184_notes:examples:week4_tilted_segment

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184_notes:examples:week4_tilted_segment [2017/09/12 23:46] – [Solution] tallpaul184_notes:examples:week4_tilted_segment [2018/06/12 18:49] (current) – [Solution] tallpaul
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-===== Example: A Tilted Segment of Charge =====+[[184_notes:dq|Return to $dQ$]] 
 + 
 +===== A Tilted Segment of Charge =====
 Suppose we have a segment of uniformly distributed charge stretching from the point $\langle 0,0,0 \rangle$ to $\langle 1 \text{ m}, 1 \text{ m}, 0 \rangle$, which has total charge $Q$. We also have a point $P=\langle 2 \text{ m},0,0 \rangle$. Define a convenient $\text{d}Q$ for the segment, and $\vec{r}$ between a point on the segment to the point $P$. Also, give appropriate limits on an integration over $\text{d}Q$ (you don't have to write any integrals, just give appropriate start and end points). First, do this for the given coordinate axes. Second, define a new set of coordinate axes to represent $\text{d}Q$ and $\vec{r}$ in a simpler way and redo. Suppose we have a segment of uniformly distributed charge stretching from the point $\langle 0,0,0 \rangle$ to $\langle 1 \text{ m}, 1 \text{ m}, 0 \rangle$, which has total charge $Q$. We also have a point $P=\langle 2 \text{ m},0,0 \rangle$. Define a convenient $\text{d}Q$ for the segment, and $\vec{r}$ between a point on the segment to the point $P$. Also, give appropriate limits on an integration over $\text{d}Q$ (you don't have to write any integrals, just give appropriate start and end points). First, do this for the given coordinate axes. Second, define a new set of coordinate axes to represent $\text{d}Q$ and $\vec{r}$ in a simpler way and redo.
  
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   * $P=\langle 2 \text{ m},0,0 \rangle$.   * $P=\langle 2 \text{ m},0,0 \rangle$.
  
-===Lacking=== +===Goal=== 
-  * $\text{d}Q$ and $\vec{r}$ +  * Define and explain $\text{d}Q$ and $\vec{r}$ for two sets of coordinate axes.
-  * A new set of coordinate axes +
- +
-===Approximations & Assumptions=== +
-  * The thickness of the segment is infinitesimally small, and we can approximate it as a line segment. +
-  * The total charge is a constant - not discharging.+
  
 ===Representations=== ===Representations===
-  * For the first part, we can draw a set of coordinate axes using what we already know. The first part of the example involves the following orientation:+  * For the first part, we can draw a set of coordinate axes using what we already know. The first part of the example involves the following representation:
 {{ 184_notes:4_tilted_segment.png?350 |Axes with Tilted Segment}} {{ 184_notes:4_tilted_segment.png?350 |Axes with Tilted Segment}}
-  * We can represent $\text{d}Q$ and $\vec{r}$ for our line as follows: 
-{{ 184_notes:4_tilted_segment_dq.png?500 |Tilted Segment dQ Representation}} 
   * For the second part when we define a new set of coordinate axes, it makes sense to line up the segment along an axis. We choose the $y$-axis. We could have chosen the $x$-axis, and arrived at a very similar answer. Whichever you like is fine!   * For the second part when we define a new set of coordinate axes, it makes sense to line up the segment along an axis. We choose the $y$-axis. We could have chosen the $x$-axis, and arrived at a very similar answer. Whichever you like is fine!
 {{ 184_notes:4_tilted_segment_rotated.png?800 |Tilted Segment with New Axes}} {{ 184_notes:4_tilted_segment_rotated.png?800 |Tilted Segment with New Axes}}
  
 ====Solution==== ====Solution====
-In the first set of axes, the segment extends in the $x$ and $y$ directions. A simple calculation of the Pythagorean theorem tells us the total length of the segment is $\sqrt{2} \text{ m}$, so we can define the line charge density $\lambda=Q/\sqrt{2} \text{ m}$. When we define $\text{d}l$, we want it align with the segment, so we can have $\text{d}l=\sqrt{\text{d}x^2+\text{d}y^2}$. Since $x=y$ along the segment, we can simplify a little bit. $\text{d}l=\sqrt{\text{d}x^2+\text{d}x^2}=\sqrt{2}\text{d}x$. Note, that we chose to express in terms of $\text{d}x$, instead of $\text{d}y$. This is completely arbitrary, and the solution would be just as valid the other way. Now, we can write an expression for $\text{d}Q$:+Before we begin, we'll make an approximate to simplify our calculations: 
 +<WRAP TIP> 
 +=== Approximation === 
 +  * The thickness of the segment is infinitesimally smalland we can approximate it as a line segment. 
 +</WRAP> 
 + 
 +We know how to draw $\text{d}Q$ and $\vec{r}$, so we can start with an update to the representation. 
 +{{ 184_notes:4_tilted_segment_dq.png?500 |Tilted Segment dQ Representation}} 
 + 
 +It will also be helpful to see how the dimensions of $\text{d}Q$ break down. Here is how we choose to label it: 
 +{{ 184_notes:4_dq_dimensions.png?200 |Tilted Segment dQ Representation}} 
 + 
 +The segment extends in the $x$ and $y$ directions. A simple calculation of the Pythagorean theorem tells us the total length of the segment is $\sqrt{2} \text{ m}$, so we can define the line charge density $\lambda=Q/\sqrt{2} \text{ m}$. When we define $\text{d}l$, we want it align with the segment, so we can have $\text{d}l=\sqrt{\text{d}x^2+\text{d}y^2}$. Since $x=y$ along the segment, we can simplify a little bit. $\text{d}l=\sqrt{\text{d}x^2+\text{d}x^2}=\sqrt{2}\text{d}x$. Note, that we chose to express in terms of $\text{d}x$, instead of $\text{d}y$. This is completely arbitrary, and the solution would be just as valid the other way. Now, we can write an expression for $\text{d}Q$:
 $$\text{d}Q=\lambda\text{d}l=\frac{\sqrt{2}}{\sqrt{2} \text{ m}}Q\text{d}x=\frac{Q}{1 \text{ m}}\text{d}x$$ $$\text{d}Q=\lambda\text{d}l=\frac{\sqrt{2}}{\sqrt{2} \text{ m}}Q\text{d}x=\frac{Q}{1 \text{ m}}\text{d}x$$
  
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 ---- ----
  
-In the second set of axes, the segment extends only in the $y$ direction. This problem is now very similar to the examples in the notes. The length of the segment is still $\sqrt{2} \text{ m}$, so we can define the line charge density $\lambda=Q/\sqrt{2} \text{ m}$. When we define $\text{d}l$, we want it align with the segment, which is much simpler this time: $\text{d}l=\text{d}y$. Now, we can write an expression for $\text{d}Q$: +In the second set of axes, the segment extends only in the $y$ direction. This problem is now very similar to the examples in the notes. The length of the segment is still $\sqrt{2} \text{ m}$, so we can define the line charge density $\lambda=Q/\sqrt{2} \text{ m}$. When we define $\text{d}l$, we want it align with the segment, which is much simpler this time: $\text{d}l=\text{d}y$. Now, we can
-$$\text{d}Q=\lambda\text{d}l=\frac{Q\text{d}y}{\sqrt{2} \text{ m}}$$ +
-Next, we need $\vec{r}$. We will put it in terms of $y$, just as we did for $\text{d}Q$. The location of $P$ is a little different with this new set of axes. Now, we have $\vec{r}_P=\langle \sqrt{2} \text{ m},\sqrt{2} \text{ m},0 \rangle$, and $\vec{r}_{\text{d}Q}=\langle 0, y, 0 \rangle$. We have enough to write $\vec{r}$: +
-$$\vec{r}=\vec{r}_P-\vec{r}_{\text{d}Q}=\langle \sqrt{2} \text{ m}, \sqrt{2} \text{ m}-y, 0 \rangle$$ +
-FIXME (Match similar wording to that above.) +
-An integration would occur over $y$, which goes from $0$ to $\sqrt{2}$. These would be our limits of integration. +
- +
-Because we picked $\text{d}y$ and $y$ as our variable, which was the natural choice based on how we chose to set up our coordinate axes, we are all set up to integrate over $y$. This means that our limits of integration also have to match the total length that we want to add up //in terms of the $y$ variable//, which goes from $0$ to $\sqrt{2} \text{ m}$. So our limits of integration would be from $0$ to $\sqrt{2} \text{ m}$.+
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