1 / 18

Electric Potential and Capacitance

Electric Potential and Capacitance. Electric Potential and Work. So far, we have kept all our charges still When an object moves in an electric field, it will experience a change in energy- kinetic, potential Unless its movement is perpendicular to the field, there will be a U U=-W E

knox
Download Presentation

Electric Potential and Capacitance

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Electric Potential and Capacitance

  2. Electric Potential and Work • So far, we have kept all our charges still • When an object moves in an electric field, it will experience a change in energy- kinetic, potential • Unless its movement is perpendicular to the field, there will be a U • U=-WE • The change in potential energy is the work done by the electric force • Just like we discussed with gravity! • And it’s scalar (hooray)

  3. Electric Potential Energy and Work • Remember work? • W=Fd • W=Fer and FE=qE • W=qEr • So U=-qEr • What’s with the -? • When the field does work, there is a loss of potential energy • If you put in work through an external source, you can move an object in an electric field against its natural motion and thereby give it potential energy

  4. Electric Potential Energy and Work What if the source charge were negative?

  5. Electric Potential Energy and Work What if you move a charge at an angle to the electric field?

  6. Electric Potential Energy Example • A positive charge, +q, moves from position A to position B in a uniform electric field E. What is its change in electric potential energy? Let’s draw… B r  A FE

  7. Solution: U • If you break up the movement into components, ry and rx, the ry component does not change the U since it is perpendicular to the force (remember this from WORK). Only rx component does work and thus changes the U. • U=-WE=-qEd where d=rx (only the component that moves parallel to the force) rx B r ry  A FE

  8. U: similar to gravity • Like in gravity- U is a way of rating a position in an electric field • Path independent • Depends on distance (like height) • Depends on amount of charge (like mass • In gravity: U=mgh • In electrostatics, we have one more thing to consider- just like g accounts for the source (earth) and m takes into account the object we need to account for the source and test charge

  9. Electric Potential • If we, instead of moving one test charge in an electric field, move 2,3, or even 10 charges, the potential energy change will be 2,3, or 10 times as high • Helpful to deal instead with the potential per unit charge

  10. Electric Potential • Electric Potential=V (often called voltage) • Unit is the volt (V) • V= U/q • (electric potential energy per unit charge) • If we assume that V 0 as r ∞ • Then we can say V=kQ/r • And it’s scalar (hooray) • Check green sheet- it’s written there but you have to find it!

  11. Equipotential Surface:Dashed lines represent places where a test charge would feel the same force

  12. Electric Potential Energy vs. Electric Potential (Voltage) • If you rub a balloon in your hair, you can give it a negative charge- up to several thousand volts!!! • However, there is not a lot of energy involved because the charge is small- around one millionth of a C so the potential energy is only about a thousandth of a Joule

  13. Electric Potential Problem • Let Q=2 x 10-9C. What is the potential at a point, P, that is 2cm from Q? • V=kQ/r • V=(9 x 109)(2 x 10-9)/(0.02)= 900V

  14. Potential Differences and movement of charges • When a potential difference exists, charges will FLOW • To get a continuous flow, you need to maintain the potential difference- eg through a battery connected with conducting wires • If we set up our parallel plates again, we can create a potential difference. If we connect the plates with a conductor, the charges will flow • What if we separate our plates with an insulator instead?

  15. If an insulating material (dialectric) is placed between the plates, you can store static charges to a higher concentration Capacitor

  16. Capacitance • Capacitance (C) of a capacitor is how much charge it can store: • C=Q/V • Or the ratio of the charge on one plate to the potential difference between them • Constant for each capacitor so as the charge, Q, builds- the voltage difference increases • Unit = farad (F)

  17. Capacitance • OR: for parallel plates C=ε0A/d • Where ε0 is a new constant: vacuum permitivity • A is the area of the plates • D is the separation between plates • So capacitance is directly related to the area of plates • Inversely related to their separation

  18. Why capacitors? • Sometimes you want to build up more charge and discharge it all at once instead of continuously • Example: camera flash

More Related