(
industry is starting to move toward a 3.3-volt power supply)
. In digital systems, we assign logic 1 to "high" voltages and 0 to "low" voltages, but these assignments are somewhat arbitrary. For TTL technology of the kinds described in this book, a voltage in the range of 0 to 0.4 volts is interpreted as logic 0, while 2.5 to 5.5 volts is interpreted as a logic 1. Voltages outside these ranges are not guaranteed to be interpreted as either a 0 or a 1.Charge measures the number of positive or negative charges at a given point in the circuit and is described in units of coulombs. One coulomb is equivalent to the charge on electrons. Voltage is the difference in electrical potential between two points in a circuit and is measured in volts. At a given point in a circuit, current is the change in charge as a function of time. Thus, one ampere is defined to be one coulomb per second.
Resistance Figure B.1 introduces two important new quantities: resistance and capacitance. Resistance is the "friction" that limits current. Doubling resistance cuts the current in half. When two resistors are connected in series, one immediately following the other, their resistances add. Placing two resistors in parallel results in a resistance that is less than the component resistances. To be more precise, if the resistances, measured in ohms, are R1 and R2, the parallel resistance will be .
A short circuit is a path of conductors with no (
or very low)
resistance. An open circuit is a conductive path with infinite resistance. Semiconductor materials make it possible to construct connections between two points that can be varied between low and high resistance.
One of the most important expressions for analyzing electrical circuits is Ohm's law (
for the German scientist Georg Simon Ohm)
. It describes the relationship between voltage (
V)
, current (
I)
, and resistance (
R)
as follows:
To understand this relationship, let's consider the water analogy again. V is the height of the waterfall. We can think of R as inversely proportional to the diameter of a water pipe: a high resistance corresponds to a narrow pipe, a low resistance to a wide pipe. A narrow pipe restricts the flow more than a wide pipe. With a high resistance, current is reduced, because fewer electrons can move through the conductor per unit time. By reducing the resistance (
that is, increasing the cross section of the pipe)
, we increase the flow of electrons.
An alternative formulation of Ohm's law allows us to describe resistance as a function of voltage and current: R =
V/I. Thus, if a power supply provides voltage V and the current is measured as I, then the resistance of the circuit being driven by the power supply is R.
Capacitance Capacitance is the ability to store charge and is measured in units of farads (
named for the great 19th-century British scientist Michael Faraday)
. A capacitor is a device with two parallel conducting plates separated by a nonconducting material. Placing negative charges on one plate will attract positive charges to the other plate. A capacitor uses current to charge the plates up slowly to a new voltage. Once charge is stored, the capacitor can also provide a "discharge" current to the rest of the circuit. Thus, capacitors are often used to smooth out variations in the current provided by the circuit's power supply.
Continuing with our water analogy, a capacitor behaves much like a water holding tank. A hole at the bottom of the tank provides a steady "outflow" of current, even though the inflow may be sporadic.
Charge, voltage, and capacitance are related by
Charge is equal to capacitance times voltage. By placing a voltage V across a capacitor of C farads, we can store a charge of Q coulombs.
RC Delay There is an interesting relationship between time, resistance, and capacitance. Consider how long it takes to charge up a discharged capacitor.
Figure B.2 shows a possible setup. In the schematic, the voltage source is labeled V, the resistor R, and the capacitor C.
We assume that the capacitor is completely discharged and the switch is in the open position. When the switch is closed, the power supply begins to charge up the capacitor toward the voltage Vchg. If you measure the voltage across the capacitor with a voltmeter, initially the voltage changes very quickly, but then it slows down.
There is a precise relationship between the resistance and capacity of the circuit and the time it takes to charge the capacitor. It is directly related to , also known as the RC time constant (
it may seem strange that ohms times farads is seconds, but this is the case)
. After one RC delay, the capacitor is charged up to slightly more than 60% of its final value. After two RC delays, it reaches almost 90% of its final value. It takes five RC delays before the capacitor reaches 99% of its final value. This is shown in Figure B.3.
RC delays play an important role in determining the true performance of digital circuits. Even though wires are excellent conductors, they do present some resistance to the current flow. But even more important, wires introduce capacitance: a wire forms one plate of a capacitor whose second plate is the circuit board itself. Changes in voltages on wires require this capacitance to be either charged or discharged, and this translates into a significant source of delay in real circuits.
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