In case of alternators, the
voltage and current induced are having sinusoidal waveforms. But
practically we can not get sinusoidal waveform when such alternators are
loaded. Due to the loading condition, the generated waveform deviates
from ideal waveform. Such a non-sinusoidal waveform is called complex
wave. By fourier transform this complex waveform can be shown to be
built of a series of sinusoidal waves whose frequencies are integral
multiples of the frequency of fundamental wave. These sinusoidal
components or harmonic functions are called harmonics of the complex
wave.
The
fundamental wave is defined as that component which is having same
frequency as that of complex wave. The component which is having double
the frequency of that of fundamental wave called second harmonic. While
the component which is having the frequency three times that of
fundamental is called third harmonic and so on. The complex waveform
contains both the even as well as odd harmonics. Consider a complex wave
which is represented by,
e = E1m sin(ω t + Φ1) + E2m sin(2ωt +Φ2) + E3m sin(3ωt + Φ3) + ... + Enm sin (nω t + Φn)
where E1m sin(ω t + Φ1) is fundamental component of maximum value E1m having an angle Φ1 from instant of zero of the complex wave. Similarly Enm sin (nω t + Φn) represents nth harmonic of maximum value Enm and having phase angle Φn with respect to complex wave.
Out of the even and odd harmonics a complex wave containing fundamental
component and even harmonics only is always unsymmetrical about x-axis
whereas a complex wave containing fundamental component and odd
harmonics only is always symmetrical about x-axis. In case of
alternators the voltage generated is mostly symmetrical as the filed
system and coils are all symmetrical.
So the generated voltage or current will not have any even harmonics in most of the cases.
The complex waveform of voltage can be analysed experimentally by using
the phenomenon of resonance. If voltage waveform containing harmonic
content is applied to the circuit containing resistance, inductance and
capacitance, then the circuit will resonate at one of the harmonic
frequencies. The voltage drop across the resistance can be analysed by
using an oscillograph. The values of inductance and capacitance can be
changed so that resonance can be obtained at fundamental, third
harmonic, fifth harmonic etc. The voltage on the oscillograph indicates
the presence of particular harmonics.
1.1 Slot Harmonics
The voltage generated in armature winding is derived assuming that the
surface of armature to be smooth. However in practice armature is not
smooth but is made slotted. Due to this slotting certain harmonic
e.m.f.s. of undesirable order are produced.
The reluctance at any point in the air gap depends on whether there is a
slot or teeth in the magnetic path. Since in case of alternators
armature is moving, the teeth and slots alternately occupy positions at
this point. This will vary the reluctance. The ripples will be formed
due to variation of reluctance from point to point in the air gap which
is shown in the Fig. 1. These ripples will not move with respect to
conductors but glide on the distribution of flux. The ripples due to
slotting of armature are always opposite to slots and teeth which are
causing them. Thus the harmonics which are generated in the e.m.f. due
to slotting is called slot harmonics.
It can be seen that the main source of harmonics is the non-sinusoidal
field from which can be made sinusoidal and the harmonics can be
eliminated.
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| Fig. 1 |
The air gap offers maximum reluctance to the path. This air gap if made
to vary sinusoidally around the machine, the filed from would also be
sinusoidal. Even the air gap is made to vary sinusoidally, the field
from can not be sinusoidal due to saturation in iron parts which is
unavoidable. But there should no be high degree of saturation so that
approximately sinusoidal waveform will be obtained.
Thus in general it can be seen that ideal sinusoidal field from is very
difficult to obtain whether the machine is salient pole type or
cylindrical rotor construction rotor construction.
1.2 Harmonics Minimization
To eliminate or minimize the harmonics from the voltage waveform, the
winding must be properly designed. The different ways to eliminate the
harmonics from generated voltage are,
1) Distribution of armature windings :
Instead of having concentrated type of windings, they should be
distributed in different slots. The distribution factor for harmonics is
comparatively less than that of the fundamental and hence magnitude of
harmonic e.m.f. is small.
2) Chording :
The e.m.f. generated in the winding is proportional to cos (x /2) where
is angle of chording and x is order of harmonic. If proper value of
angle of chording is selected then harmonic e.m.f.s can be reduced
significantly.
3) Fractional slot windings
: The output voltage waveform will be free of harmonics by facilitating
the use of fractional slot windings as the distribution factor will be
smaller compared to that with the fundametal.
4) Skewing : Skewing the pole face will help in eliminating the slot harmonics.
5) Large length of air gap : The reluctance will be increased by increasing the air gap and slot harmonics can be reduced.
