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I 0 Z = I 0 2 R 2 + ( I 0 X L I 0 X C ) 2 = I 0 R 2 + ( X L X C ) 2 . size 12{I rSub { size 8{0} } Z= sqrt {I rSub { size 8{0} rSup { size 8{2} } } R rSup { size 8{2} } + \( I rSub { size 8{0} } X rSub { size 8{L} } - I rSub { size 8{0} } X rSub { size 8{C} } \) rSup { size 8{2} } } =I rSub { size 8{0} } sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } {}

I 0 size 12{I rSub { size 8{0} } } {} cancels to yield an expression for Z :

Z = R 2 + ( X L X C ) 2 , size 12{Z= sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } {}

which is the impedance of an RLC series AC circuit. For circuits without a resistor, take R = 0 ; for those without an inductor, take X L = 0 size 12{X rSub { size 8{L} } =0} {} ; and for those without a capacitor, take X C = 0 size 12{X rSub { size 8{C} } =0} {} .

The figure shows graphs showing the relationships of the voltages in an RLC circuit to the current. It has five graphs on the left and two graphs on the right. The first graph on the right is for current I versus time t. Current is plotted along Y axis and time is along X axis. The curve is a smooth progressive sine wave. The second graph is on the right is for voltage V R versus time t. Voltage V R is plotted along Y axis and time is along X axis. The curve is a smooth progressive sine wave. The third graph is on the right is for voltage V L versus time t. Voltage V L is plotted along Y axis and time is along X axis. The curve is a smooth progressive cosine wave. The fourth graph is on the right is for voltage V C versus time t. Voltage V C is plotted along Y axis and time t is along X axis. The curve is a smooth progressive cosine wave starting from negative Y axis. The fifth graph shows the voltage V verses time t for the R L C circuit. Voltage V is plotted along Y axis and time t is along X axis. The curve is a smooth progressive sine wave starting from a point near to origin on negative X axis. The first and the fifth graphs are again shown on the right and their amplitudes and phases compared. The current graph is shown to have a lesser amplitude.
This graph shows the relationships of the voltages in an RLC circuit to the current. The voltages across the circuit elements add to equal the voltage of the source, which is seen to be out of phase with the current.

Calculating impedance and current

An RLC series circuit has a 40.0 Ω resistor, a 3.00 mH inductor, and a 5.00 μF capacitor. (a) Find the circuit’s impedance at 60.0 Hz and 10.0 kHz, noting that these frequencies and the values for L and C are the same as in [link] and [link] . (b) If the voltage source has V rms = 120 V size 12{V rSub { size 8{"rms"} } ="120"`V} {} , what is I rms size 12{I rSub { size 8{"rms"} } } {} at each frequency?

Strategy

For each frequency, we use Z = R 2 + ( X L X C ) 2 size 12{Z= sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } {} to find the impedance and then Ohm’s law to find current. We can take advantage of the results of the previous two examples rather than calculate the reactances again.

Solution for (a)

At 60.0 Hz, the values of the reactances were found in [link] to be X L = 1 . 13 Ω size 12{X rSub { size 8{L} } =1 "." "13" %OMEGA } {} and in [link] to be X C = 531 Ω size 12{X rSub { size 8{C} } ="531 " %OMEGA } {} . Entering these and the given 40.0 Ω for resistance into Z = R 2 + ( X L X C ) 2 size 12{Z= sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } {} yields

Z = R 2 + ( X L X C ) 2 = ( 40 . 0 Ω ) 2 + ( 1 . 13 Ω 531 Ω ) 2 = 531 Ω  at 60 . 0 Hz . alignl { stack { size 12{Z= sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } {} #" "= sqrt { \( "40" "." 0` %OMEGA \) rSup { size 8{2} } + \( 1 "." "13" %OMEGA - "531" %OMEGA \) rSup { size 8{2} } } {} # " "="531" %OMEGA " at 60" "." "0 Hz" {}} } {}

Similarly, at 10.0 kHz, X L = 188 Ω size 12{X rSub { size 8{L} } ="188" %OMEGA } {} and X C = 3 . 18 Ω size 12{X rSub { size 8{C} } =3 "." "18" %OMEGA } {} , so that

Z = ( 40 . 0 Ω ) 2 + ( 188 Ω 3 . 18 Ω ) 2 = 190 Ω  at 10 . 0 kHz. alignl { stack { size 12{Z= sqrt { \( "40" "." 0` %OMEGA \) rSup { size 8{2} } + \( "188" %OMEGA - 3 "." "18" %OMEGA \) rSup { size 8{2} } } } {} #" "="190" %OMEGA " at 10" "." "0 kHz" {} } } {}

Discussion for (a)

In both cases, the result is nearly the same as the largest value, and the impedance is definitely not the sum of the individual values. It is clear that X L size 12{X rSub { size 8{L} } } {} dominates at high frequency and X C size 12{X rSub { size 8{C} } } {} dominates at low frequency.

Solution for (b)

The current I rms size 12{I rSub { size 8{"rms"} } } {} can be found using the AC version of Ohm’s law in Equation I rms = V rms / Z size 12{I rSub { size 8{"rms"} } =V rSub { size 8{"rms"} } /Z} {} :

I rms = V rms Z = 120 V 531 Ω = 0 . 226 A size 12{I rSub { size 8{"rms"} } = { {V rSub { size 8{"rms"} } } over {Z} } = { {"120"" V"} over {"531 " %OMEGA } } =0 "." "226"" A"} {} at 60.0 Hz

Finally, at 10.0 kHz, we find

I rms = V rms Z = 120 V 190 Ω = 0 . 633 A size 12{I rSub { size 8{"rms"} } = { {V rSub { size 8{"rms"} } } over {Z} } = { {"120"" V"} over {"190 " %OMEGA } } =0 "." "633"" A"} {} at 10.0 kHz

Discussion for (a)

The current at 60.0 Hz is the same (to three digits) as found for the capacitor alone in [link] . The capacitor dominates at low frequency. The current at 10.0 kHz is only slightly different from that found for the inductor alone in [link] . The inductor dominates at high frequency.

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Resonance in RLC Series ac circuits

How does an RLC circuit behave as a function of the frequency of the driving voltage source? Combining Ohm’s law, I rms = V rms / Z size 12{I rSub { size 8{"rms"} } =V rSub { size 8{"rms"} } /Z} {} , and the expression for impedance Z from Z = R 2 + ( X L X C ) 2 size 12{Z= sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } {} gives

I rms = V rms R 2 + ( X L X C ) 2 . size 12{I rSub { size 8{"rms"} } = { {V rSub { size 8{"rms"} } } over { sqrt {R rSup { size 8{2} } + \( X rSub { size 8{L} } - X rSub { size 8{C} } \) rSup { size 8{2} } } } } } {}

The reactances vary with frequency, with X L size 12{X rSub { size 8{L} } } {} large at high frequencies and X C size 12{X rSub { size 8{C} } } {} large at low frequencies, as we have seen in three previous examples. At some intermediate frequency f 0 size 12{f rSub { size 8{0} } } {} , the reactances will be equal and cancel, giving Z = R size 12{Z=R} {} —this is a minimum value for impedance, and a maximum value for I rms size 12{I rSub { size 8{"rms"} } } {} results. We can get an expression for f 0 size 12{f rSub { size 8{0} } } {} by taking

X L = X C . size 12{X rSub { size 8{L} } =X rSub { size 8{C} } } {}

Substituting the definitions of X L size 12{X rSub { size 8{L} } } {} and X C size 12{X rSub { size 8{C} } } {} ,

2 πf 0 L = 1 2 πf 0 C . size 12{2πf rSub { size 8{0} } L= { {1} over {2πf rSub { size 8{0} } C} } } {}

Solving this expression for f 0 size 12{f rSub { size 8{0} } } {} yields

f 0 = 1 LC , size 12{f rSub { size 8{0} } = { {1} over {2π sqrt { ital "LC"} } } } {}

where f 0 size 12{f rSub { size 8{0} } } {} is the resonant frequency    of an RLC series circuit. This is also the natural frequency at which the circuit would oscillate if not driven by the voltage source. At f 0 size 12{f rSub { size 8{0} } } {} , the effects of the inductor and capacitor cancel, so that Z = R size 12{Z=R} {} , and I rms size 12{I rSub { size 8{"rms"} } } {} is a maximum.

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Source:  OpenStax, College physics for ap® courses. OpenStax CNX. Nov 04, 2016 Download for free at https://legacy.cnx.org/content/col11844/1.14
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