Unterschiede

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--- electrical_engineering_2:the_stationary_electric_flow [2022/12/22 23:02] – mexleadmin
+++ electrical_engineering_2:the_stationary_electric_flow [2024/03/29 19:57] (aktuell) – mexleadmin
@@ Zeile 1: / Zeile 1: @@
-====== 2. The stationary Current Density and Flux ======
+====== 2 The stationary Current Density and Flux ======
-<callout> For this chapter the online Book 'University Physics II' is strongly recommended as reference. In detail this is:
+<callout>
+The online book 'University Physics II' is strongly recommended as a reference for this chapter. Especially the following chapters:
   * Chapter [[https://phys.libretexts.org/Bookshelves/University_Physics/Book%3A_University_Physics_(OpenStax)/Book%3A_University_Physics_II_-_Thermodynamics_Electricity_and_Magnetism_(OpenStax)/09%3A_Current_and_Resistance/9.03%3A_Model_of_Conduction_in_Metals|9.3 Model of Conduction in Metals]]
 </callout>
-At the dissusion of the electrostatic field in principle no charges in motion were considered. Now the motion of charges shall be considered explicitly.
+In the discussion of the electrostatic field in principle, no charges in motion were considered. Now the motion of charges shall be considered explicitly.
-The current density here describes how charge carriers move together (collectively). The stationary current density describes the charge carrier movement, if a **direct voltage**  is the cause of the movement. A constant direct current then flows in the stationary electric flow field. Thus there is no time dependence of the current:
+The current density here describes how charge carriers move together (collectively). The stationary current density describes the charge carrier movement if a **direct voltage**  is the cause of the movement. A constant direct current then flows in the stationary electric flow field. Thus, there is no time dependency on the current:
-$\large{{dI}\over{dt}}=0$
+$\large{{{\rm d}I}\over{{\rm d}t}}=0$
-Also important is: Up to now was considered, charges did move through a field or could be moved in future. Now just the moment of the movement is considered.
+Also important is: Up to now was considered, charges did move through a field or could be moved in the future. Now just the moment of the movement is considered.
 ===== 2.1 Current Strength and Flux Field =====
@@ Zeile 31: / Zeile 31: @@
 ==== Current and current density in a Simple Case ====
-The current strength was previously understood as "charge per time" ($I={{dQ}\over{dt}}$). Microscopically, electric current is the directed motion of electric charge carriers. In the chapter [[electrical_engineering_1:preparation_properties_proportions#qualitative_view|Basic concepts]] we have already discussed the picture of the charge carrier current penetrating through a cross-sectional area $A$ (see <imgref ImgNr01>). Furthermore, we had quite practically applied Ohm's law with $R = {{U}\over{I}}$ in DC. Now we know that the voltage in a electrostatic field can be derived from the electric field strength. But what about the current?
+The current strength was previously understood as "charge per time" ($I={{{\rm d}Q}\over{{\rm d}t}}$). Microscopically, electric current is the directed motion of electric charge carriers. In the chapter [[electrical_engineering_1:preparation_properties_proportions#qualitative_view|Basic concepts]] we have already discussed the picture of the charge carrier current penetrating through a cross-sectional area $A$ (see <imgref ImgNr01>). Furthermore, we had quite practically applied Ohm's law with $R = {{U}\over{I}}$ in DC. Now we know that the voltage in an electrostatic field can be derived from the electric field strength. But what about the current?
 <WRAP> <imgcaption ImgNr01 | part of a Conductor> </imgcaption> {{drawio>charges_in_conductor.svg}} </WRAP>
-For this purpose, a packet of charges $dQ$ is considered, which will pass the area $A$ during the period $dt$ (see <imgref imageNo02>). These charges are located in a partial volume element $dV$, which is given by the area $A$ to be traversed and a partial section $dx$: $dV = A \cdot dx$. The amount of charges per volume is given by the charge carrier density, specifically for metals by the electron density $n_e$. The electron density $n_e$ gives the number of free electrons per unit volume a. For copper, for example, this is approximately $n_e(Cu)=8.47 \cdot 10^{19} {{1}\over{mm^3}}$.
+For this purpose, a packet of charges ${\rm d}Q$ is considered, which will pass the area $A$ during the period ${\rm d}t$ (see <imgref imageNo02>). These charges are located in a partial volume element ${\rm d}V$, which is given by the area $A$ to be traversed and a partial section ${\rm d}x$: ${\rm d}V = A \cdot {\rm d}x$. The amount of charges per volume is given by the charge carrier density, specifically for metals by the electron density $n_{\rm e}$. The electron density $n_{\rm e}$ gives the number of free electrons per unit volume a. For copper, for example, this is approximately $n_{\rm e}({\rm Cu})=8.47 \cdot 10^{19} ~{\rm {1}\over{mm^3}}$.
 ~~PAGEBREAK~~ ~~CLEARFIX~~
@@ Zeile 43: / Zeile 43: @@
 The flowing charges contained in the partial volume element $dV$ are then (with elementary charge $e_0$):
-\begin{align*} dQ = n_e \cdot e_0 \cdot A \cdot dx \end{align*}
+\begin{align*} {\rm d} Q = n_{\rm e} \cdot e_0 \cdot A \cdot  {\rm d}x \end{align*}
-The current is then given by $I={{dQ}\over{dt}}$:
+The current is then given by $I={{{\rm d}Q}\over{{\rm d}t}}$:
-\begin{align*} I = n_e \cdot e_0 \cdot A \cdot {{dx}\over{dt}} = n_e \cdot e_0 \cdot A \cdot v_e \end{align*}
+\begin{align*} I = n_{\rm e} \cdot e_0 \cdot A \cdot {{{\rm d}x}\over{{\rm d}t}} = n_e \cdot e_0 \cdot A \cdot v_{\rm e} \end{align*}
 This leads to an electron velocity $v_e$ of:
-\begin{align*} v_e = {{dx}\over{dt}} = {{I}\over{n_e \cdot e_0 \cdot A }} \end{align*}
+\begin{align*} v_{\rm e} = {{{\rm d}x}\over{{\rm d}t}} = {{I}\over{n_{\rm e} \cdot e_0 \cdot A }} \end{align*}
-In contrast to the considerations in electrostatics, the charges now travels with finite velocities. With regard to the electron velocity $v_e \sim {{I}\over{A}}$ it is obvious to determine a current density $S$ (related to the area):
+In contrast to the considerations in electrostatics, the charges now travel with finite velocities.
+With regard to the electron velocity $v_{\rm e} \sim {{I}\over{A}}$ it is obvious to determine a current density $S$ (related to the area):
 \begin{align*}
@@ Zeile 68: / Zeile 69: @@
 As with the electrostatic field, a homogeneous field form and the inhomogeneous field form are to be contrasted:
-  - In a **homogeneous current field** (e.g. conductor with constant cross-section) the field lines of the current run parallel. The equipotential surfaces are always perpendicular to each other, because the potential energy of a charge depends only on its position along the path. \\ Additionally, the equipotential surfaces are equidistant due to the homogeneous geometry and the constant electric field , which causes the current. \\ Therefore the current $I = S \cdot A$ is constant \\ $\rightarrow$ the charge carriers have the same velocity $v$ \\
+  - In a **homogeneous current field** (e.g. conductor with constant cross-section) the field lines of the current run parallel. The equipotential surfaces are always perpendicular to each other because the potential energy of a charge depends only on its position along the path. \\ Additionally, the equipotential surfaces are equidistant due to the homogeneous geometry and the constant electric field, which causes the current. \\ Therefore the current $I = S \cdot A$ is constant \\ $\rightarrow$ the charge carriers have the same velocity $v$ \\ \\
   - In an **inhomogeneous current field** (e.g. a fuse or bottleneck in a wire) the field lines of the current are not parallel. the current $I = S \cdot A$ along the wire must also be constant, because the charge does not disappear or appear from nothing, but the area $A$ becomes smaller. \\ $\rightarrow$ thus the current density $S$ and the velocity $v$ at the bottleneck must become larger. \\ The equipotential surfaces are again perpendicular to the current density. The current does now show a compression at the bottleneck.
@@ Zeile 76: / Zeile 77: @@
 <WRAP> <imgcaption imageNo03 | Field Lines and equipotential Surfaces of the electric Current Field> </imgcaption> <WRAP> {{drawio>fieldlineelectricflowfield.svg}} \\ </WRAP>
-The current density was determined only for a constant cross-sectional area $A$, through which a homogeneous current - thus also a homogeneous current field - passes at perpendicularly. Now however, a general approach for the electric current strength has to be found.
+The current density was determined only for a constant cross-sectional area $A$, through which a homogeneous current - thus also a homogeneous current field - passes perpendicularly. Now, however, a general approach for the electric current strength has to be found.
-For this purpose, instead of a constant current density $S$ over a vertical, straight cross-sectional area $A$, a varying current density $S(A)$ over many small partial areas $dA$ is considered. Thus, if the subareas are sufficiently small, a constant current density over the subarea can again be obtained. It then becomes
+For this purpose, instead of a constant current density $S$ over a vertical, straight cross-sectional area $A$, a varying current density $S(A)$ over many small partial areas ${\rm d}A$ is considered. Thus, if the subareas are sufficiently small, a constant current density over the subarea can again be obtained. It then becomes
-\begin{align*} I = S \cdot A \rightarrow dI = S \cdot dA \end{align*}
+\begin{align*} I = S \cdot A \rightarrow {\rm d}I = S \cdot {\rm d}A \end{align*}
 The total current over a larger area $A$ is thus given as:
-\begin{align*} I = \int dI = \iint_A S \cdot dA \end{align*}
+\begin{align*} I = \int {\rm d}I = \iint_A S \cdot {\rm d}A \end{align*}
-But what was not considered here: The chosen area $A$ does not necessarily have to be perpendicular to the current density $S$. To take this into account, the (partial) surface normal vector $d\vec{A}$ can be used. If only the part of the current density $\vec{S}$ is to be considered which acts in the direction of $d\vec{A}$, this can be determined via the scalar product:
+But what was not considered here: The chosen area $A$ does not necessarily have to be perpendicular to the current density $S$. To take this into account, the (partial) surface normal vector ${\rm d}\vec{A}$ can be used. If only the part of the current density $\vec{S}$ is to be considered which acts in the direction of $d\vec{A}$, this can be determined via the scalar product:
-\begin{align} I = \int dI = \iint_A \vec{S} \cdot d\vec{A} \end{align}
+\begin{align} I = \int {\rm d}I = \iint_A \vec{S} \cdot {\rm d}\vec{A} \end{align}
 This represents the integral notation of the electric current strength. This can be used to determine the current strength in any field.
@@ Zeile 95: / Zeile 96: @@
 ==== General Material Law ====
-For a "pragmatic" derivation of the general material law for the current density, the compression of the equipotential surfaces at the constriction shall be discussed again. Between two equipotential surfaces there is a voltage difference $\Delta U$. If one chooses this sufficiently small, the transition of $\Delta U \rightarrow dU$ results again. However, the same current $I$ must always flow through the potential surfaces in the conductor. Ohm's law then gives the partial resistance $dR$ between the two equipotential surfaces:
+For a "pragmatic" derivation of the general material law for the current density, the compression of the equipotential surfaces at the constriction shall be discussed again. Between two equipotential surfaces, there is a voltage difference $\Delta U$. If one chooses this sufficiently small, the transition of $\Delta U \rightarrow {\rm d}U$ results again. However, the same current $I$ must always flow through the potential surfaces in the conductor. Ohm's law then gives the partial resistance ${\rm d}R$ between the two equipotential surfaces:
-\begin{align*} dU = I \cdot dR \tag{2.1.1} \end{align*}
+\begin{align*} {\rm d}U = I \cdot {\rm d}R \tag{2.1.1} \end{align*}
 The individual quantities are now to be considered for infinitesimally small parts. For $I$ an equation about a density - the current density - was already found:
@@ Zeile 105: / Zeile 106: @@
 But also $R$ has already been expressed by a "density" - the resistivity $\varrho$: $ R = \varrho \cdot {{l}\over{A}}$
-If a conductor made of the same material is considered, the resistivity $\varrho$ is the same everywhere. But if there is now a partial element $ds$ along the conductor, where the cross-section $A$ is smaller, the resistance $dR$ of this partial element also changes. The partial resistance is then:
+If a conductor made of the same material is considered, the resistivity $\varrho$ is the same everywhere. But if there is now a partial element ${\rm d}s$ along the conductor, where the cross-section $A$ is smaller, the resistance ${\rm d}R$ of this partial element also changes. The partial resistance is then:
-\begin{align*} dR = \varrho \cdot {{ds}\over{A}} \tag{2.1.3} \end{align*}
+\begin{align*} {\rm d}R = \varrho \cdot {{{\rm d}s}\over{A}} \tag{2.1.3} \end{align*}
 In concrete terms, this means for the bottleneck: **The resistance increases at the bottleneck. Thus the voltage drop also increases there. Thus there are also more equipotential surfaces there. **
-This solves the question, why there is a compression of the equipotential surfaces at the bottleneck (cmp. <imgref imageNo02 >). Interestingly, the thought model can now also for a __homogeneous body__  explain the general material law. To do this, one inserts equation $(2.1.2)$ and $(2.1.3)$ into $(2.1.1)$. Then it follows:
+This solves the question of why there is a compression of the equipotential surfaces at the bottleneck (see <imgref imageNo02 >). Interestingly, the thought model can now also for a __homogeneous body__  explain the general material law. To do this, one inserts equation $(2.1.2)$ and $(2.1.3)$ into $(2.1.1)$. Then it follows:
-\begin{align*} dU = I \cdot dR = S \cdot A \cdot \varrho \cdot {{ds}\over{{A}}} = \varrho \cdot S \cdot ds \\ \end{align*}
+\begin{align*}
+{\rm d}U = I \cdot {\rm d}R
+         = S \cdot A \cdot \varrho \cdot {{{\rm d}s}\over{{A}}}
+         = \varrho \cdot S \cdot {\rm d}s \\
+\end{align*}
 If now the electric field strength is inserted as $E={{dU}\over{ds}}$, one obtains:
-\begin{align*} E = {{dU}\over{ds}} = \varrho \cdot S \end{align*}
+\begin{align*}
+E = {{{\rm d}U}\over{{\rm d}s}}
+  = \varrho \cdot S
+\end{align*}
-With a more detailed (and mathematically correct) derivation you get:
+With a more detailed (and mathematically correct) derivation, you get:
-\begin{align*} \boxed{\vec{E} = \varrho \cdot \vec{S} } \end{align*}
+\begin{align*}
+\boxed{\vec{E} = \varrho \cdot \vec{S} }
+\end{align*}
 This equation expresses how the electric field $\vec{E}$ and the (stationary) current density $\vec{S}$ are related: both point in the same direction. For a given electric field $\vec{E}$ in a homogeneous conductor, the smaller the resistivity $\varrho$, the larger the current density $\vec{S}$.
@@ Zeile 139: / Zeile 149: @@
 <panel type="info" title="Task 2.1.2 Electron velocity in copper"> <WRAP group><WRAP column 2%>{{fa>pencil?32}}</WRAP><WRAP column 92%>
-A current of $I = 2A$ flows in a conductor made of copper with cross-sectional area $A$. \\ The electron density in copper is $n_e(Cu)=8.47 \cdot 10^{19} {{1}\over{mm^3}}$ and the magnitude of the elementary charge $e_0 = 1.602 \cdot 10^{-19} As$
+A current of $I = 2~{\rm A}$ flows in a conductor made of copper with cross-sectional area $A$. \\ The electron density in copper is $n_{\rm e}({\rm Cu})=8.47 \cdot 10^{19} ~{\rm {1}\over{mm^3}}$ and the magnitude of the elementary charge $e_0 = 1.602 \cdot 10^{-19} ~{\rm As}$
-  - What is the average electron velocity $v_{e,1}$ of electrons when the cross-sectional area of the conductor is $A = 1.5mm^2$?
+  - What is the average electron velocity $v_{\rm e,1}$ of electrons when the cross-sectional area of the conductor is $A = 1.5~{\rm mm}^2$?
-  - What is the average electron velocity $v_{e,1}$ of electrons when the cross-sectional area of the conductor is $A = 1.0mm^2$?
+  - What is the average electron velocity $v_{\rm e,1}$ of electrons when the cross-sectional area of the conductor is $A = 1.0~{\rm mm}^2$?
 </WRAP></WRAP></panel>
@@ Zeile 148: / Zeile 158: @@
 <panel type="info" title="Task 2.1.3 Electron velocity in Semiconductors"> <WRAP group><WRAP column 2%>{{fa>pencil?32}}</WRAP><WRAP column 92%>
-Similar to the task 2.1.2 a current of $I = 2A$ shall flow through a cross-sectional area $A = 1.5mm^2$ of semiconductors. \\
+Similar to task 2.1.2 a current of $I = 2~{\rm A}$ shall flow through a cross-sectional area $A = 1.5~{\rm mm}^2$ of semiconductors. \\
-(magnitude of the elementary charge $e_0 = 1.602 \cdot 10^{-19} As$)
+(magnitude of the elementary charge $e_0 = 1.602 \cdot 10^{-19} ~{\rm As}$)
-  - What is the average electron velocity $v_{e,1}$ of electrons for undoped silicon (electron density $n_e(Si)=9.65 \cdot 10^{9} {{1}\over{cm^3}}$ at room temperature)?
+  - What is the average electron velocity $v_{\rm e,1}$ of electrons for undoped silicon (electron density $n_{\rm e}({\rm Si})=9.65 \cdot 10^{9} ~{\rm {1}\over{cm^3}}$ at room temperature)?
-  - The electron density of doped silicon $n_e(Si\;doped)$ is (mainly) given by the numbers of dopant atoms per volume. The doping shall provide 1 donator atom per $10^7$ silicon atoms (here: one donator atom shall release one electron). The molar volume of silicon is $12 \cdot 10^{-6}{{m^3}\over{mol}}$ with $6.022\cdot10^{23}$ silicon atoms per $mol$. What is the average electron velocity $v_{e,1}$ of electrons for doped silicon?
+  - The electron density of doped silicon $n_{\rm e}(Si\; doped)$ is (mainly) given by the number of dopant atoms per volume. The doping shall provide 1 donator atom per $10^7$ silicon atoms (here: one donator atom shall release one electron). The molar volume of silicon is $12 \cdot 10^{-6}~{\rm {m^3}\over{mol}}$ with $6.022 \cdot 10^{23}$ silicon atoms per ${\rm mol}$. What is the average electron velocity $v_{\rm e,1}$ of electrons for doped silicon?
@@ Zeile 161: / Zeile 171: @@
 <callout>
-==== Targets ====
+==== Goals ====
 After this lesson, you should:
   - know which quantities are comparable for the electrostatic field and the flow field.
-  - be able to explain the displacement current on the basis of enveloping surfaces.
+  - be able to explain the displacement current based on enveloping surfaces.
   - understand how current can flow "through" a capacitor.
 </callout>
-On can now compare the formulas of the current density with the formulas of the displacement flux density. Interestingly, these have a similar structure (see <imgref ImgNr06 >). However, the Gauss's law for the current density was not considered up to now.
+On can now compare the formulas of the current density with the formulas of the displacement flux density. Interestingly, these have a similar structure (see <imgref ImgNr06 >). However, Gauss's law for the current density was not considered up to now.
 <WRAP> <imgcaption ImgNr06 | Comparison of the electrostatic Field and Current Density> </imgcaption> {{drawio>ComparisonElField.svg}} </WRAP>
-The Gauss's law of the current density shall be analyzed now. <imgref ImgNr07> a) shows a closed surface around a part of the wire. Since the charge has to be conserved, the incoming current $I_{in}= S_{in}\cdot A_{in}= {{dQ_{in}}\over{dt}}$ must be equal to the outgoing current $I_{out}= S_{out}\cdot A_{out}= {{dQ_{out}}\over{dt}}$ (<imgref ImgNr07> b) ). This is also true for any arbitrary current density going through the surface, see <imgref ImgNr07> c) .
+Gauss's law of the current density shall be analyzed now. <imgref ImgNr07> a) shows a closed surface around a part of the wire. Since the charge has to be conserved, the incoming current $I_{\rm in}= S_{\rm in}\cdot A_{\rm in}= {{{\rm d}Q_{\rm in}}\over{{\rm d}t}}$ must be equal to the outgoing current $I_{\rm out}= S_{\rm out}\cdot A_{\rm out}= {{{\rm d}Q_{\rm out}}\over{{\rm d}t}}$ (<imgref ImgNr07> b) ). This is also true for any arbitrary current density going through the surface, see <imgref ImgNr07> c).
 <WRAP 50%> <imgcaption ImgNr07 | Gauss's Law for Current Density> </imgcaption> {{drawio>GaussCurrent.svg}} \\ {{drawio>GaussCurrent2.svg}}</WRAP>
@@ Zeile 182: / Zeile 192: @@
 \begin{align*}
- I_{A_0} = \int_{A_0}  dI = \iint_{A_0}  \vec{S} \cdot d\vec{A} = 0
+ I_{A_0} = \int_{A_0}  {\rm d}I = \iint_{A_0}  \vec{S} \cdot {\rm d}\vec{A} = 0
 \end{align*}
-But, how do the charges "flow" through a capacitor? Or more explicit: What happens, when we look onto a closed surface enveloping only one plate of the capacitor? There is only one incoming current. but no outgoing. Between the plate inside of the dielectrics there are no moving charges. How shall this work?
+But, how do the charges "flow" through a capacitor? Or more explicitly:
+What happens, when we look at a closed surface enveloping only one plate of the capacitor?
+There is only one incoming current. but no outgoing. Between the plate inside of the dielectrics there are no moving charges. How shall this work?
 <WRAP 50%> <imgcaption ImgNr08 | Gauss's Law for Current Density for a Capacitor Plate> </imgcaption> {{drawio>GaussCurrentCapacitor.svg}} </WRAP>
-For this, also the displacement flux density $D$ has taken into account. Since on the capacitor plate the ingoing charges gets enriched (or depleted) there will be a continuous increase of the displacement flux $\Psi$ (which is directly related to the charge $Q$). The ingoing current $I = {{dQ}\over{dt}}$ lead to a constant ${{d\Psi}\over{dt}}$ in the dielectric. As more displacement flux gets created, as more charges will be induced on the other plate. This also lead to a current from / towards the other plate into the attached wire. Correspondingly, the change of the displacement flux behaves like a current!
+For this, also the displacement flux density $D$ has taken into account. Since the ingoing charges get enriched (or depleted) on the capacitor plate, there will be a continuous increase of the displacement flux $\Psi$ (which is directly related to the charge $Q$). The ingoing current $I = {{{\rm d}Q}\over{{\rm d}t}}$ lead to a constant ${{{\rm d}\Psi}\over{{\rm d}t}}$ in the dielectric. As more displacement flux gets created, more charges will be induced on the other plate. This also leads to a current from/towards the other plate into the attached wire. Correspondingly, the change of the displacement flux behaves like a current!
 This current type within the dielectric material is called **displacement current**:
 \begin{align*}
- I_{d} = {{d\Psi}\over{dt}}
+ I_{\rm d} = {{{\rm d}\Psi}\over{{\rm d}t}}
 \end{align*}
-This type of current is different to the previous concept of current, where charges are always continuously moving - the **conduction current**. The conduction current $I_c = {{dQ}\over{dt}}$ obeys a fixed relationship to the voltage (e.g. the Ohm's Law for linear components). The displacement current does not obey such a relation ship, due to the enrichment / depletion of charges. On a plate the conduction current gets converted into displacement current, and vice versa.
+This type of current is different from the previous concept of current, where charges are always continuously moving - the **conduction current**. The conduction current $I_{\rm c} = {{{\rm d}Q}\over{{\rm d}t}}$ obeys a fixed relationship to the voltage (e.g. the Ohm's Law for linear components). The displacement current does not obey such a relationship, due to the enrichment/depletion of charges. On a plate, the conduction current gets converted into displacement current, and vice versa.
-When speaking of electric current, one often cover both types of currents: $I = I_c + I_d$.
+When speaking of electric current, one often covers both types of currents: $I = I_{\rm c} + I_{\rm d}$.
-There is also another important indication, which proves that the displacement current acts like a "charge-free" current: Any current generates a magnetic field around its way through the conductor. This is also true for the displacement current. When extrapolating this into fast alternating displacement flux density this explains the electromagnetic wave. There, the change in the electric field creates a changing magnetic field, which creates a changing electric field, which creates a changing electric field, which ...
+There is also another important indication, which proves that the displacement current acts like a "charge-free" current: Any current generates a magnetic field around its way through the conductor. This is also true for the displacement current. Extrapolating this into fast alternating displacement flux density explains electromagnetic waves. There, the change in the electric field creates a changing magnetic field, which creates a changing electric field, which creates a changing electric field, which ...
 {{youtube>ppWBwZS4e7A}}
@@ Zeile 211: / Zeile 223: @@
 <panel type="info" title="Task 2.2.1 Simulation"> <WRAP group><WRAP column 2%>{{fa>pencil?32}}</WRAP><WRAP column 92%>
-In the simulation program of [[http://www.falstad.com/emstatic-old/|Falstad]] can be represented by equipotential surfaces, electric field strength and current density in different objects.
+The simulation program of [[http://www.falstad.com/emstatic-old/|Falstad]] can show equipotential surfaces, electric field strength, and current density in different objects.
   - Open the simulation program via the link
-  - Select: "Setup: Wire w/ Current" and "Show Current (j)".
+  - Select: ''Setup: Wire w/ Current'' and ''Show Current (j)''.
   - You will now see a finite conductor with charge carriers starting at the top end and arriving at the bottom end.
   - We now want to observe what happens when the conductor is tapered.
-      - To do this, select "Mouse = Clear Square". You can now use the left mouse button to remove parts from the conducting material. The aim should be, that in the middle of the Conductor there is only a one box wide line, on a length of at least 10 boxes. If you want to add conductive material again, this is possible with "Mouse = Add - Conductor".
+      - To do this, select ''Mouse = Clear Square''. You can now use the left mouse button to remove parts from the conducting material. The aim should be, that in the middle of the conductor, there is only a one-box wide line, on a length of at least 10 boxes. If you want to add conductive material again, this is possible with ''Mouse = Add - Conductor''.
       - Consider why more equipotential lines are now accumulating as the conductor is tapered.
-      - If you additionally draw in the E-field with "Show E/j", you will see that it is stronger along the taper. This can be checked with the slider "Brightness". Why is this?
+      - If you additionally draw in the E-field with ''Show E/j'', you will see that it is stronger along the taper. This can be checked with the slider ''Brightness''. Why is this?
-  - Select "Setup: Current in 2D 1", "Show E/rho/j". Why doesn't the cavity behave like a Faraday cage here?
+  - Select ''Setup: Current in 2D 1'', ''Show E/rho/j''. Why doesn't the cavity behave like a Faraday cage here?
 </WRAP></WRAP></panel>
@@ Zeile 226: / Zeile 238: @@
 <panel type="info" title="Task 2.2.2 Water Resistor"> <WRAP group><WRAP column 2%>{{fa>pencil?32}}</WRAP><WRAP column 92%>
-In transformer stations sometimes water resistors are used as {{wp>Liquid rheostat}}. In this resistor the water works as a (poor) conductor which can handle a high power loss.
+In transformer stations sometimes water resistors are used as {{wp>Liquid rheostat}}. In this resistor, the water works as a (poor) conductor which can handle a high power loss.
-The water resistor consists of a water basin. In the given basin two quadratic plates with the edge length of $l = 80 cm$ are inserted with the distance $d$ between them. The resistivity of the water is $\rho = 0.25 \Omega m$. The resistor shall dissipate the energy of $P = 4 kW$ and shall exhibit a homogenious current field.
+The water resistor consists of a water basin. In the given basin two quadratic plates with the edge length of $l = 80 ~{\rm cm}$ are inserted with the distance $d$ between them.
+The resistivity of the water is $\rho = 0.25 ~\Omega {\rm m}$. The resistor shall dissipate the energy of $P = 4 ~{\rm kW}$ and shall exhibit a homogeneous current field.
-  - Calculate the required distance of the plates in order to get a current density of $S = 25 mA/cm^2$
+  - Calculate the required distance of the plates to get a current density of $S = 25 ~{\rm mA/cm^2}$
   - What are the values of the current $I$ and the voltage $U$ at the resistor, such as the internal electric field strength $E$ in the setup?
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