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| 184_notes:examples:week9_detecting_b [2017/10/19 12:42] – [Solution] tallpaul | 184_notes:examples:week9_detecting_b [2021/07/05 21:58] (current) – [Solution] schram45 | ||
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| =====Magnetic Field near a Moving Charge===== | =====Magnetic Field near a Moving Charge===== | ||
| - | You are a collector of magnetic field detectors. A fellow detector collector is trying to trim down her collection, and so it's your job to see if an old detector is still working properly, in which case it's yours! Today, you are a magnetic field detector collector, inspector, and hopefully a selector. First, you run a test in which a charged particle (q=15 nC) is sent through the detector, and you look at the detector' | + | You are a collector of magnetic field detectors. A fellow detector collector is trying to trim down her collection, and so it's your job to see if an old detector is still working properly, in which case it's yours! Today, you are a magnetic field detector collector, inspector, and hopefully a selector. First, you run a test in which a charged particle (q=15 nC) is sent through the detector, and you look at the detector' |
| - | {{ 184_notes: | + | [{{ 184_notes: |
| ===Facts=== | ===Facts=== | ||
| - | * v=2 m/s ˆx | + | * $\vec{v} = 2 \text{ m/s } \hat{x}$ |
| - | * The locations of interest are indicated | + | * The locations of interest are indicated |
| - | * $\vec{r_1} = -0.5 \text{ m } \hat{x}$ | + | * $\vec{r}_1 = -0.5 \text{ m } \hat{x}$ |
| - | * $\vec{r_2} = 0.5 \text{ m } \hat{y}$ | + | * $\vec{r}_2 = 0.5 \text{ m } \hat{y}$ |
| - | * $\vec{r_3} = -0.5 \text{ m } \hat{x} + 0.5 \text{ m } \hat{y}$ | + | * $\vec{r}_3 = -0.5 \text{ m } \hat{x} + 0.5 \text{ m } \hat{y}$ |
| * q=15 nC | * q=15 nC | ||
| Line 16: | Line 18: | ||
| ===Approximations & Assumptions=== | ===Approximations & Assumptions=== | ||
| - | | + | * We are only interested in the B-field at this specific moment in time: As the particle moves some its parameters may change (i.e. velocity, charge...). This assumption gives use fixed variables to work with at this snapshot in time, simplifying down the complexity of the model. |
| - | | + | |
| ===Representations=== | ===Representations=== | ||
| * We represent the Biot-Savart Law for magnetic field from a moving point charge as | * We represent the Biot-Savart Law for magnetic field from a moving point charge as | ||
| →B=μ04πq→v×→rr3 | →B=μ04πq→v×→rr3 | ||
| + | <WRAP TIP> | ||
| + | ===Approximation=== | ||
| + | We must approximate the particle as a point particle in order to use the magnetic field equation above. Since the problem doesn' | ||
| + | </ | ||
| * We represent the situation with diagram given above. | * We represent the situation with diagram given above. | ||
| ====Solution==== | ====Solution==== | ||
| We begin by cracking open the Biot-Savart Law. In order to find magnetic field, we will need to take a cross product →v×→r. Notice that →r indicates a separation vector, directed from source (point particle) to observation (location 1, 2, or 3). Since our source is at the origin of our axes, then the separation vectors are actually just →rsep=→robs−0=→robs, | We begin by cracking open the Biot-Savart Law. In order to find magnetic field, we will need to take a cross product →v×→r. Notice that →r indicates a separation vector, directed from source (point particle) to observation (location 1, 2, or 3). Since our source is at the origin of our axes, then the separation vectors are actually just →rsep=→robs−0=→robs, | ||
| - | \begin{align*} | ||
| - | \vec{v}\times \vec{r}_1 &= 0 \\ | ||
| - | \vec{v}\times \vec{r}_2 &= 1 \text{ m}^2\text{s}^{-1} \hat{z} \\ | ||
| - | \vec{v}\times \vec{r}_3 &= 1 \text{ m}^2\text{s}^{-1} \hat{z} | ||
| - | \end{align*} | ||
| - | Note that the first cross-product is 0 because location 1 is situated perfectly in line with the straight-line path of the particle. There is no magnetic field at location 1 at all! The other two cross-products are the same because locations 2 and 3 are equidistant from this path. Though they are difference distances from the particle itself, the ˆx portion of location 3's separation vector does not contribute at all to the cross-product. | ||
| - | Next, we find the magnitudes of r3, since that is another quantity we need to know in the Biot-Savart Law. | + | Note that for the first cross-product, |
| + | →v×→r1=|→v||→r1|sin(0)=0 | ||
| + | This means there is no magnetic field at Location 1 at all! | ||
| + | |||
| + | For Location 2, the →r2 is perpendicular to the velocity vector →v (the angle between them is 90 degrees). When we take this cross product, then: | ||
| + | →v×→r2=|→v||→r2|sin(90)=2∗0.5∗1=1 m2s−1 ˆz | ||
| + | Note that the ˆz comes from using the right hand rule (or rather from taking the cross product of a vector in the ˆx and a vector in the ˆy). If you point your fingers in the direction of the velocity and curl them toward location 2 your thumb would point out of the page (or in the +ˆx direction). | ||
| + | |||
| + | Finally, for Location 3, we can think about →r3 in terms of it's components - the part that is parallel to the velocity (which would be the same as →r1) and the part that is perpendicular to the velocity (which would be the same as →r2). We just learned if the vectors are parallel, the cross product will give zero - so the horizontal component of →r3 will not contribute to the magnetic field at Location 3. The only part that will contribute will be the vertical component (which is the same as what we just calculated for magnetic field at Location 2). So, we know already that this cross product will give: | ||
| + | |||
| + | →v×→r3=1 m2s−1ˆz | ||
| + | |||
| + | Next, we find the magnitudes of r3, since that is another quantity we need to know in the Biot-Savart Law. Note that even though the cross products were the same for Locations 2 and 3, the separation distances are not! Location 3 is still further away from q when compared to Location 2. | ||
| \begin{align*} | \begin{align*} | ||
| {r_2}^3 &= 0.125 \text{ m}^3 \\ | {r_2}^3 &= 0.125 \text{ m}^3 \\ | ||
| Line 39: | Line 51: | ||
| \end{align*} | \end{align*} | ||
| - | We don't including location 1 above since we already know the magnetic field is 0 at that location! Below, we give the magnetic field at all three locations. | + | We don't including location 1 above since we already know the magnetic field is 0 at that location! Below, we give the magnetic field at all three locations |
| \begin{align*} | \begin{align*} | ||
| - | \vec{B}_1 &= 0 & \\ | + | \vec{B}_1 &= \frac{\mu_0}{4 \pi}\frac{q\vec{v}\times \vec{r}_1}{{r_1}^3} |
| - | \vec{B}_2 &= \frac{\mu_0}{4 \pi}\frac{q\vec{v}\times \vec{r}_2}{{r_2}^3} | + | \vec{B}_2 &= \frac{\mu_0}{4 \pi}\frac{q\vec{v}\times \vec{r}_2}{{r_2}^3} = 12 \text{ nT } \hat{z} \\ |
| - | \vec{B}_3 &= \frac{\mu_0}{4 \pi}\frac{q\vec{v}\times \vec{r}_3}{{r_3}^3} | + | \vec{B}_3 &= \frac{\mu_0}{4 \pi}\frac{q\vec{v}\times \vec{r}_3}{{r_3}^3} = 4.2 \text{ nT } \hat{z} |
| \end{align*} | \end{align*} | ||
| + | |||
| + | Observation location 3 is the furthest away from our moving point charge and we would expect it to have a smaller magnetic field than location 2, this is reflected in our solution. We also expected the magnetic field at location 1 to be 0 since the velocity and separation vector are parallel for this point (this is always a good thing to look for when approaching a problem with cross products). | ||