User:John R. Brews/WP Import: Difference between revisions

The hybrid-pi model is a popular circuit model used for analyzing the small signal behavior of transistors. The model can be quite accurate for low-frequency circuits and can easily be adapted for higher frequency circuits with the addition of appropriate inter-electrode capacitances and other parasitic elements.

Bipolar transistor

(PD) Image: John R. Brews
Simplified, low-frequency hybrid-pi BJT model.

(PD) Image: John R. Brews
Bipolar hybrid-pi model with parasitic capacitances.

The hybrid-pi model is a linearized, y-parameter two-port network approximation to the transistor using the small-signal base-emitter voltage v_π and collector-emitter voltage v_ce as independent variables, and the small-signal base current i_b and collector current i_c as dependent variables. (See Jaeger and Blalock.^[1])

A basic, low-frequency hybrid-pi model for the bipolar transistor is shown in the figure. The three transistor terminals are E = emitter, B = base, and C = collector. The base-emitter connection is through a resistor r_π, and the base current causes a small-signal voltage drop across it, v_π (the π notation is standard). Voltage v_π induces a small-signal collector current via the voltage-controlled current source with current g_mv_π, g_m is the transistor transconductance.

The various parameters are as follows.

• ${\displaystyle g_{m}={\frac {i_{c}}{v_{be}}}{\Bigg |}_{v_{ce}=0}={\begin{matrix}{\frac {I_{\mathrm {C} }}{V_{\mathrm {T} }}}\end{matrix}}}$ is the transconductance in siemens, evaluated in a simple model (see Jaeger and Blalock^[2])

where:

• ${\displaystyle I_{\mathrm {C} }\,}$ is the quiescent collector current (also called the collector bias or DC collector current)
• ${\displaystyle V_{\mathrm {T} }={\begin{matrix}{\frac {kT}{q}}\end{matrix}}}$ is the thermal voltage, calculated from Boltzmann's constant, the charge on an electron, and the transistor temperature in kelvins. At 290 K (an approximation to room temperature: 70°F ≈ 294 K) V_T is very nearly 25 mV (Google calculator).

• ${\displaystyle r_{\pi }={\frac {v_{be}}{i_{b}}}{\Bigg |}_{v_{ce}=0}={\frac {\beta _{0}}{g_{m}}}={\frac {V_{\mathrm {T} }}{I_{\mathrm {B} }}}\,}$ in ohms

where:

• ${\displaystyle \beta _{0}={\frac {I_{\mathrm {C} }}{I_{\mathrm {B} }}}\,}$ is the current gain at low frequencies (commonly called h_FE). Here ${\displaystyle I_{B}}$ is the Q-point base current. This is a parameter specific to each transistor, and can be found on a datasheet; ${\displaystyle \beta }$ is a function of the choice of collector current.

• ${\displaystyle r_{O}={\frac {v_{ce}}{i_{c}}}{\Bigg |}_{v_{be}=0}={\begin{matrix}{\frac {V_{A}+V_{CE}}{I_{C}}}\end{matrix}}\approx {\begin{matrix}{\frac {V_{A}}{I_{C}}}\end{matrix}}}$ is the output resistance due to the Early effect.

Higher frequencies

As frequencies are increased, amplifier gain drops off with increasing frequency. as the bipolar transistor is degraded by parasitic capacitances. These effects must be modeled to assess the limitations of bipolar circuits. Three parasitic elements are commonly added to the hybrid-pi model to make frequency predictions. One is the base-emitter capacitance C_π, which includes the base-emitter diffusion capacitance and the base-emitter junction capacitance. At high enough frequencies, C_π shorts out the transistor and it fails to function. A second parasitic capacitance C_μ connects the base to the collector. Although this capacitor is small, its influence is multiplied by the transistor gain which amplifies the voltage variation at the base connection and applies it to the collector connection, exaggerating the influence of this capacitor through the Miller effect. The small series base resistance r_x plays a role only when there is no other resistance introduced by the circuit into the base lead.

Related terms

The reciprocal of the output resistance is named the output conductance

• ${\displaystyle g_{ce}={\frac {1}{r_{O}}}}$.

The reciprocal of g_m is called the intrinsic resistance

• ${\displaystyle r_{E}={\frac {1}{g_{m}}}}$.

MOSFET parameters

Figure 2: Simplified, low-frequency hybrid-pi MOSFET model.

A basic, low-frequency hybrid-pi model for the MOSFET is shown in figure 2. The various parameters are as follows.

• ${\displaystyle g_{m}={\frac {i_{d}}{v_{gs}}}{\Bigg |}_{v_{ds}=0}}$

is the transconductance in siemens, evaluated in the Shichman-Hodges model in terms of the Q-point drain current ${\displaystyle I_{D}}$ by (see Jaeger and Blalock^[3]):

${\displaystyle \ g_{m}={\begin{matrix}{\frac {2I_{\mathrm {D} }}{V_{\mathrm {GS} }-V_{\mathrm {th} }}}\end{matrix}}}$,

where:

${\displaystyle I_{\mathrm {D} }}$ is the quiescent drain current (also called the drain bias or DC drain current)

${\displaystyle V_{th}}$ = threshold voltage and ${\displaystyle V_{GS}}$ = gate-to-source voltage.

The combination:

${\displaystyle \ V_{ov}=(V_{GS}-V_{th})}$

often is called the overdrive voltage.

• ${\displaystyle r_{O}={\frac {v_{ds}}{i_{d}}}{\Bigg |}_{v_{gs}=0}}$ is the output resistance due to channel length modulation, calculated using the Shichman-Hodges model as

${\displaystyle r_{O}={\begin{matrix}{\frac {1/\lambda +V_{DS}}{I_{D}}}\end{matrix}}\approx {\begin{matrix}{\frac {V_{E}L}{I_{D}}}\end{matrix}}}$,

using the approximation for the channel length modulation parameter λ^[4]

${\displaystyle \lambda ={\begin{matrix}{\frac {1}{V_{E}L}}\end{matrix}}}$.

Here V_E is a technology related parameter (about 4 V / μm for the 65 nm technology node^[4]) and L is the length of the source-to-drain separation.

The reciprocal of the output resistance is named the drain conductance

• ${\displaystyle g_{ds}={\frac {1}{r_{O}}}}$.

References and notes