Differences

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--- 184_notes:linecharge [2021/02/13 19:13] – [Putting it together] bartonmo
+++ 184_notes:linecharge [2021/07/22 18:17] (current) – schram45
@@ Line 46: / Line 46: @@
  $\vec{E}=\int\frac{1}{4\pi\epsilon_0}\frac{Q}{L}\frac{dx}{(\frac{L}{2}+d-x)^2}\hat{x}$
-The final piece that we need to add is limits to the integral. Since the piece of tape stretches from  $-\frac{L}{2}$  to  $\frac{L}{2}$ , this means that the limits on the integral should also go from  $-\frac{L}{2}$  to  $\frac{L}{2}$  - conceptually this means that we want to add up the little bits of charge __only__ along the length of the line. This gives us a final integral of:
+The final piece that we need to add is limits to the integral. Since the piece of tape stretches from  $-\frac{L}{2}$  to  $\frac{L}{2}$ , this means that the limits on the integral should also go from  $-\frac{L}{2}$  to  $\frac{L}{2}$  - conceptually this means that we want to add up the little bits of charge //only// along the length of the line. **This gives us a final integral of:**
  $\vec{E}=\int_{-\frac{L}{2}}^{\frac{L}{2}}\frac{1}{4\pi\epsilon_0}\frac{Q}{L}\frac{dx}{(\frac{L}{2}+d-x)^2}\hat{x}$
@@ Line 52: / Line 52: @@
 ==== Examples ====
-[[:184_notes:examples:Week4_charge_ring|Electric Field from a Ring of Charge]]
+  * [[:184_notes:examples:Week4_charge_ring|Electric Field from a Ring of Charge]]
+    * Video Example: Electric Field from a Ring of Charge
+  * [[:184_notes:examples:Week4_charge_cylinder|Super Challenge Problem: Electric field from a Cylinder of Charge]]
+    * Video Example: Electric Field from a Cylinder of Charge
+{{youtube>I6cqhqIdG7A?large}}
+{{youtube>LeIp7rrwchw?large}}
 /*[[:184_notes:examples:Week4_charge_cylinder|Super Challenge Problem: Electric field from a Cylinder of Charge]]*/