Difference between revisions of "Function Conjunction"

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The Anatomy of a Physical Expression

Constant	Coefficient	Quantity	Proximity	Dislocation	Direction
Examples: $\mu_0, \epsilon_0$ $k_B, \alpha, c$	Examples: $\mu_r, \epsilon_r$ $N$	Examples: $q,\lambda_q,\sigma_q,\rho_q$ $m,\rho$	Examples: $\frac{1}{\|\mathbf{r}\|}, \frac{1}{\|\mathbf{r}\|^2}$	Examples: $\mathbf{r}, \frac{d\mathbf{r}}{dt}, \frac{d^2\mathbf{r}}{dt^2}$ $\mathbf{r'}, \frac{d\mathbf{r'}}{dt}, \frac{d^2\mathbf{r'}}{dt^2}$ $\mathbf{x}, \mathbf{v}, \mathbf{a}, \beta$	Examples: $\mathbf{\hat{r}},\mathbf{\hat{\dot{r}}},\mathbf{\hat{\ddot{r}}}$ $\mathbf{\hat{r'}},\mathbf{\hat{\dot{r'}}},\mathbf{\hat{\ddot{r'}}}$ $\mathbf{\hat{x}}, \mathbf{\hat{v}}, \mathbf{\hat{a}}$

Constants

$\mu_0$ = Magnetic Permeability of Free Space
$\epsilon_0$ = Electric Permittivity of Free Space
$k_B$ = Boltzmann's constant
$\alpha$ = Fine Structure Constant
$c$ = Speed of Light

Quantities

$q$ = point charge
$\lambda_q$ = linear charge density (for continuous charge)
$\sigma_q$ = surface charge density (for continuous charge)
$\rho_q$ = volume charge density (for continuous charge)
$m$ = mass
$\rho$ = volume mass density

Dislocations

$\mathbf{r}$ = position of a charge $q$ at time $t$ , when it receives a light signal from $q'$ that was emitted earlier at time $t' = t - |\mathbf{r}-\mathbf{r'}|/c$
$\frac{d\mathbf{r}}{dt}$ = velocity of a charge $q$ at time $t$ , when it receives a light signal from $q'$ that was emitted earlier at time $t' = t - |\mathbf{r}-\mathbf{r'}|/c$
$\frac{d^2\mathbf{r}}{dt^2}$ = acceleration of a charge $q$ at time $t$ , when it receives a light signal from $q'$ that was emitted earlier at time $t' = t - |\mathbf{r}-\mathbf{r'}|/c$
$\mathbf{r'}$ = position a charge $q'$ was at the retarded time $t' = t - |\mathbf{r}-\mathbf{r'}|/c$ , when it emitted a light signal which has now reached $q$ at position $\mathbf{r}$ and time $t$
$\frac{d\mathbf{r'}}{dt}$ = velocity a charge $q'$ was at the retarded time $t' = t - |\mathbf{r}-\mathbf{r'}|/c$ , when it emitted a light signal which has now reached $q$ at position $\mathbf{r}$ and time $t$
$\frac{d^2\mathbf{r'}}{dt^2}$ = acceleration a charge $q'$ was at the retarded time $t' = t - |\mathbf{r}-\mathbf{r'}|/c$ , when it emitted a light signal which has now reached $q$ at position $\mathbf{r}$ and time $t$

Functions Composed of Physical Expressions

Functions for a point charge $q'$

The electric scalar potential $\mathbf{\varphi}$ at $\left(\mathbf{r},t\right)$ due to a point charge $q'$ at $\left(\mathbf{r'},t'\right)$ is:

The magnetic vector potential $A$ at $\left(\mathbf{r},t\right)$ due to a point charge $q'$ which had a velocity $\mathbf{v'}$ at $\left(\mathbf{r'},t'\right)$ is:

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Difference between revisions of "Function Conjunction"

Revision as of 16:59, 23 April 2016

Contents

The Anatomy of a Physical Expression

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Functions Composed of Physical Expressions

Functions for a point charge $q'$

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Difference between revisions of "Function Conjunction"

Revision as of 16:59, 23 April 2016

Contents

The Anatomy of a Physical Expression

Constants

Quantities

Dislocations

Functions Composed of Physical Expressions

Functions for a point charge q′q'

Navigation menu

S.H.O.

Search

Functions for a point charge $q'$