Transcript - Muhazam

EEE1012
Introduction to Electrical &
Electronics Engineering
Chapter 7: Field Effect Transistor
by Muhazam Mustapha, October 2010
Learning Outcome
By the end of this chapter students are
expected to:
• Be able to explain some basic physical
theory and operation of FET
• Be able to do calculation on DC and AC
analysis on FET circuit
Chapter Content
•
•
•
•
Theory of FET
FET Operation
DC Analysis
AC Analysis
Field Effect Transistor
Field Effect Transistor
• FET is a piece of electronic device that
conducts electricity by the control of a gate
• It can be considered as a voltage controlled
resistor or voltage controlled current source
• Current flows through the
center body of channel
from terminals called drain
to source
• Gate is a plate not
touching the substrate
Drain
Gate
Channel
Source
FET Types
• There are many types of FET
– MOSFET – Metal Oxide Semiconductor FET
– JFET – Junction FET
– NMOS – n-channel MOSFET
– PMOS – p-channel MOSFET
• We will cover mostly NMOS
Channel Types
• FET is also characterized by its channel
• n-channel
– The majority carrier in the channel is electron
• p-channel
– The majority carrier in the channel is hole
Modes
• Enhancement mode
– FET is normally NOT conducting current even
when given voltage at drain and source
– Gate is to increase the current
• Depletion mode
– FET is normally conducting current when
given voltage at drain and source
– Gate is to decrease the current
Depletion Mode
• p-channel
Drain
+ve
– Current flow is reduced by
putting a positive voltage at
gate to repel holes flow and
finally block the current
– The more positive the gate,
the less current flow
Gate
Hole
Flow
+ve
Gate’s electric
field repelling
holes
p-channel
−ve
Source
Depletion Mode
• n-channel
– Current flow is reduced by
putting a negative voltage
at gate to repel electrons
flow and finally block the
current
– The more negative the
gate, the less current flow
Drain
+ve
Gate
Electron
Flow
−ve
n-channel
Gate’s electric
field repelling
electrons
−ve
Source
Enhancement Mode (PMOS)
n-substrate
• p-channel
– When negative voltage is put
to drain that is made of highly
p dopant (p+), reverse bias
junction is formed at drain –
hence no current flows
– Negative voltage is put to
gate to attract holes and
effectively compensate the
reverse biases – until current
can flow
p-channel
formation
Drain
−ve
p+
Gate
−ve
Hole
Flow
p+
Gate’s electric
field attracting
holes
+ve
Source
Enhancement Mode (NMOS)
p-substrate
• n-channel
– When positive voltage is put
to drain that is made of highly
n dopant (n+), reverse bias
junction is formed at drain –
hence no current flows
– Positive voltage is put to gate
to attract electrons and
effectively compensate the
reverse biases – until current
can flow
n-channel
formation
Drain
+ve
n+
Gate
+ve
Electron
Flow
n+
Gate’s electric
field attracting
electrons
−ve
Source
Circuit Symbol and Notations
Depletion
p-channel
n-channel
Enhancement
JFET
Operation Region
I-V Characteristic
ID, mA
VGS = 5.0V
Ohmic
Region
15
VGS = 4.5V
Saturation
Region
10
VGS = 4.0V
VGS = 3.5V
5
VGS = 3.0V
VGS = 2.5V
0
0
1
2
3
4
5
Cutoff
Region
6
7
8
9
VDS, V
Operation Region
• Cutoff
– VGS < VT and VGD < VT
– No current flow
• Ohmic / Triode
– VGS > VT and VGD > VT
– Linear I-V characteristic
Operation Region
• Saturation
– VGS > VT and VGD < VT
– ID is controlled by VGS (Saturation Region
Formula):
I D  K (VGS  VT )
Conductance
parameter
2
Threshold voltage –
minimum voltage to form a
conducting channel
FET In Digital Circuit
NAND, NOR and NOT Gates
DC Biasing
FET Biasing
Refer to Giorgio Rizzoni’s Fundamentals of Electrical Engineering:
Chapter 11.3, Example 11.4
• Biasing an FET means putting its VDS and ID
into a desired position in the ID-VDS graph
• This is done normally if we want the FET to
operate in saturation region
• The biasing process is a little tricky since ID is
controlled by VG – not directly by VDS
FET Biasing
Refer to Giorgio Rizzoni’s Fundamentals of Electrical Engineering:
Chapter 11.3, Example 11.4
• The biasing formula will also be a little different
from BJT since in FET saturation region we
have formula:
ID = K(VGS-VT)2
• Another difference is that IG is zero (whereas IB
is not zero in BJT) since the gate is not in
contact with the channel
FET Biasing
Refer to Giorgio Rizzoni’s Fundamentals of Electrical Engineering:
Chapter 11.3, Example 11.4
• The position of the biased FET’s VDS and ID is
called Q point
• The value of VGS is also required for the biasing
• There are a few biasing configuration exist, but
for the purpose of non-EE class, we will only
study the most popular configuration called selfbias common source configuration
– Refer to Giorgio Rizzoni’s Fundamentals of Electrical
Engineering Figure 11.8(a)
FET Biasing
Refer to Giorgio Rizzoni’s Fundamentals of Electrical Engineering:
Chapter 11.3, Example 11.4
RG = R1 || R2
R1
IG
RG
+
VDS
+
VGS
R2
−
RS
−
ID
RD
ID
RD
+
IG
VDS
VDD
VGG
VGG = (VDD)(R2)/(R1+R2)
+
VGS
−
−
RS
Thevenin’s Equivalent
VDD
FET Biasing
Refer to Giorgio Rizzoni’s Fundamentals of Electrical Engineering:
Chapter 11.3, Example 11.4
• The target of biasing process is to find the value
of the resistors so that Q point is position at
around VDD/2 in the ID-VDS characteristic graph
• R1 and R2 will determine VGS
• VGS will determine ID
• ID = K(VGS−VT)2
• Then from KVL, VDS = VDD−ID(RD+RS)
– This equation is what called load-line equation
FET Biasing
Refer to Giorgio Rizzoni’s Fundamentals of Electrical Engineering:
Chapter 11.3, Example 11.4
Steps:
• R1 and R2 will be combined using Thevenin’s
theorem to form RG
• Use KVL on GS loop to get VGS from RS and ID
• Use saturation region formula to get a quadratic
equation on VGS or ID, then solve the other one
• Use KVL on DS loop (load-line equation) with
the required VDS for the Q point to get RD
FET Biasing
• Class discussion: Giorgio Rizzoni’s
Fundamentals of Electrical Engineering: pages
500 – 501, Example 11.4
AC Analysis
AC Analysis
• AC analysis is done to determine the
performance of FET amplifier circuit
• There are a few parameters of interest, like
input and output resistance, but for the purpose
of non-EE class, we will do only voltage gain
(no current gain, why?)
• AC analysis is done after biasing is completed
and assuming there is some AC signal being
introduced into the circuit as superimpose on
top of the DC values (biasing)
AC Analysis
• The oscillation of the input and output signals
will be denoted by Δ (delta)
• For this class we will consider the I-V
characteristic of the sinusoidal input and output
signals will be the same as the DC relationship
– next slide
AC Analysis
R1
RD
ΔVO
ΔVG
VDD
R2
RS
AC Analysis
I DMax  K (VGSMax  VT )
2
I DMin  K (VGSMin  VT ) 2
I D  I DMax  I DMin
VO  VDS   RD I D
Voltage
Gain
VO

VG
AC Analysis
In the formula for ΔVO, it only
depends on ΔID even though
from the KVL at the output it
should also depends on ΔIS.
The reason for this is in real
circuit we put a capacitor
across RS which effectively
SHORTS circuit RS when AC
current flows – means we
can disregard RS in AC
analysis formula.
R1
RD
ΔVO
ΔVG
VDD
R2
RS
AC Analysis
• Self exercise: Based on Giorgio Rizzoni’s
Fundamentals of Electrical Engineering
Example 11.4, get the Vp-p of output if the Vp-p of
input is 5mV