"One microampere flowing in one ohm causes a one microvolt
potential drop."
Georg Simon Ohm
How voltage, current, and resistance relate
An electric circuit is formed when a conductive path is created
to allow free electrons to continuously move. This continuous
movement of free electrons through the conductors of a circuit is
called a current, and it is often referred to in terms of
"flow," just like the flow of a liquid through a hollow pipe.
The force motivating electrons to "flow" in a circuit is called
voltage. Voltage is a specific measure of potential energy
that is always relative between two points. When we speak of a
certain amount of voltage being present in a circuit, we are
referring to the measurement of how much potential energy
exists to move electrons from one particular point in that circuit
to another particular point. Without reference to two
particular points, the term "voltage" has no meaning.
Free electrons tend to move through conductors with some degree
of friction, or opposition to motion. This opposition to motion is
more properly called resistance. The amount of current in a
circuit depends on the amount of voltage available to motivate the
electrons, and also the amount of resistance in the circuit to
oppose electron flow. Just like voltage, resistance is a quantity
relative between two points. For this reason, the quantities of
voltage and resistance are often stated as being "between" or
"across" two points in a circuit.
To be able to make meaningful statements about these quantities
in circuits, we need to be able to describe their quantities in the
same way that we might quantify mass, temperature, volume, length,
or any other kind of physical quantity. For mass we might use the
units of "pound" or "gram." For temperature we might use degrees
Fahrenheit or degrees Celsius. Here are the standard units of
measurement for electrical current, voltage, and resistance:
The "symbol" given for each quantity is the standard alphabetical
letter used to represent that quantity in an algebraic equation.
Standardized letters like these are common in the disciplines of
physics and engineering, and are internationally recognized. The
"unit abbreviation" for each quantity represents the alphabetical
symbol used as a shorthand notation for its particular unit of
measurement. And, yes, that strange-looking "horseshoe" symbol is
the capital Greek letter Ω, just a character in a foreign
alphabet (apologies to any Greek readers here).
Each unit of measurement is named after a famous experimenter in
electricity: The amp after the Frenchman Andre M. Ampere, the
volt after the Italian Alessandro Volta, and the ohm
after the German Georg Simon Ohm.
The mathematical symbol for each quantity is meaningful as well.
The "R" for resistance and the "V" for voltage are both
self-explanatory, whereas "I" for current seems a bit weird. The "I"
is thought to have been meant to represent "Intensity" (of electron
flow), and the other symbol for voltage, "E," stands for
"Electromotive force." From what research I've been able to do,
there seems to be some dispute over the meaning of "I." The symbols
"E" and "V" are interchangeable for the most part, although some
texts reserve "E" to represent voltage across a source (such as a
battery or generator) and "V" to represent voltage across anything
else.
All of these symbols are expressed using capital letters, except
in cases where a quantity (especially voltage or current) is
described in terms of a brief period of time (called an
"instantaneous" value). For example, the voltage of a battery, which
is stable over a long period of time, will be symbolized with a
capital letter "E," while the voltage peak of a lightning strike at
the very instant it hits a power line would most likely be
symbolized with a lower-case letter "e" (or lower-case "v") to
designate that value as being at a single moment in time. This same
lower-case convention holds true for current as well, the lower-case
letter "i" representing current at some instant in time. Most
direct-current (DC) measurements, however, being stable over time,
will be symbolized with capital letters.
One foundational unit of electrical measurement, often taught in
the beginnings of electronics courses but used infrequently
afterwards, is the unit of the coulomb, which is a measure of
electric charge proportional to the number of electrons in an
imbalanced state. One coulomb of charge is equal to
6,250,000,000,000,000,000 electrons. The symbol for electric charge
quantity is the capital letter "Q," with the unit of coulombs
abbreviated by the capital letter "C." It so happens that the unit
for electron flow, the amp, is equal to 1 coulomb of electrons
passing by a given point in a circuit in 1 second of time. Cast in
these terms, current is the rate of electric charge motion
through a conductor.
As stated before, voltage is the measure of potential energy
per unit charge available to motivate electrons from one point
to another. Before we can precisely define what a "volt" is, we must
understand how to measure this quantity we call "potential energy."
The general metric unit for energy of any kind is the joule,
equal to the amount of work performed by a force of 1 newton exerted
through a motion of 1 meter (in the same direction). In British
units, this is slightly less than 3/4 pound of force exerted over a
distance of 1 foot. Put in common terms, it takes about 1 joule of
energy to lift a 3/4 pound weight 1 foot off the ground, or to drag
something a distance of 1 foot using a parallel pulling force of 3/4
pound. Defined in these scientific terms, 1 volt is equal to 1 joule
of electric potential energy per (divided by) 1 coulomb of charge.
Thus, a 9 volt battery releases 9 joules of energy for every coulomb
of electrons moved through a circuit.
These units and symbols for electrical quantities will become
very important to know as we begin to explore the relationships
between them in circuits. The first, and perhaps most important,
relationship between current, voltage, and resistance is called
Ohm's Law, discovered by Georg Simon Ohm and published in his 1827
paper, The Galvanic Circuit Investigated Mathematically.
Ohm's principal discovery was that the amount of electric current
through a metal conductor in a circuit is directly proportional to
the voltage impressed across it, for any given temperature. Ohm
expressed his discovery in the form of a simple equation, describing
how voltage, current, and resistance interrelate:
In this algebraic expression, voltage (E) is equal to current (I)
multiplied by resistance (R). Using algebra techniques, we can
manipulate this equation into two variations, solving for I and for
R, respectively:
Let's see how these equations might work to help us analyze
simple circuits:
In the above circuit, there is only one source of voltage (the
battery, on the left) and only one source of resistance to current
(the lamp, on the right). This makes it very easy to apply Ohm's
Law. If we know the values of any two of the three quantities
(voltage, current, and resistance) in this circuit, we can use Ohm's
Law to determine the third.
In this first example, we will calculate the amount of current
(I) in a circuit, given values of voltage (E) and resistance (R):
What is the amount of current (I) in this circuit?
In this second example, we will calculate the amount of
resistance (R) in a circuit, given values of voltage (E) and current
(I):
What is the amount of resistance (R) offered by the lamp?
In the last example, we will calculate the amount of voltage
supplied by a battery, given values of current (I) and resistance
(R):
What is the amount of voltage provided by the battery?
Ohm's Law is a very simple and useful tool for analyzing electric
circuits. It is used so often in the study of electricity and
electronics that it needs to be committed to memory by the serious
student. For those who are not yet comfortable with algebra, there's
a trick to remembering how to solve for any one quantity, given the
other two. First, arrange the letters E, I, and R in a triangle like
this:
If you know E and I, and wish to determine R, just eliminate R
from the picture and see what's left:
If you know E and R, and wish to determine I, eliminate I and see
what's left:
Lastly, if you know I and R, and wish to determine E, eliminate E
and see what's left:
Eventually, you'll have to be familiar with algebra to seriously
study electricity and electronics, but this tip can make your first
calculations a little easier to remember. If you are comfortable
with algebra, all you need to do is commit E=IR to memory and derive
the other two formulae from that when you need them!
- REVIEW:
- Voltage measured in volts, symbolized by the letters
"E" or "V".
- Current measured in amps, symbolized by the letter "I".
- Resistance measured in ohms, symbolized by the letter
"R".
- Ohm's Law: E = IR ; I = E/R ; R = E/I
An analogy for Ohm's Law
Ohm's Law also make intuitive sense if you apply if to the
water-and-pipe analogy. If we have a water pump that exerts pressure
(voltage) to push water around a "circuit" (current) through a
restriction (resistance), we can model how the three variables
interrelate. If the resistance to water flow stays the same and the
pump pressure increases, the flow rate must also increase.
If the pressure stays the same and the resistance increases
(making it more difficult for the water to flow), then the flow rate
must decrease:
If the flow rate were to stay the same while the resistance to
flow decreased, the required pressure from the pump would
necessarily decrease:
As odd as it may seem, the actual mathematical relationship
between pressure, flow, and resistance is actually more complex for
fluids like water than it is for electrons. If you pursue further
studies in physics, you will discover this for yourself. Thankfully
for the electronics student, the mathematics of Ohm's Law is very
straightforward and simple.
- REVIEW:
- With resistance steady, current follows voltage (an increase
in voltage means an increase in current, and visa-versa).
- With voltage steady, changes in current and resistance are
opposite (an increase in current means a decrease in resistance,
and visa-verse).
- With current steady, voltage follows resistance (an increase
in resistance means an increase in voltage).
Power in electric circuits
In addition to voltage and current, there is another measure of
free electron activity in a circuit: power. First, we need to
understand just what power is before we analyze it in any circuits.
Power is a measure of how much work can be performed in a given
amount of time. Work is generally defined in terms of the
lifting of a weight against the pull of gravity. The heavier the
weight and/or the higher it is lifted, the more work has been done.
Power is a measure of how rapidly a standard amount of work
is done.
For American automobiles, engine power is rated in a unit called
"horsepower," invented initially as a way for steam engine
manufacturers to quantify the working ability of their machines in
terms of the most common power source of their day: horses. One
horsepower is defined in British units as 550 ft-lbs of work per
second of time. The power of a car's engine won't indicate how tall
of a hill it can climb or how much weight it can tow, but it will
indicate how fast it can climb a specific hill or tow a
specific weight.
The power of a mechanical engine is a function of both the
engine's speed and it's torque provided at the output shaft. Speed
of an engine's output shaft is measured in revolutions per minute,
or RPM. Torque is the amount of twisting force produced by the
engine, and it is usually measured in pound-feet, or lb-ft (not to
be confused with foot-pounds or ft-lbs, which is the unit for work).
Neither speed nor torque alone is a measure of an engine's power.
A 100 horsepower diesel tractor engine will turn relatively
slowly, but provide great amounts of torque. A 100 horsepower
motorcycle engine will turn very fast, but provide relatively little
torque. Both will produce 100 horsepower, but at different speeds
and different torques. The equation for shaft horsepower is simple:
Notice how there are only two variable terms on the right-hand
side of the equation, S and T. All the other terms on that side are
constant: 2, pi, and 33,000 are all constants (they do not change in
value). The horsepower varies only with changes in speed and torque,
nothing else. We can re-write the equation to show this
relationship:
Because the unit of the "horsepower" doesn't coincide exactly
with speed in revolutions per minute multiplied by torque in
pound-feet, we can't say that horsepower equals ST. However,
they are proportional to one another. As the mathematical
product of ST changes, the value for horsepower will change by the
same proportion.
In electric circuits, power is a function of both voltage and
current. Not surprisingly, this relationship bears striking
resemblance to the "proportional" horsepower formula above:
In this case, however, power (P) is exactly equal to current (I)
multiplied by voltage (E), rather than merely being proportional to
IE. When using this formula, the unit of measurement for power is
the watt, abbreviated with the letter "W."
It must be understood that neither voltage nor current by
themselves constitute power. Rather, power is the combination of
both voltage and current in a circuit. Remember that voltage
is the specific work (or potential energy) per unit charge, while
current is the rate at which electric charges move through a
conductor. Voltage (specific work) is analogous to the work done in
lifting a weight against the pull of gravity. Current (rate) is
analogous to the speed at which that weight is lifted. Together as a
product (multiplication), voltage (work) and current (rate)
constitute power.
Just as in the case of the diesel tractor engine and the
motorcycle engine, a circuit with high voltage and low current may
be dissipating the same amount of power as a circuit with low
voltage and high current. Neither the amount of voltage alone nor
the amount of current alone indicates the amount of power in an
electric circuit.
In an open circuit, where voltage is present between the
terminals of the source and there is zero current, there is zero
power dissipated, no matter how great that voltage may be. Since
P=IE and I=0 and anything multiplied by zero is zero, the power
dissipated in any open circuit must be zero. Likewise, if we were to
have a short circuit constructed of a loop of superconducting wire
(absolutely zero resistance), we could have a condition of current
in the loop with zero voltage, and likewise no power would be
dissipated. Since P=IE and E=0 and anything multiplied by zero is
zero, the power dissipated in a superconducting loop must be zero.
(We'll be exploring the topic of superconductivity in a later
chapter).
Whether we measure power in the unit of "horsepower" or the unit
of "watt," we're still talking about the same thing: how much work
can be done in a given amount of time. The two units are not
numerically equal, but they express the same kind of thing. In fact,
European automobile manufacturers typically advertise their engine
power in terms of kilowatts (kW), or thousands of watts, instead of
horsepower! These two units of power are related to each other by a
simple conversion formula:
So, our 100 horsepower diesel and motorcycle engines could also
be rated as "74570 watt" engines, or more properly, as "74.57
kilowatt" engines. In European engineering specifications, this
rating would be the norm rather than the exception.
- REVIEW:
- Power is the measure of how much work can be done in a given
amount of time.
- Mechanical power is commonly measured (in America) in
"horsepower."
- Electrical power is almost always measured in "watts," and it
can be calculated by the formula P = IE.
- Electrical power is a product of both voltage and
current, not either one separately.
- Horsepower and watts are merely two different units for
describing the same kind of physical measurement, with 1
horsepower equaling 745.7 watts.
Calculating electric power
We've seen the formula for determining the power in an electric
circuit: by multiplying the voltage in "volts" by the current in
"amps" we arrive at an answer in "watts." Let's apply this to a
circuit example:
In the above circuit, we know we have a battery voltage of 18
volts and a lamp resistance of 3 Ω. Using Ohm's Law to determine
current, we get:
Now that we know the current, we can take that value and multiply
it by the voltage to determine power:
Answer: the lamp is dissipating (releasing) 108 watts of power,
most likely in the form of both light and heat.
Let's try taking that same circuit and increasing the battery
voltage to see what happens. Intuition should tell us that the
circuit current will increase as the voltage increases and the lamp
resistance stays the same. Likewise, the power will increase as
well:
Now, the battery voltage is 36 volts instead of 18 volts. The
lamp is still providing 3 Ω of electrical resistance to the flow of
electrons. The current is now:
This stands to reason: if I = E/R, and we double E while R stays
the same, the current should double. Indeed, it has: we now have 12
amps of current instead of 6. Now, what about power?
Notice that the power has increased just as we might have
suspected, but it increased quite a bit more than the current. Why
is this? Because power is a function of voltage multiplied by
current, and both voltage and current doubled from their
previous values, the power will increase by a factor of 2 x 2, or 4.
You can check this by dividing 432 watts by 108 watts and seeing
that the ratio between them is indeed 4.
Using algebra again to manipulate the formulae, we can take our
original power formula and modify it for applications where we don't
know both voltage and resistance:
If we only know voltage (E) and resistance (R):
If we only know current (I) and resistance (R):
An historical note: it was James Prescott Joule, not Georg Simon
Ohm, who first discovered the mathematical relationship between
power dissipation and current through a resistance. This discovery,
published in 1841, followed the form of the last equation (P = I2R),
and is properly known as Joule's Law. However, these power equations
are so commonly associated with the Ohm's Law equations relating
voltage, current, and resistance (E=IR ; I=E/R ; and R=E/I) that
they are frequently credited to Ohm.
- REVIEW:
- Power measured in watts, symbolized by the letter "W".
- Joule's Law: P = I2R ; P = IE ; P = E2/R
Resistors
Because the relationship between voltage, current, and resistance
in any circuit is so regular, we can reliably control any variable
in a circuit simply by controlling the other two. Perhaps the
easiest variable in any circuit to control is its resistance. This
can be done by changing the material, size, and shape of its
conductive components (remember how the thin metal filament of a
lamp created more electrical resistance than a thick wire?).
Special components called resistors are made for the
express purpose of creating a precise quantity of resistance for
insertion into a circuit. They are typically constructed of metal
wire or carbon, and engineered to maintain a stable resistance value
over a wide range of environmental conditions. Unlike lamps, they do
not produce light, but they do produce heat as electric power is
dissipated by them in a working circuit. Typically, though, the
purpose of a resistor is not to produce usable heat, but simply to
provide a precise quantity of electrical resistance.
The most common schematic symbol for a resistor is a zig-zag
line:
Resistor values in ohms are usually shown as an adjacent number,
and if several resistors are present in a circuit, they will be
labeled with a unique identifier number such as R1, R2,
R3, etc. As you can see, resistor symbols can be shown
either horizontally or vertically:
Real resistors look nothing like the zig-zag symbol. Instead,
they look like small tubes or cylinders with two wires protruding
for connection to a circuit. Here is a sampling of different kinds
and sizes of resistors:
In keeping more with their physical appearance, an alternative
schematic symbol for a resistor looks like a small, rectangular box:
Resistors can also be shown to have varying rather than fixed
resistances. This might be for the purpose of describing an actual
physical device designed for the purpose of providing an adjustable
resistance, or it could be to show some component that just happens
to have an unstable resistance:
In fact, any time you see a component symbol drawn with a
diagonal arrow through it, that component has a variable rather than
a fixed value. This symbol "modifier" (the diagonal arrow) is
standard electronic symbol convention.
Variable resistors must have some physical means of adjustment,
either a rotating shaft or lever that can be moved to vary the
amount of electrical resistance. Here is a photograph showing some
devices called potentiometers, which can be used as variable
resistors:
Because resistors dissipate heat energy as the electric currents
through them overcome the "friction" of their resistance, resistors
are also rated in terms of how much heat energy they can dissipate
without overheating and sustaining damage. Naturally, this power
rating is specified in the physical unit of "watts." Most resistors
found in small electronic devices such as portable radios are rated
at 1/4 (0.25) watt or less. The power rating of any resistor is
roughly proportional to its physical size. Note in the first
resistor photograph how the power ratings relate with size: the
bigger the resistor, the higher its power dissipation rating. Also
note how resistances (in ohms) have nothing to do with size!
Although it may seem pointless now to have a device doing nothing
but resisting electric current, resistors are extremely useful
devices in circuits. Because they are simple and so commonly used
throughout the world of electricity and electronics, we'll spend a
considerable amount of time analyzing circuits composed of nothing
but resistors and batteries.
For a practical illustration of resistors' usefulness, examine
the photograph below. It is a picture of a printed circuit board,
or PCB: an assembly made of sandwiched layers of insulating
phenolic fiber-board and conductive copper strips, into which
components may be inserted and secured by a low-temperature welding
process called "soldering." The various components on this circuit
board are identified by printed labels. Resistors are denoted by any
label beginning with the letter "R".
This particular circuit board is a computer accessory called a
"modem," which allows digital information transfer over telephone
lines. There are at least a dozen resistors (all rated at 1/4 watt
power dissipation) that can be seen on this modem's board. Every one
of the black rectangles (called "integrated circuits" or "chips")
contain their own array of resistors for their internal functions,
as well.
Another circuit board example shows resistors packaged in even
smaller units, called "surface mount devices." This particular
circuit board is the underside of a personal computer hard disk
drive, and once again the resistors soldered onto it are designated
with labels beginning with the letter "R":
There are over one hundred surface-mount resistors on this
circuit board, and this count of course does not include the number
of resistors internal to the black "chips." These two photographs
should convince anyone that resistors -- devices that "merely"
oppose the flow of electrons -- are very important components in the
realm of electronics!
In schematic diagrams, resistor symbols are sometimes used to
illustrate any general type of device in a circuit doing something
useful with electrical energy. Any non-specific electrical device is
generally called a load, so if you see a schematic diagram
showing a resistor symbol labeled "load," especially in a tutorial
circuit diagram explaining some concept unrelated to the actual use
of electrical power, that symbol may just be a kind of shorthand
representation of something else more practical than a resistor.
To summarize what we've learned in this lesson, let's analyze the
following circuit, determining all that we can from the information
given:
All we've been given here to start with is the battery voltage
(10 volts) and the circuit current (2 amps). We don't know the
resistor's resistance in ohms or the power dissipated by it in
watts. Surveying our array of Ohm's Law equations, we find two
equations that give us answers from known quantities of voltage and
current:
Inserting the known quantities of voltage (E) and current (I)
into these two equations, we can determine circuit resistance (R)
and power dissipation (P):
For the circuit conditions of 10 volts and 2 amps, the resistor's
resistance must be 5 Ω. If we were designing a circuit to operate at
these values, we would have to specify a resistor with a minimum
power rating of 20 watts, or else it would overheat and fail.
- REVIEW:
- Devices called resistors are built to provide precise
amounts of resistance in electric circuits. Resistors are rated
both in terms of their resistance (ohms) and their ability to
dissipate heat energy (watts).
- Resistor resistance ratings cannot be determined from the
physical size of the resistor(s) in question, although approximate
power ratings can. The larger the resistor is, the more power it
can safely dissipate without suffering damage.
- Any device that performs some useful task with electric power
is generally known as a load. Sometimes resistor symbols
are used in schematic diagrams to designate a non-specific load,
rather than an actual resistor.
Nonlinear conduction
"Advances are made by answering questions. Discoveries are
made by questioning answers."
Bernhard Haisch, Astrophysicist
Ohm's Law is a simple and powerful mathematical tool for helping
us analyze electric circuits, but it has limitations, and we must
understand these limitations in order to properly apply it to real
circuits. For most conductors, resistance is a rather stable
property, largely unaffected by voltage or current. For this reason,
we can regard the resistance of most circuit components as a
constant, with voltage and current being inversely related to each
other.
For instance, our previous circuit example with the 3 Ω lamp, we
calculated current through the circuit by dividing voltage by
resistance (I=E/R). With an 18 volt battery, our circuit current was
6 amps. Doubling the battery voltage to 36 volts resulted in a
doubled current of 12 amps. All of this makes sense, of course, so
long as the lamp continues to provide exactly the same amount of
friction (resistance) to the flow of electrons through it: 3 Ω.
However, reality is not always this simple. One of the phenomena
explored in a later chapter is that of conductor resistance
changing with temperature. In an incandescent lamp (the kind
employing the principle of electric current heating a thin filament
of wire to the point that it glows white-hot), the resistance of the
filament wire will increase dramatically as it warms from room
temperature to operating temperature. If we were to increase the
supply voltage in a real lamp circuit, the resulting increase in
current would cause the filament to increase temperature, which
would in turn increase its resistance, thus preventing further
increases in current without further increases in battery voltage.
Consequently, voltage and current do not follow the simple equation
"I=E/R" (with R assumed to be equal to 3 Ω) because an incandescent
lamp's filament resistance does not remain stable for different
currents.
The phenomenon of resistance changing with variations in
temperature is one shared by almost all metals, of which most wires
are made. For most applications, these changes in resistance are
small enough to be ignored. In the application of metal lamp
filaments, the change happens to be quite large.
This is just one example of "nonlinearity" in electric circuits.
It is by no means the only example. A "linear" function in
mathematics is one that tracks a straight line when plotted on a
graph. The simplified version of the lamp circuit with a constant
filament resistance of 3 Ω generates a plot like this:
The straight-line plot of current over voltage indicates that
resistance is a stable, unchanging value for a wide range of circuit
voltages and currents. In an "ideal" situation, this is the case.
Resistors, which are manufactured to provide a definite, stable
value of resistance, behave very much like the plot of values seen
above. A mathematician would call their behavior "linear."
A more realistic analysis of a lamp circuit, however, over
several different values of battery voltage would generate a plot of
this shape:
The plot is no longer a straight line. It rises sharply on the
left, as voltage increases from zero to a low level. As it
progresses to the right we see the line flattening out, the circuit
requiring greater and greater increases in voltage to achieve equal
increases in current.
If we try to apply Ohm's Law to find the resistance of this lamp
circuit with the voltage and current values plotted above, we arrive
at several different values. We could say that the resistance here
is nonlinear, increasing with increasing current and voltage.
The nonlinearity is caused by the effects of high temperature on the
metal wire of the lamp filament.
Another example of nonlinear current conduction is through gases
such as air. At standard temperatures and pressures, air is an
effective insulator. However, if the voltage between two conductors
separated by an air gap is increased greatly enough, the air
molecules between the gap will become "ionized," having their
electrons stripped off by the force of the high voltage between the
wires. Once ionized, air (and other gases) become good conductors of
electricity, allowing electron flow where none could exist prior to
ionization. If we were to plot current over voltage on a graph as we
did with the lamp circuit, the effect of ionization would be clearly
seen as nonlinear:
The graph shown is approximate for a small air gap (less than one
inch). A larger air gap would yield a higher ionization potential,
but the shape of the I/E curve would be very similar: practically no
current until the ionization potential was reached, then substantial
conduction after that.
Incidentally, this is the reason lightning bolts exist as
momentary surges rather than continuous flows of electrons. The
voltage built up between the earth and clouds (or between different
sets of clouds) must increase to the point where it overcomes the
ionization potential of the air gap before the air ionizes enough to
support a substantial flow of electrons. Once it does, the current
will continue to conduct through the ionized air until the static
charge between the two points depletes. Once the charge depletes
enough so that the voltage falls below another threshold point, the
air de-ionizes and returns to its normal state of extremely high
resistance.
Many solid insulating materials exhibit similar resistance
properties: extremely high resistance to electron flow below some
critical threshold voltage, then a much lower resistance at voltages
beyond that threshold. Once a solid insulating material has been
compromised by high-voltage breakdown, as it is called, it
often does not return to its former insulating state, unlike most
gases. It may insulate once again at low voltages, but its breakdown
threshold voltage will have been decreased to some lower level,
which may allow breakdown to occur more easily in the future. This
is a common mode of failure in high-voltage wiring: insulation
damage due to breakdown. Such failures may be detected through the
use of special resistance meters employing high voltage (1000 volts
or more).
There are circuit components specifically engineered to provide
nonlinear resistance curves, one of them being the varistor.
Commonly manufactured from compounds such as zinc oxide or silicon
carbide, these devices maintain high resistance across their
terminals until a certain "firing" or "breakdown" voltage
(equivalent to the "ionization potential" of an air gap) is reached,
at which point their resistance decreases dramatically. Unlike the
breakdown of an insulator, varistor breakdown is repeatable: that
is, it is designed to withstand repeated breakdowns without failure.
A picture of a varistor is shown here:
There are also special gas-filled tubes designed to do much the
same thing, exploiting the very same principle at work in the
ionization of air by a lightning bolt.
Other electrical components exhibit even stranger current/voltage
curves than this. Some devices actually experience a decrease
in current as the applied voltage increases. Because the
slope of the current/voltage for this phenomenon is negative
(angling down instead of up as it progresses from left to right), it
is known as negative resistance.
Most notably, high-vacuum electron tubes known as tetrodes
and semiconductor diodes known as Esaki or tunnel
diodes exhibit negative resistance for certain ranges of applied
voltage.
Ohm's Law is not very useful for analyzing the behavior of
components like these where resistance is varies with voltage and
current. Some have even suggested that "Ohm's Law" should be demoted
from the status of a "Law" because it is not universal. It might be
more accurate to call the equation (R=E/I) a definition of
resistance, befitting of a certain class of materials under a
narrow range of conditions.
For the benefit of the student, however, we will assume that
resistances specified in example circuits are stable over a
wide range of conditions unless otherwise specified. I just wanted
to expose you to a little bit of the complexity of the real world,
lest I give you the false impression that the whole of electrical
phenomena could be summarized in a few simple equations.
- REVIEW:
- The resistance of most conductive materials is stable over a
wide range of conditions, but this is not true of all materials.
- Any function that can be plotted on a graph as a straight line
is called a linear function. For circuits with stable
resistances, the plot of current over voltage is linear (I=E/R).
- In circuits where resistance varies with changes in either
voltage or current, the plot of current over voltage will be
nonlinear (not a straight line).
- A varistor is a component that changes resistance with
the amount of voltage impressed across it. With little voltage
across it, its resistance is high. Then, at a certain "breakdown"
or "firing" voltage, its resistance decreases dramatically.
- Negative resistance is where the current through a
component actually decreases as the applied voltage across it is
increased. Some electron tubes and semiconductor diodes (most
notably, the tetrode tube and the Esaki, or
tunnel diode, respectively) exhibit negative resistance over a
certain range of voltages.
Circuit wiring
So far, we've been analyzing single-battery, single-resistor
circuits with no regard for the connecting wires between the
components, so long as a complete circuit is formed. Does the wire
length or circuit "shape" matter to our calculations? Let's look at
a couple of circuit configurations and find out:
When we draw wires connecting points in a circuit, we usually
assume those wires have negligible resistance. As such, they
contribute no appreciable effect to the overall resistance of the
circuit, and so the only resistance we have to contend with is the
resistance in the components. In the above circuits, the only
resistance comes from the 5 Ω resistors, so that is all we will
consider in our calculations. In real life, metal wires actually
do have resistance (and so do power sources!), but those
resistances are generally so much smaller than the resistance
present in the other circuit components that they can be safely
ignored. Exceptions to this rule exist in power system wiring, where
even very small amounts of conductor resistance can create
significant voltage drops given normal (high) levels of current.
If connecting wire resistance is very little or none, we can
regard the connected points in a circuit as being electrically
common. That is, points 1 and 2 in the above circuits may be
physically joined close together or far apart, and it doesn't matter
for any voltage or resistance measurements relative to those points.
The same goes for points 3 and 4. It is as if the ends of the
resistor were attached directly across the terminals of the battery,
so far as our Ohm's Law calculations and voltage measurements are
concerned. This is useful to know, because it means you can re-draw
a circuit diagram or re-wire a circuit, shortening or lengthening
the wires as desired without appreciably impacting the circuit's
function. All that matters is that the components attach to each
other in the same sequence.
It also means that voltage measurements between sets of
"electrically common" points will be the same. That is, the voltage
between points 1 and 4 (directly across the battery) will be the
same as the voltage between points 2 and 3 (directly across the
resistor). Take a close look at the following circuit, and try to
determine which points are common to each other:
Here, we only have 2 components excluding the wires: the battery
and the resistor. Though the connecting wires take a convoluted path
in forming a complete circuit, there are several electrically common
points in the electrons' path. Points 1, 2, and 3 are all common to
each other, because they're directly connected together by wire. The
same goes for points 4, 5, and 6.
The voltage between points 1 and 6 is 10 volts, coming straight
from the battery. However, since points 5 and 4 are common to 6, and
points 2 and 3 common to 1, that same 10 volts also exists between
these other pairs of points:
Between points 1 and 4 = 10 volts
Between points 2 and 4 = 10 volts
Between points 3 and 4 = 10 volts (directly across the resistor)
Between points 1 and 5 = 10 volts
Between points 2 and 5 = 10 volts
Between points 3 and 5 = 10 volts
Between points 1 and 6 = 10 volts (directly across the battery)
Between points 2 and 6 = 10 volts
Between points 3 and 6 = 10 volts
Since electrically common points are connected together by (zero
resistance) wire, there is no significant voltage drop between them
regardless of the amount of current conducted from one to the next
through that connecting wire. Thus, if we were to read voltages
between common points, we should show (practically) zero:
Between points 1 and 2 = 0 volts Points 1, 2, and 3 are
Between points 2 and 3 = 0 volts electrically common
Between points 1 and 3 = 0 volts
Between points 4 and 5 = 0 volts Points 4, 5, and 6 are
Between points 5 and 6 = 0 volts electrically common
Between points 4 and 6 = 0 volts
This makes sense mathematically, too. With a 10 volt battery and
a 5 Ω resistor, the circuit current will be 2 amps. With wire
resistance being zero, the voltage drop across any continuous
stretch of wire can be determined through Ohm's Law as such:
It should be obvious that the calculated voltage drop across any
uninterrupted length of wire in a circuit where wire is assumed to
have zero resistance will always be zero, no matter what the
magnitude of current, since zero multiplied by anything equals zero.
Because common points in a circuit will exhibit the same relative
voltage and resistance measurements, wires connecting common points
are often labeled with the same designation. This is not to say that
the terminal connection points are labeled the same, just the
connecting wires. Take this circuit as an example:
Points 1, 2, and 3 are all common to each other, so the wire
connecting point 1 to 2 is labeled the same (wire 2) as the wire
connecting point 2 to 3 (wire 2). In a real circuit, the wire
stretching from point 1 to 2 may not even be the same color or size
as the wire connecting point 2 to 3, but they should bear the exact
same label. The same goes for the wires connecting points 6, 5, and
4.
Knowing that electrically common points have zero voltage drop
between them is a valuable troubleshooting principle. If I measure
for voltage between points in a circuit that are supposed to be
common to each other, I should read zero. If, however, I read
substantial voltage between those two points, then I know with
certainty that they cannot be directly connected together. If those
points are supposed to be electrically common but they
register otherwise, then I know that there is an "open failure"
between those points.
One final note: for most practical purposes, wire conductors can
be assumed to possess zero resistance from end to end. In reality,
however, there will always be some small amount of resistance
encountered along the length of a wire, unless it's a
superconducting wire. Knowing this, we need to bear in mind that the
principles learned here about electrically common points are all
valid to a large degree, but not to an absolute degree. That
is, the rule that electrically common points are guaranteed to have
zero voltage between them is more accurately stated as such:
electrically common points will have very little voltage
dropped between them. That small, virtually unavoidable trace of
resistance found in any piece of connecting wire is bound to create
a small voltage across the length of it as current is conducted
through. So long as you understand that these rules are based upon
ideal conditions, you won't be perplexed when you come across
some condition appearing to be an exception to the rule.
- REVIEW:
- Connecting wires in a circuit are assumed to have zero
resistance unless otherwise stated.
- Wires in a circuit can be shortened or lengthened without
impacting the circuit's function -- all that matters is that the
components are attached to one another in the same sequence.
- Points directly connected together in a circuit by zero
resistance (wire) are considered to be electrically common.
- Electrically common points, with zero resistance between them,
will have zero voltage dropped between them, regardless of the
magnitude of current (ideally).
- The voltage or resistance readings referenced between sets of
electrically common points will be the same.
- These rules apply to ideal conditions, where connecting
wires are assumed to possess absolutely zero resistance. In real
life this will probably not be the case, but wire resistances
should be low enough so that the general principles stated here
still hold.
Polarity of voltage drops
We can trace the direction that electrons will flow in the same
circuit by starting at the negative (-) terminal and following
through to the positive (+) terminal of the battery, the only source
of voltage in the circuit. From this we can see that the electrons
are moving counter-clockwise, from point 6 to 5 to 4 to 3 to 2 to 1
and back to 6 again.
As the current encounters the 5 Ω resistance, voltage is dropped
across the resistor's ends. The polarity of this voltage drop is
negative (-) at point 4 with respect to positive (+) at point 3. We
can mark the polarity of the resistor's voltage drop with these
negative and positive symbols, in accordance with the direction of
current (whichever end of the resistor the current is entering
is negative with respect to the end of the resistor it is exiting:
We could make our table of voltages a little more complete by
marking the polarity of the voltage for each pair of points in this
circuit:
Between points 1 (+) and 4 (-) = 10 volts
Between points 2 (+) and 4 (-) = 10 volts
Between points 3 (+) and 4 (-) = 10 volts
Between points 1 (+) and 5 (-) = 10 volts
Between points 2 (+) and 5 (-) = 10 volts
Between points 3 (+) and 5 (-) = 10 volts
Between points 1 (+) and 6 (-) = 10 volts
Between points 2 (+) and 6 (-) = 10 volts
Between points 3 (+) and 6 (-) = 10 volts
While it might seem a little silly to document polarity of
voltage drop in this circuit, it is an important concept to master.
It will be critically important in the analysis of more complex
circuits involving multiple resistors and/or batteries.
It should be understood that polarity has nothing to do with
Ohm's Law: there will never be negative voltages, currents, or
resistance entered into any Ohm's Law equations! There are other
mathematical principles of electricity that do take polarity into
account through the use of signs (+ or -), but not Ohm's Law.
- REVIEW:
- The polarity of the voltage drop across any resistive
component is determined by the direction of electron flow though
it: negative entering, and positive exiting.
Computer simulation of electric circuits
Computers can be powerful tools if used properly, especially in
the realms of science and engineering. Software exists for the
simulation of electric circuits by computer, and these programs can
be very useful in helping circuit designers test ideas before
actually building real circuits, saving much time and money.
These same programs can be fantastic aids to the beginning
student of electronics, allowing the exploration of ideas quickly
and easily with no assembly of real circuits required. Of course,
there is no substitute for actually building and testing real
circuits, but computer simulations certainly assist in the learning
process by allowing the student to experiment with changes and see
the effects they have on circuits. Throughout this book, I'll be
incorporating computer printouts from circuit simulation frequently
in order to illustrate important concepts. By observing the results
of a computer simulation, a student can gain an intuitive grasp of
circuit behavior without the intimidation of abstract mathematical
analysis.
To simulate circuits on computer, I make use of a particular
program called SPICE, which works by describing a circuit to the
computer by means of a listing of text. In essence, this listing is
a kind of computer program in itself, and must adhere to the
syntactical rules of the SPICE language. The computer is then used
to process, or "run," the SPICE program, which interprets the text
listing describing the circuit and outputs the results of its
detailed mathematical analysis, also in text form. Many details of
using SPICE are described in volume 5 ("Reference") of this book
series for those wanting more information. Here, I'll just introduce
the basic concepts and then apply SPICE to the analysis of these
simple circuits we've been reading about.
First, we need to have SPICE installed on our computer. As a free
program, it is commonly available on the internet for download, and
in formats appropriate for many different operating systems. In this
book, I use one of the earlier versions of SPICE: version 2G6, for
its simplicity of use.
Next, we need a circuit for SPICE to analyze. Let's try one of
the circuits illustrated earlier in the chapter. Here is its
schematic diagram:
This simple circuit consists of a battery and a resistor
connected directly together. We know the voltage of the battery (10
volts) and the resistance of the resistor (5 Ω), but nothing else
about the circuit. If we describe this circuit to SPICE, it should
be able to tell us (at the very least), how much current we have in
the circuit by using Ohm's Law (I=E/R).
SPICE cannot directly understand a schematic diagram or any other
form of graphical description. SPICE is a text-based computer
program, and demands that a circuit be described in terms of its
constituent components and connection points. Each unique connection
point in a circuit is described for SPICE by a "node" number. Points
that are electrically common to each other in the circuit to be
simulated are designated as such by sharing the same number. It
might be helpful to think of these numbers as "wire" numbers rather
than "node" numbers, following the definition given in the previous
section. This is how the computer knows what's connected to what: by
the sharing of common wire, or node, numbers. In our example
circuit, we only have two "nodes," the top wire and the bottom wire.
SPICE demands there be a node 0 somewhere in the circuit, so we'll
label our wires 0 and 1:
In the above illustration, I've shown multiple "1" and "0" labels
around each respective wire to emphasize the concept of common
points sharing common node numbers, but still this is a graphic
image, not a text description. SPICE needs to have the component
values and node numbers given to it in text form before any analysis
may proceed.
Creating a text file in a computer involves the use of a program
called a text editor. Similar to a word processor, a text
editor allows you to type text and record what you've typed in the
form of a file stored on the computer's hard disk. Text editors lack
the formatting ability of word processors (no italic, bold,
or underlined characters), and this is a good thing, since
programs such as SPICE wouldn't know what to do with this extra
information. If we want to create a plain-text file, with absolutely
nothing recorded except the keyboard characters we select, a text
editor is the tool to use.
If using a Microsoft operating system such as DOS or Windows, a
couple of text editors are readily available with the system. In
DOS, there is the old Edit text editing program, which may be
invoked by typing edit at the command prompt. In Windows
(3.x/95/98/NT/Me/2k/XP), the Notepad text editor is your
stock choice. Many other text editing programs are available, and
some are even free. I happen to use a free text editor called Vim,
and run it under both Windows 95 and Linux operating systems. It
matters little which editor you use, so don't worry if the
screenshots in this section don't look like yours; the important
information here is what you type, not which editor
you happen to use.
To describe this simple, two-component circuit to SPICE, I will
begin by invoking my text editor program and typing in a "title"
line for the circuit:
We can describe the battery to the computer by typing in a line
of text starting with the letter "v" (for "Voltage
source"), identifying which wire each terminal of the battery
connects to (the node numbers), and the battery's voltage, like
this:
This line of text tells SPICE that we have a voltage source
connected between nodes 1 and 0, direct current (DC), 10 volts.
That's all the computer needs to know regarding the battery. Now we
turn to the resistor: SPICE requires that resistors be described
with a letter "r," the numbers of the two nodes (connection points),
and the resistance in ohms. Since this is a computer simulation,
there is no need to specify a power rating for the resistor. That's
one nice thing about "virtual" components: they can't be harmed by
excessive voltages or currents!
Now, SPICE will know there is a resistor connected between nodes
1 and 0 with a value of 5 Ω. This very brief line of text tells the
computer we have a resistor ("r") connected between the
same two nodes as the battery (1 and 0), with a resistance value of
5 Ω.
If we add an
.end statement to this collection of SPICE
commands to indicate the end of the circuit description, we will
have all the information SPICE needs, collected in one file and
ready for processing. This circuit description, comprised of lines
of text in a computer file, is technically known as a netlist,
or deck:
Once we have finished typing all the necessary SPICE commands, we
need to "save" them to a file on the computer's hard disk so that
SPICE has something to reference to when invoked. Since this is my
first SPICE netlist, I'll save it under the filename "circuit1.cir"
(the actual name being arbitrary). You may elect to name your first
SPICE netlist something completely different, just as long as you
don't violate any filename rules for your operating system, such as
using no more than 8+3 characters (eight characters in the name, and
three characters in the extension: 12345678.123) in DOS.
To invoke SPICE (tell it to process the contents of the
circuit1.cir netlist file), we have to exit from the text
editor and access a command prompt (the "DOS prompt" for Microsoft
users) where we can enter text commands for the computer's operating
system to obey. This "primitive" way of invoking a program may seem
archaic to computer users accustomed to a "point-and-click"
graphical environment, but it is a very powerful and flexible way of
doing things. Remember, what you're doing here by using SPICE is a
simple form of computer programming, and the more comfortable you
become in giving the computer text-form commands to follow -- as
opposed to simply clicking on icon images using a mouse -- the more
mastery you will have over your computer.
Once at a command prompt, type in this command, followed by an
[Enter] keystroke (this example uses the filename
circuit1.cir;
if you have chosen a different filename for your netlist file,
substitute it):
spice < circuit1.cir
Here is how this looks on my computer (running the Linux
operating system), just before I press the [Enter] key:
As soon as you press the [Enter] key to issue this command, text
from SPICE's output should scroll by on the computer screen. Here is
a screenshot showing what SPICE outputs on my computer (I've
lengthened the "terminal" window to show you the full text. With a
normal-size terminal, the text easily exceeds one page length):
SPICE begins with a reiteration of the netlist, complete with
title line and .end statement. About halfway through the
simulation it displays the voltage at all nodes with reference to
node 0. In this example, we only have one node other than node 0, so
it displays the voltage there: 10.0000 volts. Then it displays the
current through each voltage source. Since we only have one voltage
source in the entire circuit, it only displays the current through
that one. In this case, the source current is 2 amps. Due to a quirk
in the way SPICE analyzes current, the value of 2 amps is output as
a negative (-) 2 amps.
The last line of text in the computer's analysis report is "total
power dissipation," which in this case is given as "2.00E+01" watts:
2.00 x 101, or 20 watts. SPICE outputs most figures in
scientific notation rather than normal (fixed-point) notation. While
this may seem to be more confusing at first, it is actually less
confusing when very large or very small numbers are involved. The
details of scientific notation will be covered in the next chapter
of this book.
One of the benefits of using a "primitive" text-based program
such as SPICE is that the text files dealt with are extremely small
compared to other file formats, especially graphical formats used in
other circuit simulation software. Also, the fact that SPICE's
output is plain text means you can direct SPICE's output to another
text file where it may be further manipulated. To do this, we
re-issue a command to the computer's operating system to invoke
SPICE, this time redirecting the output to a file I'll call "output.txt":
SPICE will run "silently" this time, without the stream of text
output to the computer screen as before. A new file,
output1.txt,
will be created, which you may open and change using a text editor
or word processor. For this illustration, I'll use the same text
editor (Vim) to open this file:
Now, I may freely edit this file, deleting any extraneous text
(such as the "banners" showing date and time), leaving only the text
that I feel to be pertinent to my circuit's analysis:
Once suitably edited and re-saved under the same filename (output.txt
in this example), the text may be pasted into any kind of document,
"plain text" being a universal file format for almost all computer
systems. I can even include it directly in the text of this book --
rather than as a "screenshot" graphic image -- like this:
my first circuit
v 1 0 dc 10
r 1 0 5
.end
node voltage
( 1) 10.0000
voltage source currents
name current
v -2.000E+00
total power dissipation 2.00E+01 watts
Incidentally, this is the preferred format for text output from
SPICE simulations in this book series: as real text, not as graphic
screenshot images.
To alter a component value in the simulation, we need to open up
the netlist file (circuit1.cir) and make the required
modifications in the text description of the circuit, then save
those changes to the same filename, and re-invoke SPICE at the
command prompt. This process of editing and processing a text file
is one familiar to every computer programmer. One of the reasons I
like to teach SPICE is that it prepares the learner to think and
work like a computer programmer, which is good because computer
programming is a significant area of advanced electronics work.
Earlier we explored the consequences of changing one of the three
variables in an electric circuit (voltage, current, or resistance)
using Ohm's Law to mathematically predict what would happen. Now
let's try the same thing using SPICE to do the math for us.
If we were to triple the voltage in our last example circuit from
10 to 30 volts and keep the circuit resistance unchanged, we would
expect the current to triple as well. Let's try this, re-naming our
netlist file so as to not over-write the first file. This way, we
will have both versions of the circuit simulation stored on
the hard drive of our computer for future use. The following text
listing is the output of SPICE for this modified netlist, formatted
as plain text rather than as a graphic image of my computer screen:
second example circuit
v 1 0 dc 30
r 1 0 5
.end
node voltage
( 1) 30.0000
voltage source currents
name current
v -6.000E+00
total power dissipation 1.80E+02 watts
Just as we expected, the current tripled with the voltage
increase. Current used to be 2 amps, but now it has increased to 6
amps (-6.000 x 100). Note also how the total power
dissipation in the circuit has increased. It was 20 watts before,
but now is 180 watts (1.8 x 102). Recalling that power is
related to the square of the voltage (Joule's Law: P=E2/R),
this makes sense. If we triple the circuit voltage, the power should
increase by a factor of nine (32 = 9). Nine times 20 is
indeed 180, so SPICE's output does indeed correlate with what we
know about power in electric circuits.
If we want to see how this simple circuit would respond over a
wide range of battery voltages, we can invoke some of the more
advanced options within SPICE. Here, I'll use the ".dc"
analysis option to vary the battery voltage from 0 to 100 volts in 5
volt increments, printing out the circuit voltage and current at
every step. The lines in the SPICE netlist beginning with a star
symbol ("*") are comments. That is, they don't tell
the computer to do anything relating to circuit analysis, but merely
serve as notes for any human being reading the netlist text.
third example circuit
v 1 0
r 1 0 5
*the ".dc" statement tells spice to sweep the "v" supply
*voltage from 0 to 100 volts in 5 volt steps.
.dc v 0 100 5
.print dc v(1) i(v)
.end
The
.print command in this SPICE netlist instructs SPICE
to print columns of numbers corresponding to each step in the
analysis:
v i(v)
0.000E+00 0.000E+00
5.000E+00 -1.000E+00
1.000E+01 -2.000E+00
1.500E+01 -3.000E+00
2.000E+01 -4.000E+00
2.500E+01 -5.000E+00
3.000E+01 -6.000E+00
3.500E+01 -7.000E+00
4.000E+01 -8.000E+00
4.500E+01 -9.000E+00
5.000E+01 -1.000E+01
5.500E+01 -1.100E+01
6.000E+01 -1.200E+01
6.500E+01 -1.300E+01
7.000E+01 -1.400E+01
7.500E+01 -1.500E+01
8.000E+01 -1.600E+01
8.500E+01 -1.700E+01
9.000E+01 -1.800E+01
9.500E+01 -1.900E+01
1.000E+02 -2.000E+01
If I re-edit the netlist file, changing the
.print
command into a .plot command, SPICE will output a crude
graph made up of text characters:
Legend: + = v#branch
------------------------------------------------------------------------
sweep v#branch-2.00e+01 -1.00e+01 0.00e+00
---------------------|------------------------|------------------------|
0.000e+00 0.000e+00 . . +
5.000e+00 -1.000e+00 . . + .
1.000e+01 -2.000e+00 . . + .
1.500e+01 -3.000e+00 . . + .
2.000e+01 -4.000e+00 . . + .
2.500e+01 -5.000e+00 . . + .
3.000e+01 -6.000e+00 . . + .
3.500e+01 -7.000e+00 . . + .
4.000e+01 -8.000e+00 . . + .
4.500e+01 -9.000e+00 . . + .
5.000e+01 -1.000e+01 . + .
5.500e+01 -1.100e+01 . + . .
6.000e+01 -1.200e+01 . + . .
6.500e+01 -1.300e+01 . + . .
7.000e+01 -1.400e+01 . + . .
7.500e+01 -1.500e+01 . + . .
8.000e+01 -1.600e+01 . + . .
8.500e+01 -1.700e+01 . + . .
9.000e+01 -1.800e+01 . + . .
9.500e+01 -1.900e+01 . + . .
1.000e+02 -2.000e+01 + . .
---------------------|------------------------|------------------------|
sweep v#branch-2.00e+01 -1.00e+01 0.00e+00
In both output formats, the left-hand column of numbers
represents the battery voltage at each interval, as it increases
from 0 volts to 100 volts, 5 volts at a time. The numbers in the
right-hand column indicate the circuit current for each of those
voltages. Look closely at those numbers and you'll see the
proportional relationship between each pair: Ohm's Law (I=E/R) holds
true in each and every case, each current value being 1/5 the
respective voltage value, because the circuit resistance is exactly
5 Ω. Again, the negative numbers for current in this SPICE analysis
is more of a quirk than anything else. Just pay attention to the
absolute value of each number unless otherwise specified.
There are even some computer programs able to interpret and
convert the non-graphical data output by SPICE into a graphical
plot. One of these programs is called Nutmeg, and its output
looks something like this:
Note how Nutmeg plots the resistor voltage
v(1) (voltage
between node 1 and the implied reference point of node 0) as a line
with a positive slope (from lower-left to upper-right).
Whether or not you ever become proficient at using SPICE is not
relevant to its application in this book. All that matters is that
you develop an understanding for what the numbers mean in a
SPICE-generated report. In the examples to come, I'll do my best to
annotate the numerical results of SPICE to eliminate any confusion,
and unlock the power of this amazing tool to help you understand the
behavior of electric circuits.
Contributors
Contributors to this chapter are listed in chronological order of
their contributions, from most recent to first. See Appendix 2
(Contributor List) for dates and contact information.
James Boorn (January 18, 2001): identified sentence
structure error and offered correction. Also, identified discrepancy
in netlist syntax requirements between SPICE version 2g6 and version
3f5.
Ben Crowell, Ph.D. (January 13, 2001): suggestions on
improving the technical accuracy of voltage and charge
definitions.
Jason Starck (June 2000): HTML document formatting, which
led to a much better-looking second edition.
Lessons In Electric Circuits copyright (C) 2000-2002 Tony
R. Kuphaldt, under the terms and conditions of the
Design
Science License.
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