Unterschiede
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| Beide Seiten der vorigen Revision Vorhergehende Überarbeitung Nächste Überarbeitung | Vorhergehende Überarbeitung | ||
| electrical_engineering_and_electronics_1:block16 [2025/11/22 15:43] – mexleadmin | electrical_engineering_and_electronics_1:block16 [2025/11/23 12:21] (aktuell) – mexleadmin | ||
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| Zeile 33: | Zeile 33: | ||
| ===== Generalization of the Magnetic Field Strength ===== | ===== Generalization of the Magnetic Field Strength ===== | ||
| - | So far, only the rotational symmetric problem | + | So far, only the rotational symmetric problem |
| \begin{align*} | \begin{align*} | ||
| Zeile 43: | Zeile 43: | ||
| \begin{align*} | \begin{align*} | ||
| - | U = E \cdot s \quad \quad | \quad \text{applies to capacitor only} | + | U = E \cdot s \quad \quad | \quad \text{applies to plate capacitor only} |
| \end{align*} | \end{align*} | ||
| Zeile 72: | Zeile 72: | ||
| Another new quantity is introduced: the **magnetic voltage $\theta$**: | Another new quantity is introduced: the **magnetic voltage $\theta$**: | ||
| - The magnetic voltage $\theta$ is the magnetic potential difference on a closed path. | - The magnetic voltage $\theta$ is the magnetic potential difference on a closed path. | ||
| - | - Since the magnetic voltage $\theta$ is valid for exactly __one turn__ along our single wire, $\theta$ is also equal to the current through the wire: \\ \begin{align*} \theta = \oint \vec{H} {\rm d}\vec{s} = I \end{align*} | + | - Since the magnetic voltage $\theta$ is valid for exactly __one turn__ along our single wire, $\theta$ is also equal to the current through the wire: \\ \begin{align*} \theta = H \cdot s = I |
| - The magnetic potential difference can take a fraction or a multiple of one turn and is therefore | - The magnetic potential difference can take a fraction or a multiple of one turn and is therefore | ||
| + | - The magnetic voltage is generalized in the following box. | ||
| <callout icon=" | <callout icon=" | ||
| - | In general: | + | The path integral of the magnetic field strength along an arbitrary closed path is equal to the free currents (= current density) through the surface enclosed by the path. |
| The magnetic voltage $\theta$ (and therefore the current) is the cause of the magnetic field strength. \\ | The magnetic voltage $\theta$ (and therefore the current) is the cause of the magnetic field strength. \\ | ||
| - | |||
| - | From the chapter [[block15]] the general representation of the current through a surface is known. \\ | ||
| This leads to the **{{wp> | This leads to the **{{wp> | ||
| - | <WRAP group>< | + | | \begin{align*} \boxed{\oint_{s} \vec{H} {\rm d} \vec{s} = \theta } \end{align*}| The magnetic voltage $\theta$ can be given as \\ (nbsp)(nbsp) • $\theta = I \quad \quad \quad \ $ for a single conductor \\ (nbsp)(nbsp) • $\theta = N \cdot I \quad \:\; \, $ for a coil\\ |
| - | \begin{align*} | + | The unit of the magnetic voltage $\theta$ is **Ampere** (or **Ampere-turns**). |
| - | \oint_{s} \vec{H} \cdot {\rm d} \vec{s} = \iint_A \; \vec{S} {\rm d}\vec{A} = \theta | + | |
| - | \end{align*} | + | |
| - | </ | + | In the english literature the magnetic voltage |
| - | The magnetic voltage | + | |
| - | | + | |
| - | | + | |
| - | * $\theta = \sum_n \cdot I_n \quad$ for multiple conductors | + | |
| - | * $\theta = \iint_A \; \vec{S} {\rm d}\vec{A}$ for spatial distribution | + | |
| - | </ | + | |
| - | ${\rm d}\vec{s}$ and ${\rm d}\vec{A}$ build a right-hand system: once the thumb of the right hand is pointing along ${\rm d}\vec{A}$, the fingers of the right hand show the correct direction for ${\rm d}\vec{s}$ for positive $\vec{H}$ and $\vec{S}$ | + | </ |
| + | <callout icon=" | ||
| + | ${\rm d}\vec{s}$ and ${\rm d}\vec{A}$ in $\oint_{s} \vec{H} {\rm d} \vec{s} = \theta = \iint_A \; \vec{S} | ||
| + | - Once the thumb of the right hand is pointing along ${\rm d}\vec{A}$, the fingers of the right hand show the correct direction for ${\rm d}\vec{s}$ for positive $\vec{H}$ and $\vec{S}$ | ||
| + | - Currents into the direction of the right hand's thumb count positive. Currents antiparallel to it count negative. | ||
| < | < | ||
| Zeile 109: | Zeile 103: | ||
| </ | </ | ||
| + | ~~PAGEBREAK~~ ~~CLEARFIX~~ | ||
| + | ==== Recap of the fieldline images ==== | ||
| + | <WRAP group>< | ||
| + | === longitudinal coil === | ||
| + | < | ||
| + | < | ||
| + | {{url> | ||
| + | </ | ||
| + | A longitudinal coil can be seen in <imgref BildNr04> | ||
| + | The magnetic field in a toroidal coil is often considered as homogenious in the inner volume, when the length $l$ is much larger than the diameter: $l \gg d$. \\ | ||
| + | With a given number $N$ of windings, the magnetic field strength $H$ is | ||
| + | \begin{align*} | ||
| + | \theta = H \cdot l = N \cdot I | ||
| + | \end{align*} | ||
| + | \begin{align*} | ||
| + | \boxed{H = {{N \cdot I}\over{l}}} | ||
| + | \end{align*} | ||
| + | |||
| + | </ | ||
| + | === toroidal coil === | ||
| + | < | ||
| + | < | ||
| + | {{url> | ||
| + | </ | ||
| + | |||
| + | A toroidal coil has a donut-like setup. This can be seen in <imgref BildNr05> | ||
| + | The toroidal coil is often defined by: | ||
| + | * The minor radius $r$: The radius | ||
| + | * The major radius $R$: The distance from the center of the entire toroid (the center of the hole) to the center of the circular cross-section of the coil. | ||
| + | For reasons of symmetry, it shall get clear that the field lines form concentric circles. \\ | ||
| + | Also the magnetic field strength $H$ in a toroidal coil is often considered as homogenious, | ||
| + | |||
| + | \begin{align*} | ||
| + | \theta = H \cdot 2\pi R = N \cdot I | ||
| + | \end{align*} | ||
| + | \begin{align*} | ||
| + | \boxed{H = {{N \cdot I}\over{2\pi R}}} \biggr | _\text{toroidal coil} | ||
| + | \end{align*} | ||
| + | |||
| + | </ | ||
| Zeile 118: | Zeile 152: | ||
| ===== Exercises ===== | ===== Exercises ===== | ||
| - | ==== Worked examples ==== | ||
| - | ... | + | <panel type=" |
| + | |||
| + | < | ||
| + | < | ||
| + | </ | ||
| + | {{drawio> | ||
| + | </ | ||
| + | |||
| + | Given are the adjacent closed trajectories in the magnetic field of current-carrying conductors (see <imgref BildNr05> | ||
| + | |||
| + | In each case, the magnetic potential difference $V_{\rm m}$ along the drawn path is sought. | ||
| + | |||
| + | |||
| + | # | ||
| + | |||
| + | * The magnetic potential difference is given as the **sum of the current through the area within a closed path**. | ||
| + | * The direction of the current and the path have to be considered with the righthand rule. | ||
| + | |||
| + | # | ||
| + | |||
| + | # | ||
| + | a) $V_{\rm m,a} = - I_1 = - 2~\rm A$ \\ | ||
| + | # | ||
| + | |||
| + | # | ||
| + | b) $V_{\rm m,b} = - I_2 = - 4.5~\rm A$ \\ | ||
| + | # | ||
| + | |||
| + | # | ||
| + | c) $V_{\rm m,c} = 0 $ \\ | ||
| + | # | ||
| + | |||
| + | # | ||
| + | d) $V_{\rm m,d} = + I_1 - I_2 = 2~\rm A - 4.5~\rm A = - 2.5~\rm A$ \\ | ||
| + | # | ||
| + | |||
| + | # | ||
| + | e) $V_{\rm m,e} = + I_1 = + 2~\rm A$ \\ | ||
| + | # | ||
| + | |||
| + | # | ||
| + | f) $V_{\rm m,f} = 2 \cdot (- I_1) = - 4~\rm A$ \\ | ||
| + | # | ||
| + | |||
| + | </ | ||
| + | |||
| + | {{page> | ||
| + | {{page> | ||
| + | {{page> | ||
| ===== Embedded resources ===== | ===== Embedded resources ===== | ||