^{2}}.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : variable, $\phi$ : longitude and $r$ : radius
Permalink:: http://dlmf.nist.gov/1.5.E15
Encodings:: pMML, png, TeX
See also:: Annotations for §1.5(ii), §1.5(ii), §1.5 and Ch.1

… ►

1.5.38

\frac{\partial(f,g)}{\partial(x,y)}=\begin{vmatrix}\ifrac{\partial f}{\partial x% }&\ifrac{\partial f}{\partial y}\\ \ifrac{\partial g}{\partial x}&\ifrac{\partial g}{\partial y}\end{vmatrix},

ⓘ

Symbols:: $\det$ : determinant, $(\NVar{a},\NVar{b})$ : open interval, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/1.5.E38
Encodings:: pMML, png, TeX
See also:: Annotations for §1.5(vi), §1.5(vi), §1.5 and Ch.1

… ►

1.5.40

\frac{\partial(f,g,h)}{\partial(x,y,z)}=\begin{vmatrix}\ifrac{\partial f}{% \partial x}&\ifrac{\partial f}{\partial y}&\ifrac{\partial f}{\partial z}\\ \ifrac{\partial g}{\partial x}&\ifrac{\partial g}{\partial y}&\ifrac{\partial g% }{\partial z}\\ \ifrac{\partial h}{\partial x}&\ifrac{\partial h}{\partial y}&\ifrac{\partial h% }{\partial z}\end{vmatrix},

ⓘ

Symbols:: $\det$ : determinant, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/1.5.E40
Encodings:: pMML, png, TeX
See also:: Annotations for §1.5(vi), §1.5(vi), §1.5 and Ch.1

…

3: 19.18 Derivatives and Differential Equations

… ►Let

\partial_{j}=\ifrac{\partial}{\partial z_{j}}

, and

\mathbf{e}_{j}

be an

n

-tuple with 1 in the

j

th place and 0’s elsewhere. … ►

19.18.6

\left(\frac{\partial}{\partial x}+\frac{\partial}{\partial y}+\frac{\partial}{% \partial z}\right)R_{F}\left(x,y,z\right)=\frac{-1}{2\sqrt{x}\sqrt{y}\sqrt{z}},

ⓘ

Symbols:: $R_{F}\left(\NVar{x},\NVar{y},\NVar{z}\right)$ : symmetric elliptic integral of first kind, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Referenced by:: §19.18(ii), §19.32, Erratum (V1.1.3) for Chapter 19
Permalink:: http://dlmf.nist.gov/19.18.E6
Encodings:: pMML, png, TeX
Correction (effective with 1.1.3):: The factors inside the square root on the right-hand side were written as products to ensure the correct multivalued behavior.
Suggested 2021-06-07 by Luc Maisonobe
See also:: Annotations for §19.18(ii), §19.18 and Ch.19

… ►

19.18.14

\frac{{\partial}^{2}w}{{\partial x}^{2}}=\frac{{\partial}^{2}w}{{\partial y}^{% 2}}+\frac{1}{y}\frac{\partial w}{\partial y}.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/19.18.E14
Encodings:: pMML, png, TeX
See also:: Annotations for §19.18(ii), §19.18 and Ch.19

… ►

19.18.15

\frac{{\partial}^{2}W}{{\partial t}^{2}}=\frac{{\partial}^{2}W}{{\partial x}^{% 2}}+\frac{{\partial}^{2}W}{{\partial y}^{2}}.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ and $W$ : wave function
Permalink:: http://dlmf.nist.gov/19.18.E15
Encodings:: pMML, png, TeX
See also:: Annotations for §19.18(ii), §19.18 and Ch.19

… ►

19.18.16

\frac{{\partial}^{2}u}{{\partial x}^{2}}+\frac{{\partial}^{2}u}{{\partial y}^{% 2}}+\frac{1}{y}\frac{\partial u}{\partial y}=0,

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/19.18.E16
Encodings:: pMML, png, TeX
See also:: Annotations for §19.18(ii), §19.18 and Ch.19

…

4: 10.38 Derivatives with Respect to Order

… ►

10.38.2

\frac{\partial K_{\nu}\left(z\right)}{\partial\nu}=\tfrac{1}{2}\pi\csc\left(% \nu\pi\right)\*\left(\frac{\partial I_{-\nu}\left(z\right)}{\partial\nu}-\frac% {\partial I_{\nu}\left(z\right)}{\partial\nu}\right)-\pi\cot\left(\nu\pi\right% )K_{\nu}\left(z\right),

\nu\notin\mathbb{Z}

… ►For

\ifrac{\partial I_{\nu}\left(z\right)}{\partial\nu}

\nu=-n

combine (10.38.1), (10.38.2), and (10.38.4). … ►

\left.\frac{\partial I_{\nu}\left(z\right)}{\partial\nu}\right|_{\nu=0}=-K_{0}% \left(z\right),

►

\left.\frac{\partial K_{\nu}\left(z\right)}{\partial\nu}\right|_{\nu=0}=0.

… ►

10.38.7

\left.\frac{\partial K_{\nu}\left(x\right)}{\partial\nu}\right|_{\nu=\pm\frac{% 1}{2}}=\pm\sqrt{\frac{\pi}{2x}}E_{1}\left(2x\right)e^{x}.

ⓘ

Symbols:: $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $E_{1}\left(\NVar{z}\right)$ : exponential integral, $K_{\NVar{\nu}}\left(\NVar{z}\right)$ : modified Bessel function of the second kind, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $x$ : real variable and $\nu$ : complex parameter
A&S Ref:: 10.2.34 (corrected)
Referenced by:: §10.38, Ch.10
Permalink:: http://dlmf.nist.gov/10.38.E7
Encodings:: pMML, png, TeX
See also:: Annotations for §10.38, §10.38 and Ch.10

…

5: 16.14 Partial Differential Equations

… ►

x(1-x)\frac{{\partial}^{2}{F_{1}}}{{\partial x}^{2}}+y(1-x)\frac{\,{\partial}^% {2}{F_{1}}}{\,\partial x\,\partial y}+\left(\gamma-(\alpha+\beta+1)x\right)% \frac{\partial{F_{1}}}{\partial x}-\beta y\frac{\partial{F_{1}}}{\partial y}-% \alpha\beta{F_{1}}=0,

… ►

x(1-x)\frac{{\partial}^{2}{F_{2}}}{{\partial x}^{2}}-xy\frac{\,{\partial}^{2}{% F_{2}}}{\,\partial x\,\partial y}+\left(\gamma-(\alpha+\beta+1)x\right)\frac{% \partial{F_{2}}}{\partial x}-\beta y\frac{\partial{F_{2}}}{\partial y}-\alpha% \beta{F_{2}}=0,

►

y(1-y)\frac{{\partial}^{2}{F_{2}}}{{\partial y}^{2}}-xy\frac{\,{\partial}^{2}{% F_{2}}}{\,\partial x\,\partial y}+\left(\gamma^{\prime}-(\alpha+\beta^{\prime}% +1)y\right)\frac{\partial{F_{2}}}{\partial y}-\beta^{\prime}x\frac{\partial{F_% {2}}}{\partial x}-\alpha\beta^{\prime}{F_{2}}=0,

… ►

x(1-x)\frac{{\partial}^{2}{F_{4}}}{{\partial x}^{2}}-2xy\frac{\,{\partial}^{2}% {F_{4}}}{\,\partial x\,\partial y}-y^{2}\frac{{\partial}^{2}{F_{4}}}{{\partial y% }^{2}}+\left(\gamma-(\alpha+\beta+1)x\right)\frac{\partial{F_{4}}}{\partial x}% -(\alpha+\beta+1)y\frac{\partial{F_{4}}}{\partial y}-\alpha\beta{F_{4}}=0,

►

y(1-y)\frac{{\partial}^{2}{F_{4}}}{{\partial y}^{2}}-2xy\frac{\,{\partial}^{2}% {F_{4}}}{\,\partial x\,\partial y}-x^{2}\frac{{\partial}^{2}{F_{4}}}{{\partial x% }^{2}}+\left(\gamma^{\prime}-(\alpha+\beta+1)y\right)\frac{\partial{F_{4}}}{% \partial y}-(\alpha+\beta+1)x\frac{\partial{F_{4}}}{\partial x}-\alpha\beta{F_% {4}}=0.

…

6: 10.15 Derivatives with Respect to Order

… ►

10.15.1

\frac{\partial J_{\pm\nu}\left(z\right)}{\partial\nu}=\pm J_{\pm\nu}\left(z% \right)\ln\left(\tfrac{1}{2}z\right)\mp(\tfrac{1}{2}z)^{\pm\nu}\sum_{k=0}^{% \infty}(-1)^{k}\frac{\psi\left(k+1\pm\nu\right)}{\Gamma\left(k+1\pm\nu\right)}% \frac{(\tfrac{1}{4}z^{2})^{k}}{k!},

ⓘ

Symbols:: $J_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the first kind, $\Gamma\left(\NVar{z}\right)$ : gamma function, $\psi\left(\NVar{z}\right)$ : psi (or digamma) function, $!$ : factorial (as in $n!$ ), $\ln\NVar{z}$ : principal branch of logarithm function, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $k$ : nonnegative integer, $z$ : complex variable and $\nu$ : complex parameter
A&S Ref:: 9.1.64
Referenced by:: §10.15, §10.38, Erratum (V1.0.17) for Equations (10.15.1), (10.38.1)
Permalink:: http://dlmf.nist.gov/10.15.E1
Encodings:: pMML, png, TeX
Addition (effective with 1.0.17):: This equation has been generalized to include the additional case of $\ifrac{\partial J_{-\nu}\left(z\right)}{\partial\nu}$ because it will help the user who wants to combine it with (10.15.2).
See also:: Annotations for §10.15, §10.15 and Ch.10

►

10.15.2

\frac{\partial Y_{\nu}\left(z\right)}{\partial\nu}=\cot\left(\nu\pi\right)% \left(\frac{\partial J_{\nu}\left(z\right)}{\partial\nu}-\pi Y_{\nu}\left(z% \right)\right)-\csc\left(\nu\pi\right)\frac{\partial J_{-\nu}\left(z\right)}{% \partial\nu}-\pi J_{\nu}\left(z\right).

ⓘ

Symbols:: $J_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the first kind, $Y_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the second kind, $\pi$ : the ratio of the circumference of a circle to its diameter, $\csc\NVar{z}$ : cosecant function, $\cot\NVar{z}$ : cotangent function, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : complex variable and $\nu$ : complex parameter
A&S Ref:: 9.1.65
Referenced by:: (10.15.1), §10.15
Permalink:: http://dlmf.nist.gov/10.15.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §10.15, §10.15 and Ch.10

… ►

10.15.3

\left.\frac{\partial J_{\nu}\left(z\right)}{\partial\nu}\right|_{\nu=n}=\frac{% \pi}{2}Y_{n}\left(z\right)+\frac{n!}{2(\tfrac{1}{2}z)^{n}}\sum_{k=0}^{n-1}% \frac{(\tfrac{1}{2}z)^{k}J_{k}\left(z\right)}{k!(n-k)}.

ⓘ

Symbols:: $J_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the first kind, $Y_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the second kind, $\pi$ : the ratio of the circumference of a circle to its diameter, $!$ : factorial (as in $n!$ ), $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $n$ : integer, $k$ : nonnegative integer, $z$ : complex variable and $\nu$ : complex parameter
A&S Ref:: 9.1.66
Referenced by:: §10.15, §10.15, §10.38
Permalink:: http://dlmf.nist.gov/10.15.E3
Encodings:: pMML, png, TeX
See also:: Annotations for §10.15, §10.15 and Ch.10

►For

\ifrac{\partial J_{\nu}\left(z\right)}{\partial\nu}

\nu=-n

combine (10.2.4) and (10.15.3). … ►

10.15.5

\left.\frac{\partial J_{\nu}\left(z\right)}{\partial\nu}\right|_{\nu=0}=\frac{% \pi}{2}Y_{0}\left(z\right),\quad\left.\frac{\partial Y_{\nu}\left(z\right)}{% \partial\nu}\right|_{\nu=0}=-\frac{\pi}{2}J_{0}\left(z\right).

ⓘ

Symbols:: $J_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the first kind, $Y_{\NVar{\nu}}\left(\NVar{z}\right)$ : Bessel function of the second kind, $\pi$ : the ratio of the circumference of a circle to its diameter, $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : complex variable and $\nu$ : complex parameter
A&S Ref:: 9.1.68
Referenced by:: §10.15, §10.38
Permalink:: http://dlmf.nist.gov/10.15.E5
Encodings:: pMML, png, TeX
See also:: Annotations for §10.15, §10.15 and Ch.10

…

7: 12.17 Physical Applications

… ►

12.17.2

\nabla^{2}=\frac{{\partial}^{2}}{{\partial x}^{2}}+\frac{{\partial}^{2}}{{% \partial y}^{2}}+\frac{{\partial}^{2}}{{\partial z}^{2}}

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $x$ : real variable, $y$ : real variable and $z$ : complex variable
Permalink:: http://dlmf.nist.gov/12.17.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §12.17 and Ch.12

… ►

12.17.4

\frac{1}{\xi^{2}+\eta^{2}}\left(\frac{{\partial}^{2}w}{{\partial\xi}^{2}}+% \frac{{\partial}^{2}w}{{\partial\eta}^{2}}\right)+\frac{{\partial}^{2}w}{{% \partial\zeta}^{2}}+k^{2}w=0.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $k$ : constant, $\xi$ : coordinate, $\eta$ : coordinate and $\zeta$ : coordinate
Permalink:: http://dlmf.nist.gov/12.17.E4
Encodings:: pMML, png, TeX
See also:: Annotations for §12.17 and Ch.12

…

8: 10.73 Physical Applications

… ►

10.73.1

\nabla^{2}V=\frac{1}{r}\frac{\partial}{\partial r}\left(r\frac{\partial V}{% \partial r}\right)+\frac{1}{r^{2}}\frac{{\partial}^{2}V}{{\partial\phi}^{2}}+% \frac{{\partial}^{2}V}{{\partial z}^{2}}=0,

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/10.73.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §10.73(i), §10.73 and Ch.10

… ►

10.73.2

\nabla^{2}\psi=\frac{1}{c^{2}}\frac{{\partial}^{2}\psi}{{\partial t}^{2}},

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/10.73.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §10.73(i), §10.73 and Ch.10

… ►

10.73.3

\nabla^{4}W+\lambda^{2}\frac{{\partial}^{2}W}{{\partial t}^{2}}=0.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ and $\,\partial\NVar{x}$ : partial differential of $x$
Permalink:: http://dlmf.nist.gov/10.73.E3
Encodings:: pMML, png, TeX
See also:: Annotations for §10.73(i), §10.73 and Ch.10

… ►

10.73.4

(\nabla^{2}+k^{2})f=\frac{1}{\rho^{2}}\frac{\partial}{\partial\rho}\left(\rho^% {2}\frac{\partial f}{\partial\rho}\right)+\frac{1}{\rho^{2}\sin\theta}\frac{% \partial}{\partial\theta}\left(\sin\theta\frac{\partial f}{\partial\theta}% \right)+\frac{1}{\rho^{2}{\sin}^{2}\theta}\frac{{\partial}^{2}f}{{\partial\phi% }^{2}}+k^{2}f.

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $\sin\NVar{z}$ : sine function and $k$ : nonnegative integer
Permalink:: http://dlmf.nist.gov/10.73.E4
Encodings:: pMML, png, TeX
See also:: Annotations for §10.73(ii), §10.73 and Ch.10

…

9: 20.13 Physical Applications

… ►

20.13.1

\ifrac{\partial\theta(z|\tau)}{\partial\tau}=\kappa\ifrac{{\partial}^{2}\theta% (z|\tau)}{{\partial z}^{2}},

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $\tau$ : lattice parameter and $z$ : real variable
Referenced by:: §20.13
Permalink:: http://dlmf.nist.gov/20.13.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §20.13 and Ch.20

… ►

20.13.2

\ifrac{\partial\theta}{\partial t}=\alpha\ifrac{{\partial}^{2}\theta}{{% \partial z}^{2}},

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $t$ : time, $\alpha$ : real parameter and $z$ : real variable
Referenced by:: §20.13
Permalink:: http://dlmf.nist.gov/20.13.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §20.13 and Ch.20

…

10: 30.13 Wave Equation in Prolate Spheroidal Coordinates

… ►

30.13.3

h_{\xi}^{2}=\left(\frac{\partial x}{\partial\xi}\right)^{2}+\left(\frac{% \partial y}{\partial\xi}\right)^{2}+\left(\frac{\partial z}{\partial\xi}\right% )^{2}=\frac{c^{2}(\xi^{2}-\eta^{2})}{\xi^{2}-1},

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : complex variable, $x$ : real variable, $y$ : real variable, $\xi$ : prolate spheroidal coordinate, $\eta$ : prolate spheroidal coordinate, $c$ : positive constant and $h_{\xi},h_{\eta},h_{\phi}$ : metric coefficients
A&S Ref:: 21.4.2
Permalink:: http://dlmf.nist.gov/30.13.E3
Encodings:: pMML, png, TeX
See also:: Annotations for §30.13(ii), §30.13 and Ch.30

►

30.13.4

h_{\eta}^{2}=\left(\frac{\partial x}{\partial\eta}\right)^{2}+\left(\frac{% \partial y}{\partial\eta}\right)^{2}+\left(\frac{\partial z}{\partial\eta}% \right)^{2}=\frac{c^{2}(\xi^{2}-\eta^{2})}{1-\eta^{2}},

ⓘ

Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : complex variable, $x$ : real variable, $y$ : real variable, $\xi$ : prolate spheroidal coordinate, $\eta$ : prolate spheroidal coordinate, $c$ : positive constant and $h_{\xi},h_{\eta},h_{\phi}$ : metric coefficients
Permalink:: http://dlmf.nist.gov/30.13.E4
Encodings:: pMML, png, TeX
See also:: Annotations for §30.13(ii), §30.13 and Ch.30

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30.13.5

h_{\phi}^{2}=\left(\frac{\partial x}{\partial\phi}\right)^{2}+\left(\frac{% \partial y}{\partial\phi}\right)^{2}+\left(\frac{\partial z}{\partial\phi}% \right)^{2}=c^{2}(\xi^{2}-1)(1-\eta^{2}).

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Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $z$ : complex variable, $x$ : real variable, $y$ : real variable, $\xi$ : prolate spheroidal coordinate, $\eta$ : prolate spheroidal coordinate, $\phi$ : prolate spheroidal coordinate, $c$ : positive constant and $h_{\xi},h_{\eta},h_{\phi}$ : metric coefficients
Permalink:: http://dlmf.nist.gov/30.13.E5
Encodings:: pMML, png, TeX
See also:: Annotations for §30.13(ii), §30.13 and Ch.30

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30.13.6

\nabla^{2}=\frac{1}{h_{\xi}h_{\eta}h_{\phi}}\left(\frac{\partial}{\partial\xi}% \left(\frac{h_{\eta}h_{\phi}}{h_{\xi}}\frac{\partial}{\partial\xi}\right)+% \frac{\partial}{\partial\eta}\left(\frac{h_{\xi}h_{\phi}}{h_{\eta}}\frac{% \partial}{\partial\eta}\right)+\frac{\partial}{\partial\phi}\left(\frac{h_{\xi% }h_{\eta}}{h_{\phi}}\frac{\partial}{\partial\phi}\right)\right)=\frac{1}{c^{2}% (\xi^{2}-\eta^{2})}\left(\frac{\partial}{\partial\xi}\left((\xi^{2}-1)\frac{% \partial}{\partial\xi}\right)+\frac{\partial}{\partial\eta}\left((1-\eta^{2})% \frac{\partial}{\partial\eta}\right)+\frac{\xi^{2}-\eta^{2}}{(\xi^{2}-1)(1-% \eta^{2})}\frac{{\partial}^{2}}{{\partial\phi}^{2}}\right).

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Symbols:: $\frac{\partial\NVar{f}}{\partial\NVar{x}}$ : partial derivative of $f$ with respect to $x$ , $\,\partial\NVar{x}$ : partial differential of $x$ , $\xi$ : prolate spheroidal coordinate, $\eta$ : prolate spheroidal coordinate, $\phi$ : prolate spheroidal coordinate, $c$ : positive constant and $h_{\xi},h_{\eta},h_{\phi}$ : metric coefficients
A&S Ref:: 21.5.1 (in corrected form)
Permalink:: http://dlmf.nist.gov/30.13.E6
Encodings:: pMML, png, TeX
See also:: Annotations for §30.13(iii), §30.13 and Ch.30

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