AC
Waveforms
When an alternator produces AC voltage, the voltage
switches polarity over time, but does so in a very particular manner. When
graphed over time, the “wave” traced by this voltage of alternating polarity
from an alternator takes on a distinct shape, known as a sine wave
In the voltage plot from an
electromechanical alternator, the change from one polarity to the other is a
smooth one, the voltage level changing most rapidly at the zero (“crossover”)
point and most slowly at its peak. If we were to graph the trigonometric
function of “sine” over a horizontal range of 0 to 360 degrees, we would find
the exact same pattern as in Table below.
The reason why an electromechanical
alternator outputs sine-wave AC is due to the physics of its operation. The
voltage produced by the stationary coils by the motion of the rotating magnet is
proportional to the rate at which the magnetic flux is changing perpendicular
to the coils (Faraday's Law of Electromagnetic Induction). That rate is
greatest when the magnet poles are closest to the coils, and least when the
magnet poles are furthest away from the coils. Mathematically, the rate of
magnetic flux change due to a rotating magnet follows that of a sine function,
so the voltage produced by the coils follows that same function.
If we were to follow the changing voltage produced by
a coil in an alternator from any point on the sine wave graph to that point
when the wave shape begins to repeat itself, we would have marked exactly one
cycle of that wave. This is most easily shown by spanning the distance between
identical peaks, but may be measured between any corresponding points on the
graph. The degree marks on the horizontal axis of the graph represent the
domain of the trigonometric sine function, and also the angular position of our
simple two-pole alternator shaft as it rotates:
Since
the horizontal axis of this graph can mark the passage of time as well as shaft
position in degrees, the dimension marked for one cycle is often measured in a
unit of time, most often seconds or fractions of a second. When expressed as a
measurement, this is often called the period of a wave. The period of a wave in
degrees is always 360, but the amount of time one period occupies depends on the
rate voltage oscillates back and forth.
A more popular measure for describing the
alternating rate of an AC voltage or current wave than period is the rate of
that back-and-forth oscillation. This is called frequency. The modern unit for
frequency is the Hertz (abbreviated Hz), which represents the number of wave
cycles completed during one second of time. In the United States of America Europe , where the power system frequency is 50 Hz, the AC
voltage only completes 50 cycles every second. A radio station transmitter
broadcasting at a frequency of 100 MHz generates an AC voltage oscillating at a
rate of 100 million cycles every second.
Prior to the canonization of the Hertz
unit, frequency was simply expressed as “cycles per second.” Older meters and
electronic equipment often bore frequency units of “CPS ”
(Cycles Per Second) instead of Hz. Many people believe the change from
self-explanatory units like CPS to
Hertz constitutes a step backward in clarity. A similar change occurred when
the unit of “Celsius” replaced that of “Centigrade” for metric temperature
measurement. The name Centigrade was based on a 100-count (“Centi-”) scale
(“-grade”) representing the melting and boiling points of H2O, respectively.
The name Celsius, on the other hand, gives no hint as to the unit's origin or
meaning.
Period and frequency are mathematical
reciprocals of one another. That is to say, if a wave has a period of 10
seconds, its frequency will be 0.1 Hz, or 1/10 of a cycle per second:
An instrument called an oscilloscope, Figure below, is
used to display a changing voltage over time on a graphical screen. You may be
familiar with the appearance of an ECG or EKG (electrocardiograph) machine,
used by physicians to graph the
oscillations of a patient's heart over time.
The ECG is a special-purpose oscilloscope expressly
designed for medical use. General-purpose oscilloscopes have the ability to
display voltage from virtually any voltage source, plotted as a graph with time
as the independent variable. The relationship between period and frequency is
very useful to know when displaying an AC voltage or current waveform on an
oscilloscope screen. By measuring the period of the wave on the horizontal axis
of the oscilloscope screen and reciprocating that time value (in seconds), you
can determine the frequency in Hertz.
Voltage and current are by no means the
only physical variables subject to variation over time. Much more common to our
everyday experience is sound, which is nothing more than the alternating
compression and decompression (pressure waves) of air molecules, interpreted by
our ears as a physical sensation. Because alternating current is a wave
phenomenon, it shares many of the properties of other wave phenomena, like
sound. For this reason, sound (especially structured music) provides an
excellent analogy for relating AC concepts.
In musical terms, frequency is equivalent
to pitch. Low-pitch notes such as those produced by a tuba or bassoon consist
of air molecule vibrations that are relatively slow (low frequency). High-pitch
notes such as those produced by a flute or whistle consist of the same type of
vibrations in the air, only vibrating at a much faster rate (higher frequency).
Figure below is a table showing the actual frequencies for a range of common
musical notes.
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