2.6 Capacitors in Series and Parallel

Learning Objectives

Learning Objectives

By the end of this section, you will be able to do the following:

  • Derive expressions for total capacitance in series and in parallel
  • Identify series and parallel parts in the combination of connection of capacitors
  • Calculate the effective capacitance in series and parallel given individual capacitances

Several capacitors may be connected together in a variety of applications. Multiple connections of capacitors act like a single equivalent capacitor. The total capacitance of this equivalent single capacitor depends both on the individual capacitors and how they are connected. There are two simple and common types of connections, called series and parallel, for which we can easily calculate the total capacitance. Certain more complicated connections can also be related to combinations of series and parallel.

Capacitance in Series

Capacitance in Series

Figure 2.26(a) shows a series connection of three capacitors with a voltage applied. As for any capacitor, the capacitance of the combination is related to charge and voltage by C=QV.C=QV. size 12{C= { {Q} over {V} } } {}

Note in Figure 2.26 that opposite charges of magnitude QQ size 12{Q} {} flow to either side of the originally uncharged combination of capacitors when the voltage VV size 12{V} {} is applied. Conservation of charge requires that equal-magnitude charges be created on the plates of the individual capacitors, since charge is only being separated in these originally neutral devices. The end result is that the combination resembles a single capacitor with an effective plate separation greater than that of the individual capacitors alone (see Figure 2.26(b)). Larger plate separation means smaller capacitance. It is a general feature of series connections of capacitors that the total capacitance is less than any of the individual capacitances.

When capacitors are connected in series, an equivalent capacitor would have a plate separation that is greater than that of any individual capacitor. Hence the series connections produce a resultant capacitance less than that of the individual capacitors.
Figure 2.26 (a) Capacitors connected in series. The magnitude of the charge on each plate is Q . Q . (b) An equivalent capacitor has a larger plate separation d.d. size 12{d} {} Series connections produce a total capacitance that is less than that of any of the individual capacitors.

We can find an expression for the total capacitance by considering the voltage across the individual capacitors shown in Figure 2.26. Solving C=QVC=QV size 12{C= { {Q} over {V} } } {} for VV size 12{V} {} gives V=QC.V=QC. size 12{V= { {Q} over {C} } } {} The voltages across the individual capacitors are thus V1=QC1,V1=QC1, size 12{ {V} rSub { size 8{1} } = { {Q} over { {C} rSub { size 8{1} } } } } {} V2=QC2,V2=QC2, size 12{ {V} rSub { size 8{2} } = { {Q} over { {C} rSub { size 8{2} } } } } {} and V3=QC3.V3=QC3. size 12{ {V} rSub { size 8{3} } = { {Q} over { {C} rSub { size 8{3} } } } } {} The total voltage is the sum of the individual voltages.

2.60 V=V1+V2+V3V=V1+V2+V3 size 12{V= {V} rSub { size 8{1} } + {V} rSub { size 8{2} } + {V} rSub { size 8{3} } } {}

Now, calling the total capacitance CSCS size 12{C rSub { size 8{S} } } {} for series capacitance, consider that

2.61 V = Q C S = V 1 + V 2 + V 3 . V = Q C S = V 1 + V 2 + V 3 . size 12{V= { {Q} over { {C} rSub { size 8{S} } } } = {V} rSub { size 8{1} } + {V} rSub { size 8{2} } + {V} rSub { size 8{3} } } {}

Entering the expressions for V1,V1, size 12{V rSub { size 8{1} } } {} V2,V2, size 12{V rSub { size 8{2} } } {} and V3,V3, size 12{V rSub { size 8{3} } } {} we get

2.62 QCS=QC1+QC2+QC3.QCS=QC1+QC2+QC3. size 12{ { {Q} over { {C} rSub { size 8{S} } } } = { {Q} over { {C} rSub { size 8{1} } } } + { {Q} over { {C} rSub { size 8{2} } } } + { {Q} over { {C} rSub { size 8{3} } } } } {}

Canceling the QQ size 12{Q} {}s, we obtain the equation for the total capacitance in series CSCS size 12{ {C} rSub { size 8{S} } } {} to be

2.63 1CS=1C1+1C2+1C3+...,1CS=1C1+1C2+1C3+..., size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {1} over { {C} rSub { size 8{1} } } } + { {1} over { {C} rSub { size 8{2} } } } + { {1} over { {C} rSub { size 8{3} } } } + "." "." "." } {}

where “...” indicates that the expression is valid for any number of capacitors connected in series. An expression of this form always results in a total capacitance CSCS size 12{ {C} rSub { size 8{S} } } {} that is less than any of the individual capacitances C1,C1, size 12{ {C} rSub { size 8{1} } } {} C2,C2, size 12{ {C} rSub { size 8{2} } } {} ..., as the next example illustrates.

Total Capacitance in Series, C s C s size 12{ {C} rSub { size 8{S} } } {}

Total capacitance in series: 1CS=1C1+1C2+1C3+...1CS=1C1+1C2+1C3+... size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {1} over { {C} rSub { size 8{1} } } } + { {1} over { {C} rSub { size 8{2} } } } + { {1} over { {C} rSub { size 8{3} } } } + "." "." "." } {}

Example 2.9 What Is the Series Capacitance?

Find the total capacitance for three capacitors connected in series, given their individual capacitances are 1.000, 5.000, and 8.000 µF.µF. size 12{mF} {}

Strategy

With the given information, the total capacitance can be found using the equation for capacitance in series.

Solution

Entering the given capacitances into the expression for 1CS1CS size 12{ { {1} over { {C} rSub { size 8{S} } } } } {} gives 1CS=1C1+1C2+1C3.1CS=1C1+1C2+1C3. size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {1} over { {C} rSub { size 8{1} } } } + { {1} over { {C} rSub { size 8{2} } } } + { {1} over { {C} rSub { size 8{3} } } } } {}

2.64 1 C S = 1 1 . 000 µF + 1 5 . 000 µF + 1 8 . 000 µF = 1 . 325 µF . 1 C S = 1 1 . 000 µF + 1 5 . 000 µF + 1 8 . 000 µF = 1 . 325 µF . size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {1} over {1 "." "00" mF} } + { {1} over {5 "." "00" mF} } + { {1} over {8 "." "00" mF} } = { {1 "." "325"} over {mF} } } {}

Inverting to find CSCS size 12{C rSub { size 8{S} } } {} yields {}CS=µF1.325=0.755 µF.CS=µF1.325=0.755 µF. size 12{ {C} rSub { size 8{S} } = { {mF} over {1 "." "325"} } =0 "." "755" mF} {}

Discussion

The total series capacitance CsCs size 12{ {C} rSub { size 8{S} } } {} is less than the smallest individual capacitance, as promised. In series connections of capacitors, the sum is less than the parts. In fact, it is less than any individual. Note that it is sometimes possible, and more convenient, to solve an equation like the above by finding the least common denominator, which in this case—showing only whole-number calculations—is 40. Thus,

2.65 1CS=4040 µF+840 µF+540 µF=5340 µF,1CS=4040 µF+840 µF+540 µF=5340 µF, size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {"40"} over {"40" mF} } + { {8} over {"40" mF} } + { {5} over {"40" mF} } = { {"53"} over {"40" mF} } } {}

so that

2.66 CS=40 µF53=0.755 µF.CS=40 µF53=0.755 µF. size 12{ {C} rSub { size 8{S} } = { {"40" µF} over {"53"} } =0 "." "755" µF} {}

Capacitors in Parallel

Capacitors in Parallel

Figure 2.27(a) shows a parallel connection of three capacitors with a voltage applied. Here the total capacitance is easier to find than in the series case. To find the equivalent total capacitance Cp,Cp, size 12{ {C} rSub { size 8{p} } } {} we first note that the voltage across each capacitor is V,V, size 12{V} {} the same as that of the source, since they are connected directly to it through a conductor. Conductors are equipotentials, and so the voltage across the capacitors is the same as that across the voltage source. Thus the capacitors have the same charges on them as they would have if connected individually to the voltage source. The total charge QQ size 12{Q} {} is the sum of the individual charges.

2.67 Q=Q1+Q2+Q3Q=Q1+Q2+Q3 size 12{Q= {Q} rSub { size 8{1} } + {Q} rSub { size 8{2} } + {Q} rSub { size 8{3} } } {}
Part a of the figure shows three capacitors connected in parallel to each other and to the applied voltage. The total capacitance when they are connected in parallel is simply the sum of the individual capacitances. Part b of the figure shows the larger equivalent plate area of the capacitors connected in parallel, which in turn can hold more charge than the individual capacitors.
Figure 2.27 (a) Capacitors in parallel. Each is connected directly to the voltage source just as if it were all alone, and so the total capacitance in parallel is just the sum of the individual capacitances. (b) The equivalent capacitor has a larger plate area and can therefore hold more charge than the individual capacitors.

Using the relationship Q=CV,Q=CV, size 12{Q= ital "CV"} {} we see that the total charge is Q=CpV,Q=CpV, size 12{Q= {C} rSub { size 8{p} } V} {} and the individual charges are Q1=C1V,Q1=C1V, size 12{ {Q} rSub { size 8{1} } = {C} rSub { size 8{1} } V} {}Q2=C2V,Q2=C2V, size 12{ {Q} rSub { size 8{2} } = {C} rSub { size 8{2} } V} {} and Q3=C3V.Q3=C3V. size 12{ {Q} rSub { size 8{3} } = {C} rSub { size 8{3} } V} {} Entering these into the previous equation gives

2.68 CpV=C1V+C2V+C3V.CpV=C1V+C2V+C3V. size 12{ {C} rSub { size 8{p} } V= {C} rSub { size 8{1} } V+ {C} rSub { size 8{2} } V+ {C} rSub { size 8{3} } V} {}

Canceling VV size 12{V} {} from the equation, we obtain the equation for the total capacitance in parallel Cp.Cp. size 12{C rSub { size 8{p} } } {}

2.69 Cp=C1+C2+C3+....Cp=C1+C2+C3+.... size 12{ {C} rSub { size 8{p} } = {C} rSub { size 8{1} } + {C} rSub { size 8{2} } + {C} rSub { size 8{3} } + "." "." "." } {}

Total capacitance in parallel is simply the sum of the individual capacitances. Again the “...” indicates the expression is valid for any number of capacitors connected in parallel. So, for example, if the capacitors in the example above were connected in parallel, their capacitance would be

2.70 Cp=1.000 µF+5.000 µF+8.000 µF=14.000 µF.Cp=1.000 µF+5.000 µF+8.000 µF=14.000 µF. size 12{ {C} rSub { size 8{p} } =1 "." "00" µF+5 "." "00" µF+8 "." "00" µF="14" "." 0 µF} {}

The equivalent capacitor for a parallel connection has an effectively larger plate area and, thus, a larger capacitance, as illustrated in Figure 2.27(b).

Total Capacitance in Parallel, CpCp size 12{C rSub { size 8{p} } } {}

Total capacitance in parallel Cp=C1+C2+C3+...Cp=C1+C2+C3+... size 12{ {C} rSub { size 8{p} } = {C} rSub { size 8{1} } + {C} rSub { size 8{2} } + {C} rSub { size 8{3} } + "." "." "." } {}

More complicated connections of capacitors can sometimes be combinations of series and parallel (see Figure 2.28). To find the total capacitance of such combinations, we identify series and parallel parts, compute their capacitances, and then find the total.

The first figure has two capacitors, C sub1 and C sub2 in series and the third capacitor C sub 3 is parallel to C sub 1 and C sub 2. The second figure shows C sub S, the equivalent capacitance of C sub 1 and C sub 2, in parallel to C sub 3. The third figure represents the total capacitance of C sub S and C sub 3.
Figure 2.28 (a) This circuit contains both series and parallel connections of capacitors. See Example 2.10 for the calculation of the overall capacitance of the circuit. (b) C1C1 size 12{ {C} rSub { size 8{1} } } {} and C2C2 size 12{ {C} rSub { size 8{2} } } {} are in series; their equivalent capacitance CSCS size 12{ {C} rSub { size 8{S} } } {} is less than either of them. (c) Note that CSCS size 12{ {C} rSub { size 8{S} } } {} is in parallel with C3.C3. size 12{ {C} rSub { size 8{3} } } {} The total capacitance is, thus, the sum of CSCS size 12{ {C} rSub { size 8{S} } } {} and C3.C3. size 12{ {C} rSub { size 8{3} } } {}

Example 2.10 A Mixture of Series and Parallel Capacitance

Find the total capacitance of the combination of capacitors shown in Figure 2.28. Assume the capacitances in Figure 2.28 are known to three decimal places (C1=1.000 µF,(C1=1.000 µF, C2=5.000 µF,C2=5.000 µF, and C3=8.000 µF),C3=8.000 µF), and round your answer to three decimal places.

Strategy

To find the total capacitance, we first identify which capacitors are in series and which are in parallel. Capacitors C1C1 size 12{ {C} rSub { size 8{1} } } {} and C2C2 size 12{ {C} rSub { size 8{2} } } {} are in series. Their combination, labeled CSCS size 12{ {C} rSub { size 8{S} } } {} in the figure, is in parallel with C3.C3. size 12{ {C} rSub { size 8{3} } } {}

Solution

Since C1C1 size 12{ {C} rSub { size 8{1} } } {} and C2C2 size 12{ {C} rSub { size 8{2} } } {} are in series, their total capacitance is given by 1CS=1C1+1C2+1C3.1CS=1C1+1C2+1C3. size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {1} over { {C} rSub { size 8{1} } } } + { {1} over { {C} rSub { size 8{2} } } } + { {1} over { {C} rSub { size 8{3} } } } } {} Entering their values into the equation gives

2.71 1 C S = 1 C 1 + 1 C 2 = 1 1 . 000 μF + 1 5 . 000 μF = 1 . 200 μF . 1 C S = 1 C 1 + 1 C 2 = 1 1 . 000 μF + 1 5 . 000 μF = 1 . 200 μF . size 12{ { {1} over { {C} rSub { size 8{S} } } } = { {1} over { {C} rSub { size 8{1} } } } + { {1} over { {C} rSub { size 8{2} } } } = { {1} over {1 "." "000"" μF"} } + { {1} over {5 "." "000"" μF"} } = { {1 "." "200"} over {"μF"} } } {}

Inverting gives

2.72 CS=0.833 µF.CS=0.833 µF. size 12{ {C} rSub { size 8{S} } =0 "." "833" µF} {}

This equivalent series capacitance is in parallel with the third capacitor; thus, the total is the sum.

2.73 C tot = C S + C S = 0 . 833 μF + 8 . 000 μF = 8 . 833 μF C tot = C S + C S = 0 . 833 μF + 8 . 000 μF = 8 . 833 μF alignl { stack { size 12{C rSub { size 8{"tot"} } =C rSub { size 8{S} } +C rSub { size 8{S} } } {} # =0 "." "833"" μF "+ 8 "." "000"" μF" {} # =8 "." "833"" μF" {} } } {}

Discussion

This technique of analyzing the combinations of capacitors piece by piece until a total is obtained can be applied to larger combinations of capacitors.