# 15.5: Power in an AC Circuit

- Page ID
- 4445

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

- Describe how average power from an ac circuit can be written in terms of peak current and voltage and of rms current and voltage
- Determine the relationship between the phase angle of the current and voltage and the average power, known as the power factor

A circuit element dissipates or produces power according to \(P = IV\), where **I** is the current through the element and \(V\) is the voltage across it. Since the current and the voltage both depend on time in an ac circuit, the instantaneous power \(p(t) = i(t)v(t)\) is also time dependent. A plot of \(p(t)\) for various circuit elements is shown in Figure \(\PageIndex{1}\). For a resistor, \(i(t)\) and \(v(t)\) are in phase and therefore always have the same sign. For a capacitor or inductor, the relative signs of \(i(t)\) and \(v(t)\) vary over a cycle due to their phase differences. Consequently, \(p(t)\) is positive at some times and negative at others, indicating that capacitive and inductive elements produce power at some instants and absorb it at others.

Because instantaneous power varies in both magnitude and sign over a cycle, it seldom has any practical importance. What we’re almost always concerned with is the power averaged over time, which we refer to as the **average power**. It is defined by the time average of the instantaneous power over one cycle:

\[P_{ave} = \dfrac{1}{T} \int_0^T p(t)dt, \label{eq41}\]

where \(T = 2\pi/\omega\) is the period of the oscillations. With the substitutions \(v(t) = V_0 \, \sin \, \omega t\) and \(i(t) = I_0 \, \sin \, (\omega t - \phi)\), Equation \ref{eq41} becomes

\[P_{ave} = \dfrac{I_0V_0}{T} \int_0^T \sin \, (\omega t - \phi) \, \sin \, \omega t \, dt. \nonumber\]

Using the trigonometric difference identity

\[\sin \, (A - B) = \sin \, A \, \cos \, B - \sin \, B \, \cos \, A \nonumber\]

we obtain

\[P_{ave} = \dfrac{I_0V_0 \, \cos \, \phi}{T} \int_0^T \sin^2 \omega t \, dt - \dfrac{I_0V_0 \, \sin \, \phi}{T} \int_0^T \sin \omega t \, \cos \, \omega t \, dt. \nonumber\]

Evaluation of these two integrals yields

\[\dfrac{1}{T} \int_0^T \sin^2 \omega t \, dt = \frac{1}{2} \nonumber\]

and

\[\dfrac{1}{T} \int_0^T \sin \omega t \, \cos \, \omega t \, dt = 0. \nonumber\]

Hence, the average power associated with a circuit element is given by

\[\boxed {P_{\mathrm{ave}}=\frac{1}{2} I_{0} V_{0} \cos \phi.} \label{eq5}\]

In engineering applications, \(\cos \phi\) is known as the **power factor**, which is the amount by which the power delivered in the circuit is less than the theoretical maximum of the circuit due to voltage and current being out of phase. For a resistor, \(\phi = 0\), so the average power dissipated is

\[P_{ave} = \dfrac{1}{2}I_0V_0. \label{eq6}\]

A comparison of \(p(t)\) and \(P_{ave}\) is shown in Figure \(\PageIndex{1d}\). To make Equation \ref{eq6} look like its dc counterpart, we use the rms values \(I_{rms}\) and \(V_{rms}\) of the current and the voltage. By definition, these are

\[I_{rms} = \sqrt{i_{ave}^2} \]

and

\[V_{rms} = \sqrt{v_{ave}^2},\]

where

\[t_{ave}^2 = \dfrac{1}{T} \int_0^T i^2(t)dt \]

and

\[v_{ave}^2 = \dfrac{1}{T} \int_0^T v^2(t)dt.\]

With \(i(t) = I_0 \, \sin \, (\omega t - \phi) \) and \(v(t) = V_0 \, \sin \, \omega t\), we obtain

\[I_{rms} = \dfrac{1}{\sqrt{2}}I_0 \]

and

\[V_{rms} = \dfrac{1}{\sqrt{2}}V_0.\]

We may then write for the average power dissipated by a resistor,

\[ P_{\text {ave }}=\frac{1}{2} I_{0} V_{0}=I_{\mathrm{rms}} V_{\mathrm{rms}}=I_{\mathrm{rms}}^{2} R. \label{eq10} \]

This equation further emphasizes why the rms value is chosen in discussion rather than peak values. Both Equations \ref{eq5} and \ref{eq10} are correct for average power, but the rms values in the formula give a cleaner representation, so the extra factor of 1/2 is not necessary.

Alternating voltages and currents are usually described in terms of their rms values. For example, the 110 V from a household outlet is an rms value. The amplitude of this source is \(110 \sqrt{2} \, V = 156 \, V\). Because most ac meters are calibrated in terms of rms values, a typical ac voltmeter placed across a household outlet will read 110 V.

For a capacitor and an inductor, \(\phi = \pi/2\) and \(-\pi/2 \, rad\), respectively. Since \(\cos \, \pi/2 = cos(-\pi/2) = 0\), we find from Equation \ref{eq5} that the average power dissipated by either of these elements is \(P_{ave} = 0\). Capacitors and inductors absorb energy from the circuit during one half-cycle and then discharge it back to the circuit during the other half-cycle. This behavior is illustrated in the plots of Figures \(\PageIndex{1b}\) and \(\PageIndex{1c}\) which show \(p(t)\) oscillating sinusoidally about zero.

The phase angle for an ac generator may have any value. If \(cos \, \phi > 0\), the generator produces power; if \(cos \, \phi < 0\), it absorbs power. In terms of rms values, the average power of an ac generator is written as

\[P_{ave} = I_{rms}V_{rms} \, \cos \, \phi.\]

For the generator in an **RLC** circuit,

\[tan \, \phi = \dfrac{X_L - X_C}{R}\] and

\[cos \, \phi = \dfrac{R}{\sqrt{R^2 + (X_L - X_C)^2}} = \dfrac{R}{Z}.\]

Hence the average power of the generator is

\[P_{ave} = I_{rms}V_{rms} \, \cos \, \phi = \dfrac{V_{rms}}{Z} V_{rms} \dfrac{R}{Z} = \dfrac{V_{rms}^2 R}{Z^2}. \label{eq30} \]

This can also be written as

\[P_{ave} = I_{rms}^2 R,\]

which designates that the power produced by the generator is dissipated in the resistor. As we can see, Ohm’s law for the rms ac is found by dividing the rms voltage by the impedance.

An ac generator whose emf is given by

\[v(t) = (4.00 \, V) \, \sin \, [(1.00 \times 10^4 \, rad/s)t] \nonumber\]

is connected to an **RLC** circuit for which \(L = 2.00 \times 10^{-3} H, \, C = 4.00 \times 10^{-6}F\), and \(R = 5.00 \, \Omega\).

- What is the rms voltage across the generator?
- What is the impedance of the circuit?
- What is the average power output of the generator?

**Strategy**

The rms voltage is the amplitude of the voltage times \(1/\sqrt{2}\). The impedance of the circuit involves the resistance and the reactances of the capacitor and the inductor. The average power is calculated by Equation \ref{eq30} because we have the impedance of the circuit \(Z\), the rms voltage \(V_{rms}\), and the resistance \(R\).

**Solution**

- Since \(V_0 = 4.00 \, V\), the rms voltage across the generator is \[V_{rms} = \dfrac{1}{\sqrt{2}} (4.00 \, V) = 2.83 \, V. \nonumber\]
- The impedance of the circuit is \[ \begin{align*} Z &= \sqrt{r^2 + (x_l - x_c)^2} \\[4pt] &= \sqrt{ (5.00 \,\Omega)^2 + \left[ (1.00 \times 10^4 \, rad/s)(2.00 \times 10^{-3} \, H) - \dfrac{1}{(1.00 \times 10^4 \, rad/s)(4.00 \times 10^{-6} \, F)} \right]^2 } \\[4pt] &= 7.07 \, \Omega. \end{align*} \]
- From Equation \ref{eq30}, the average power transferred to the circuit is \[P_{ave} = \dfrac{V_{rms}^2R}{Z^2} = \dfrac{(2.83 \, V)^2(5.00 \, \Omega)}{(7.07 \, \Omega)^2} = 0.801 \, W.\nonumber\]

**Significance**

If the resistance is much larger than the reactance of the capacitor or inductor, the average power is a dc circuit equation of \(P = V^2/R\), where **V** replaces the rms voltage.

An ac voltmeter attached across the terminals of a 45-Hz ac generator reads 7.07 V. Write an expression for the emf of the generator.

**Answer**-
\(v(t) = (10.0 \, V) \, \sin \, 90 \pi t\)

Show that the rms voltages across a resistor, a capacitor, and an inductor in an ac circuit where the rms current is \(I_{rms}\) are given by \(I_{rms}R, \, I_{rms}X_C\), and \(I_{rms}X_L\), respectively. Determine these values for the components of the **RLC** circuit of Equation \ref{eq5}.

**Answer**-
2.00 V; 10.01 V; 8.01 V