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Hooking Capacitors Together

Hooking Capacitors Together.

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Hooking Capacitors Together

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  1. Hooking Capacitors Together Instead of making and storing all sizes of capacitors, we can make and store just certain values of capacitors. When we need a non-standard size capacitor, we can make it by hooking two or more standard size capacitors together to make an effective capacitor of the value we need.

  2. Two ways There are two basic ways of connecting two capacitors: series and parallel. In series, we connect capacitors together like railroad cars; using parallel plate capacitors it would look like this: + - + - high V low V C1 C2

  3. Series If we include a battery as the voltage source, the series circuit would look like this: C1 + Vbat C2 Note that there is only one way around the circuit, and you have to jump BOTH capacitors in making the circuit - no choice!

  4. Parallel In a parallel hook-up, there is a branch point that allows you to complete the circuit by jumping over either one capacitor or the other: you have a choice! High V C1 Low V C2

  5. Parallel Circuit If we include a battery, the parallel circuit would look like this: + + + Vbat C1 C2

  6. Formula for Series: To see how capacitors combine to give an effective capacitance when in series, we can look either at C = Q/V, or at Cparallel plate = KA / [4pkd] .

  7. Formula for Series Using C = Q/V, we see that in series the charge moved from capacitor 2’s negative plate must be moved through the battery to capacitor 1’s positive plate. Thus Qtotal = Q1 = Q2. Also, the voltage drop across the two capacitors add to give the total voltage drop: Vtotal = V1 + V2. Thus, Ceff = Qtotal / Vtotal = Qtotal / (V1 + V2), or [1/Ceff] = (V1 + V2) / Qtotal = V1/Q1 + V2/Q2 =1/C1 + 1/C2 = 1/Ceffective .

  8. Capacitors in Series From our formula for series:  1/Ci = 1/Ceffective we see that the effective capacitance will be less than the least of all the capacitors in the series. WHY?

  9. Capacitors in Series Note that the charge moved by the voltage source (battery) is the same as the charged moved on each of the capacitors, including the least (Qtotal = Q1 = Q2). But the voltage across this least capacitor is less than the voltage across the battery (since that voltage is split among all the capacitors Vtotal = V1 + V2). Thus for the effective capacitance (Ceff = Qtotal / Vtotal) we have the same charge that is moved with the largest voltage, giving us the least capacitance!

  10. Formula for Series Using Cparallel plate = KA / [4pkd] , we see that we have to go over both distances, so the distances should add. But the distances are in the denominator, and so the inverses should add. This is just like in C = Q/V where the V’s add and are in the denominator!

  11. Formula for Parallel Capacitors The result for the effective capacitance for a parallel connection is different, but we can start from the same two places: C = Q/V, or Cparallel plate = KA / [4pkd] . For parallel, both plates are across the same voltage, so Vtotal = V1 = V2. The charge can accumulate on either plate, so: Qtotal = Q1 + Q2. Since the Q’s are in the numerator, we have simply: Ceff = C1 + C2.

  12. Formula for Parallel Capacitors If we use the parallel plate capacitor formula, Cparallel plate = KA / [4pkd] , we see that the areas add, and the areas are in the numerator, just as the Q’s were in the numerator in the C = Q/V definition.

  13. Review of Formulas For capacitors in SERIES we have: 1/Ceff = 1/C1 + 1/C2. For capacitors in PARALLEL we have: Ceff = C1 + C2. Note that adding in series gives Ceff being smaller than the smallest, while adding in parallel gives Ceff being larger than the largest!

  14. Computer Homework The Computer Homework, Vol 3, #5, gives both an introduction and problems dealing with capacitors.

  15. Resistance Current is somewhat like fluid flow. Recall that it took a pressure difference to make the fluid flow due to the viscosity of the fluid and the size (area and length) of the pipe. So to in electricity, it takes a voltage difference to make electric current flow due to the resistance in the circuit.

  16. Resistance By experiment we find that if we increase the voltage, we increase the current: V is proportional to I. The constant of proportionality we call the resistance, R: V = I*R Ohm’s Law UNITS:R = V/I so Ohm = Volt / Amp.

  17. Resistance Just as with fluid flow, the amount of resistance does not depend on the voltage (pressure) or the current (volume flow). It does, however, relate the two. The same idea applied to capacitance: the capacitance did not depend on the charge and voltage - the capacitance related the two. As with fluid flow and with capacitance, the amount of resistance depends on the materials and shapes of the wires.

  18. Resistance The resistance depends on material and geometry. For a wire, we have: R = r L / A where r is called the resistivity (in Ohm-m) and measures how hard it is for current to flow through the material, L is the length of the wire, and A is the crossectional area of the wire. Our third lab experiment will deal with Ohm’s Law and the above equation.

  19. Electrical Power The electrical potential energy of a charge is: PE = q*V . Power is the change in energy with respect to time: Power = DPE / Dt . Putting these two concepts together we have: Power = D(qV) / Dt = V(Dq) / Dt = I*V.

  20. Electrical Power Besides this basic equation for power: P = I*V remember we also have Ohm’s Law: V = I*R . Thus we can write the following equations for power: P = I2*R = V2/R = I*V . To see which one gives the most insight, we need to understand what is being held constant.

  21. Example When using batteries, the battery keeps the voltage constant. Each D cell battery supplies 1.5 volts, so four D cell batteries in series (one after the other) will supply a constant 6 volts. When used with four D cell batteries, a light bulb is designed to use 5 Watts of power. What is the resistance of the light bulb?

  22. Example We know V = 6 volts, and P = 5 Watts; we’re looking for R. We have two equations: P = I*V and V = I*R which together have 4 quantities: P, I, V & R.. We know two of these (P & V), so we should be able to solve for the other two.

  23. Example Using the power equation we can solve for I: P = I*V, so 5 Watts = I * (6 volts), or I = 5 Watts / 6 volts = 0.833 amps. Now we can use Ohm’s Law to solve for R: V = I*R, so R = V/I = 6 volts / 0.833 amps = 7.2 W .

  24. Example extended If we wanted a higher power light bulb, should we have a bigger resistance or a smaller resistance for the light bulb? We have two relations for power that involves resistance: P = I2*R and P = V2 / R . (The P=IV does not have R in it at all!) Which one do we use to answer the above question?

  25. Example extended Answer: In this case, the voltage is being held constant due to the nature of the batteries. This means that the current will change as we change the resistance. Thus, the P = V2 / R would be the most straight-forward equation to use. This means that as R goes down, P goes up. The answer: for more power, lower the resistance. This will allow more current to flow at the same voltage, and hence allow more power!

  26. Connecting Resistors There are two basic ways of connecting two resistors: series and parallel. In series, we connect resistors together like railroad cars; this is just like we have for capacitors: + - + - high V low V R1 R2

  27. Formula for Series: To see how resistors combine to give an effective resistance when in series, we can look either at V = I*R, or at R = rL/A .

  28. Formula for Series Using V = I*R, we see that in series the current must move through both resistors. Thus Itotal = I1 = I2. Also, the voltage drop across the two resistors add to give the total voltage drop: Vtotal = V1 + V2. Thus, Reff = Vtotal / Itotal = (V1 + V2)/Itotal, or V1/I1 + V2/I2 = R1 + R2 = Reffective .

  29. Formula for Series Using R = rL/A , we see that we have to go over both lengths, so the lengths should add. The distances are in the numerator, and so the values should add. This is just like in R = V/I where the V’s add and are in the numerator! Note: this is the opposite of capacitors when connected in series!

  30. Formula for Parallel Resistors The result for the effective resistance for a parallel connection is different, but we can start from the same two places: V=I*R, or R = rL/A . For parallel, both resistors are across the same voltage, so Vtotal = V1 = V2. The current can go through either resistor, so: Itotal = I1 + I2. Since the I’s are in the denominator, we have: 1/Reff = 1/R1 + 1/R2.

  31. Formula for Parallel Resistors If we start from R = rL/A , we can see that parallel resistors are equivalent to one resistor with more Area. But A is in the denominator (just like I was in the previous slide), so we need to add the inverses: 1/Reff = 1/R1 + 1/R2 .

  32. Review: Capacitors: Series: 1/Ceff = 1/C1 + 1/C2 Parallel: Ceff = C1 + C2 series gives smallest Ceff, parallel gives largest Ceff. Resistors: Series: Reff = R1 + R2 Parallel: 1/Reff = 1/R1 + 1/R2 series gives largest Reff, parallel gives smallest Ceff.

  33. Computer Homework The Computer Homework, Vol 3, #6, gives both an introduction and problems dealing with resistors.

  34. The RC Circuit What happens when we close the switch (S) in the circuit below? That is, what is I(t) ? C + V R - S

  35. Charging the Capacitor Initially, the battery will “pump” charge onto the positive plate of the capacitor, removing that charge from the negative plate. (Actually, negative electrons will be removed from the positive plate and “pumped” by the battery onto the negative plate.) The resistor will provide a resistance to the movement of this charge.

  36. Qualitative Expectations However, as the capacitor starts to fill up, the charges already on the capacitor will repel the new charges coming from the battery. This should slow the rate of charge being delivered (the current). Q I t t

  37. Getting an equation How do we mathematically model this process? What fundamental equation do we start from?

  38. Conservation of Energy From Conservation of Energy, and from PE = qV, we have the following relation: S Vi = 0 around a closed loop . In our circuit we have three voltage sources: the battery (VB = constant), the capacitor (VC = (1/C)Q [from C = Q/V]), and the resistor (VR = IR [from Ohm’s Law]). VB - (1/C)Q - IR = 0 where I = dQ/dt .

  39. Getting a differential equation VB - (1/C)Q - IR = 0 where I = dQ/dt . This gives a differential equation for Q(t), and then from I=dQ/dt, we can get I(t). R (dQ/dt) + (1/C) Q = VB. This is an inhomogeneous first order differential equation.

  40. The Solution: Q(t) The homogeneous equation: R (dQ/dt) + (1/C)Q = 0 has the solution: QH = Qo e-t/RC . The inhomogeneous equation: R (dQ/dt) + (1/C)Q = VB has the solution: QI = CVB . Therefore we have: Q(t) = CVB + Qoe-t/RC .

  41. Using initial conditions Q(t) = CVB + Qoe-t/RC . To find what Qo is, we look at initial conditions: Q(t=0) = CVB + Qo = 0 (capacitor is initially uncharged). Therefore we have: Qo = -CVB Q(t) = CVB (1 - e-t/RC) . For t very big, this says: Q(t=large) = CVB, or that the capacitor will be fully charged!

  42. The RC Circuit: charging! Q(t) = CVB (1 - e-t/RC) . This means the current is: I(t) = dQ/dt = -CVB(-1/RC) e-t/RC = (VB/R)e-t/RC = Io e-t/RC. The current starts out as if the capacitor were not there (VB=VR=IR), but decays exponentially as the capacitor becomes charged. These two functions are plotted on the next slide, and do indeed graph like we expected earlier! The values used were: V = 24 volts, R = 24,000 W, C = 2 mF .

  43. Q(t) and I(t) for charging an RC circuit

  44. Discharging the Capacitor If we allow the capacitor to become essentially fully charged, what will happen when we discharge the capacitor through a resistor? In this case, we have the same differential equation except we no longer have the inhomogenous term, VB. Thus: Q = Qo e-t/RC.

  45. Solution: Discharging! Q(t) = Qo e-t/RC. The capacitor discharges as a dying (decaying) exponential. Note when t = RC, Q = Qo e-1 = 0.368 Qo . Since C = Q/V, V = (1/C)Q, and since Q discharges exponentially, and C remains constant, we find VC also decreases exponentially:VC = VCoe-t/RC, and VC(t=RC) = 0.368 VCo . We use this fact in the lab experiment on capacitors!

  46. Units From the expression for a discharging capacitor: Q(t) = Qoe-t/RC , we see that the quantity RC must have units of time. Let’s check it out: From Ohms law: V=IR, Ohm=W= Volt/Amp; By definition: C = Q/V, Farad = Coul/Volt. units of RC: W*Farads = [Volt/Amp]*(Coul/Volt) = Coul/Amp = Coul/[Coul/sec] = sec.

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