字幕列表 影片播放
-
Hello everybody, till now we had been studying about one very specific two port device and
-
that was the transformer; transformer as you understand we discussed it quite early was
-
one of the two port devices that we were supposed to discuss and it takes the electrical energy
-
from one side called the primary and delivers the electrical energy on another port called
-
the secondary and that is also the electrical energy and we modelled the transformers, studied
-
its equivalent circuit and got to know how it operates the principles of the transformers
-
and the various non-idealities which go up to make a practical transformer.
-
Today we shall begin our discussion of another two port device which is the DC machine. The
-
DC machine is also a two port device like a transformer. However, it has one fundamental
-
difference and that is the voltage or the effort on one side is related to the flow
-
or the through variable of the other port. Likewise, the flow on the electrical side
-
is related to the across variable or the potential variable or the effort variable on the port
-
two side.
-
And another point to be noted is that in a DC machine one port is electrical in nature
-
meaning the quantities that are going to be applied to one port are electrical quantities
-
and the quantities that are applied in the other port are the mechanical quantities because
-
it is in the mechanical domain mechanical rotational domain so torque and omega will
-
be the effort and flow variables that is the potential and the through variables, potential
-
of the kinetic variables and in the case of the electrical domain it will be voltage and
-
the current as usual.
-
Hence, we are going to discuss another two-port device called the DC machine. There is going
-
to be energy which gets energy which flows into the machine through one port and we will call that was port 1
-
and energy flows out through another port and that is called port 2.
-
One port is electrical in nature meaning port 1 let us say is electrical domain, port 2
-
is in the mechanical domain mechanical rotational domain. This means the potential variable
-
and the kinetic variable on the electrical side is the voltage e and the current i in amps,
-
volts and amps, the product is going to be the watts and the potential variable on this
-
side is torque in Newton meter and omega in radians per second. So this is volts, this
-
is amps, this is torque in Newton meter and this is radian per second.
-
So e on one side, torque on the other side are the effort variables or potential variables,
-
i on the electrical side, omega on the mechanical side are the flow or the kinetic variables;
-
the product of effort to flow on each side is always going to be watts that is the power
-
flow. Now, if the energy is flowing in this direction as shown which means from the electrical
-
to the mechanical side then the same device is called a motor. If the energy is flowing
-
from port 1 to port 2 that is the electrical energy is converted into mechanical energy
-
and used for driving something then the DC machine is called the motor. The same instrument
-
or the equipment can be used in a way wherein the energy flows from the mechanical to the
-
electrical meaning something rotates the mechanical shaft of the machine and that is going to
-
induce the electrical electrical side parameters and therefore the energy from the mechanical
-
side can flow that is energy from the mechanical side can flow to the electrical side and such
-
under such conditions the device is called a generator.
-
as the as the effort On the effort on the flows on the electrical side are DC values
-
the motor and the generator both in the case of motor and the generator the machine is
-
called a DC machine.
-
This is the machine that we are going to focus now and try to understand its principle of
-
operation, the basics, the concepts what makes it happen, what makes it rotate, what makes
-
it generate. First we consider the DC machine as a generator so we discuss the DC generator
-
and the same machine will be later discussed as a motor that is a transverse energy from
-
the electrical to the mechanical domain; most the principles that we study about the DC
-
machine as a generator will also be applicable to the same machine which will be in the motoring
-
mode. So these two functions of the DC machine we will try to focus in this class and the
-
coming classes. but before that we need to know one or two small principles like we had
-
the Faraday's law of electromagneticmagnetism in the case of the transformers which form
-
the bases, here also of course we will be using Faraday's laws of electromagnetism because
-
the energy is passing now through three domains. You see that the energy.......... let us say
-
if it is in the case of the generator, ultimately you will need to have the energy in the electrical
-
domain, the energy emanates from the mechanical domain as far as this equipment is concerned
-
and it passes through the electrical domain through an intermediary medium and that is
-
the magnetic domain. So energy passes from the mechanical domain into the magnetic domain
-
and from the magnetic domain to the electrical domain. Therefore, three domains are involved.
-
And in the case of motor the energy emanates from the electrical domain and goes into the
-
magnetic domain and then from the magnetic domain it goes into the mechanical domain
-
and causes the mechanical movement that would be the green arrows indicate the motoring
-
direction for the energy flow.
-
You see that electrical domain to the magnetic domain, magnetic domain to electrical domain
-
the principles here are very similar to that of a transformer. All the transformer principles
-
the Faraday's laws or the electromagnetics all those things are valid. There are few
-
rules that we need to know form mechanical to magnetic domain and that is one is of course
-
the Faraday's law and another is the lorentz force lorentz force. These two laws are applicable
-
in this transformation of this domain.
-
Now let us take let us take a piece of magnet and let us call it as north pole and somewhere
-
there on the left side you will see the south pole for that piece of magnet. Let us take
-
another piece of magnet and let me give it some space let us take another piece of magnet
-
and place it at some distance in line with the north pole but the south pole facing the
-
north pole and this has a north pole also of course because no magnetic element can
-
be with an isolated pole so it has its own north and south poles. But we are interested
-
in this that is until here
-
Now here if you see the magnetic lines of force this is at quite some distance it is
-
not quite near it because this is much much further than the distances that we are indicating
-
here so that this north pole does not have much interaction with the field lines which
-
are occurring here.
-
Now if we take the field lines there is a flux from the north to the south, it starts
-
going from north to the south, it is quite strong north to south. But in this direction
-
in this direction the field in an orthogonal direction is zero. is zero Now in an arbitrary
-
direction at an angle the field is going to exist but it is going to keep decreasing;
-
let us say we take the we we draw a circle let me draw a circle as shown like that so we have a circle here and if one travels
-
along the periphery of the circle at this point the field is strong on positive at a
-
point here the field this is at a point it is orthogonal to this north south axis and
-
the field there is zero in that direction, at any other direction let us say at when
-
when we are at a point here then the field field will field will be a bit reduced compared
-
would be a bit reduced compared to the position on this because it is not directly in line
-
and then if we take a point somewhere here the field will still further be reduced and
-
still further if we take a point somewhere here the field is positive still but still
-
further reduced and so on till it becomes zero at this point.
-
And then further if I take a consider a point on this circle circumference here in that
-
direction the field starts becoming negative because if we consider a point here with a
-
respect to that point the field is going to the point not away from the point and therefore
-
corresponding to this point the field direction is negative and it is shown by this negative
-
arrow. And as it as this point started in the circumference as this point starts travelling
-
like this this would be going in this fashion with increasing field gradually till it becomes
-
maximum and negative at this point.
-
So you see that there is a the field goes in this fashion in a sinusoidal fashion here.
-
Now with a maximum when it is at the north pole negative maximum when the position is
-
at when a point is at the south pole, zero at both the orthogonal points. So when the
-
point starts moving at this point we see again the mirror image of this and then when this
-
starts moving again towards the orthogonal axis you see the field decreasing field starts
-
decreasing until it is zero at the orthogonal axis and as the point further continues it
-
becomes positive that is this is the positive direction, this is zero, this is the positive
-
direction so field again changes direction and you see that radially there is different
-
amplitudes till it reaches the positive maximum when the point has again reached this point.
-
So you see that if we if there is a point which is situated on the circumference of
-
the circle starting from the north pole the point located near the north pole if the field
-
is moving away from the point it is we are putting putting it on the right side of this
-
axis and the field is on the uh on the south pole the field is entering the point and then
-
that is considered as negative. So a point which moves around the circumference like
-
that starts with the field which is positive and then keeps decreasing as the point is
-
moving along the axis there decreasing in this sense till it becomes zero and then it
-
goes negative in this portion of the segment keeps going so on till the field is negative
-
maximum till it is negative maximum as shown here nearest to the south pole point and as
-
the point traverses along the circumference towards again the orthogonal axis this traverses
-
the amplitude starts reducing further again till it becomes zero when it is at the when
-
the point is at the orthogonal point and then this goes again in this direction changes
-
direction and becomes positive max when the field again goes to this point. This is how
-
the field would look like when a point traverses on the circumference as shown here when we
-
place a north and south pole. So this would be the zero of the field phasor the field
-
vectors. So this would be the picture of the field vector field vector spatial picture.
-
Now let us have a north pole and a south pole and let me have a conductor with some as such there is no such current
-
in the conductor let us let us say that there is a field which is existing from north to
-
south in this direction. Now this is a conductor. Now this conductor if it is stationary the
-
field that is linking the conductor is also constant, there is no d phi by dt so as there
-
is no d phi by dt there is no induced voltage in the conductor and therefore there is no
-
current flow in the conductor.
-
If the field is changing, if the amplitude of the flux here, amplitude of the flux phi
-
here is changing then there is a d phi by dt and this results in an induced emf in the
-
conductor which will result in a current flow through the conductor in a specific direction.
-
Therefore, what is essential is a changing field for a current for a voltage to be induced
-
in the conductor and thereby a current to flow in the conductor.
-
There are two ways in which to produce a changing field as far as the conductor is consider
-
considered concerned. Let us say the conductor is fixed at a point. Now the flux phi here
-
can change with respect to time; flux is the function of time, then amplitude here changes
-
and therefore d phi by dt is finite not zero which will induce a voltage across the conductor
-
and thereby a current to flow. The other way is to have flux fixed, flux is fixed, the
-
flux amplitude is fixed; you have a permanent manner north and south pole and therefore
-
the distant the distance between them is also fixed and therefore the flux phi is fixed.
-
Under such condition the only way that you can have a change in flux is of the conductor
-
moves. If the conductor moves let us say to this position then the flux at that position
-
which is at a radial angle is going to be lesser and if it is moves still further the
-
flux is going to be lesser, if it is at the orthogonal axis the flux there is going to
-
be zero and let us say it continues to move. So the flux amplitude that is going to cut
-
the conductor is going to keep changing as the conductor moves along the circle. so that
-
is Therefore, the moving to the conductor is going to give you the d phi by dt which
-
is going to induce a voltage and thereby a current to flow. This is the other method
-
in which induced emf can also be produced in the conductor.
-
In the case of DC machines the flux here is kept constant by means of the fixed permanent
-
magnets let us say or something that produce constant flux and thereby the only way that
-
you can produce an induced emf in this conductor is by moving the conductor along the periphery
-
which means that this conductor is going to see varying amplitudes of the flux at different
-
amplitudes different points on the circumference of the circle and therefore a d phi by dt
-
and therefore an induced emf and therefore a current to flow through the conductor. This
-
comes by from the Faraday's laws of electromagnetism where you know that the induced emf which
-
is equal to Nd phi by dt.
-
An alternative expression in terms of the conductor length can also be derived which
-
is.......... let us just modify the................ and then we have this, these are the magnets
-
and then of course there is the conductor, so this conductor is positioned like this
-
and then you have all the flux lines linking the north and the south poles.
-
Now if this conductor is having a length L and then there is a cross section area A c
-
and therefore flux by A c is going to be the magnetic flux density B and then if the conductor
-
is moving at some speed let us say V is the velocity in meters per second at which the
-
conductor is moving cutting across the flux then the voltage induced is also given by
-
B the flux density which is a constant of course in this case because phi is a constant,
-
A c is a constant, L L is a constant again because this length of the conductor and B
-
which is the velocity at which this conductor is moving in meters per second and this is
-
what is cutting the flux and therefore as it is moving it is at various radial distances
-
angular distances from the centre and thereby the flux amplitudes are going to be varying
-
at different positions and that is going to cause the d phi by dt effect the d phi by
-
dt effect here in meters per second and it is going to result in a induced emf in the
-
conductor.
-
So, the induced emf of the conductor this gives induced emf in the coil which has N
-
turns, this gives the induced emf in the conductor in the conductor which has length L moving
-
at speed V meters per second. So both are actually one and the same law Faraday's law
-
of electromagnetism whereas one is with respect with reference to the coil the other is with
-
reference to the conductor.
-
So now we start again with a north pole here and have a south pole here and let me also
-
have a circular marking which gives the periphery in which the conductor is going to rotate
-
is going to move about. So let us now have a conductor which is positioned like this.
-
So once we have the conductor this single conductor position like that now let us see
-
the current through the conductor as it is moving along this moving along this field
-
here. So as it moves let us also take the position consider an imaginary no let me draw
-
about a different colour consider an imaginary XY axis, this is spatial this is spatial axis
-
spatial coordinate system, so when the conductor is in this position the flux is full max and
-
the conductor starts rotating from here to this point moves from here to this point,
-
the flux at these points are gradually decreasing until it becomes zero here. So you have the
-
flux which reduces becomes zero at this point. Then form here to here the conductor is at
-
the south pole, the flux is at negative max and then when it further goes the flux keeps
-
moving in this fashion, zero again at this point and then when it again moves here the
-
flux value is back again to its positive max; this is the zero as far as the flux phi m
-
is concerned.
-
So this is the alpha axis and the beta axis in the special coordinate system. Now, when
-
the fluxes at this point we are talking of this maximum therefore you have the induced
-
emf e which is equal to Bℓv the B is maximum at this point the induced emf is maximum and
-
therefore the current which is going to flow through the external load is also going to
-
be maximum. So, if we now project this on that temporal axis let me now draw the amplitude
-
of e the induced emf with respect to time. So as it is at this point let us call this
-
as a so this point is a that we are going to begin, this is at zero sorry this is at
-
peak let me........ so it is at this point this is zero so this is at E max then it rotates
-
90 degrees and it becomes zero here and then from this is point b, this is point a, this
-
is point b corresponding to the spatial is point c and d. So from b to c from b to c
-
this is going negative, so this starts going negative and reaches the maximum point c in
-
the other direction negative direction that is here. And then from c to d it again becomes
-
zero in the orthogonal axis, axis orthogonal to the alpha axis which is along the north
-
south pole direction and then from there this is point d and then again d to a, this again
-
is point a and it comes back to......
-
So this keeps going on and on, this is for one complete cycle of rotation. You see that
-
you get an almost sinusoidal voltage that gets induced on the conductor as the conductor
-
is moved from a to b b to c c to d and so on. Now this gives the basis for generating
-
some voltage from the mechanical rotation of a conductor to an electrical induced voltage.
-
So let us now form a device like this.
-
Let us have the north pole like that. So this is our north pole this is our north pole and
-
let us have our south pole. So this is our south pole. So you have flux lines from north
-
to the south.
-
Now let us draw a coil right through here. So, we have a conductor of length L, there
-
is a conductor which is this, there is also another conductor which flows through like
-
that so this completes the circuit. So let us have some mechanism whereby I will have
-
a ring I will have a ring here so let me have the ring in a different colour so let us have
-
a ring like this and let us solder this wire on to that, it is soldered. Likewise, let
-
me also have a ring for the other wire also and let me solder this to this. We have this wire which is made
-
in the shape of this coil here, the two ends are soldered to rings two rings and let us
-
call this one as ring A and ring B and to these rings let us............... just we
-
have two carbon brushes like this which are just touching these rings. We have two carbon
-
rings and these carbon brushes are making only spring contact with that one and through
-
this we bring out the leads and then we can now connect a load resistance. This is the
-
load.
-
We have a very simple DC no we have a very simple generator not a DC general generator
-
which generates AC signal. Let us look at the operation of this one. Let us say that
-
this coil is moving rotating. So by some mechanism we are going to provide energy mechanical
-
energy such that this whole coil is made to rotate about an axis. So this whole coil is
-
rotating about this axis that is let us have this axis so the whole coil is rotating ago
-
along the axis the blue line is shown here.
-
Now this conductor here when it is at the north pole this is going to have a positive
-
field as we saw before positive max field and let us say the current is going to be
-
induced in this direction i, there is a current i which is going to be induced in this direction
-
and this conductor is closest to the south pole and this is going to have a negative
-
max field and there is going to be a negative current of other direction same amplitude
-
going to be induced in this. Now this is in a perpendicular direction this is along the
-
field this portion of the conductor does not cut the field does not see any differential
-
flux amplitudes throughout its rotation and therefore there is not going to be any induced
-
emf on this line, there is not going to be any induced emf on this line and this line.
-
So these two are going to have currents which are going to get induced one in this direction
-
and one on that direction and this is fortunate for us because we have drawn the coil such
-
that current can flow like that through this coil flows through this flows through this
-
coil and comes out through this. So, as these slip rings, that is these are called the slip
-
rings these rings which are soldered to the coil ends along with the coil are rotating
-
it is brushing or making contact with these brushes which are fixed of course. So it is
-
rubbing against these brushes which means it is in constant contact with the brush.
-
So a current with current this current which flows through here like this, comes into contact
-
through this brush, flows through this external load and then flows in in this direction and
-
then again flows into the other coil a through this ring and the soldered coil end which
-
completes the circuit and thereby you get a output here induced output here.
-
So as the whole coil is rotated we see that we see that the voltage across the load e
-
load which is the induced emf across the brushes starts with................ now in this position
-
it will be having a maximum north and.................. because the north and the south are going
-
to produce this leading currents and as it starts rotating and takes an orthogonal plane
-
this is going to pass through zero because when the coil is perpendicular in a plane
-
which is perpendicular to the plane which is right now shown it will be zero because
-
there is no flux in the perpendicular plane and then when its starts again rotating towards
-
further towards the south pole sorry this this portion rotating towards the south pole
-
it starts going in the other direction and then again when it becomes perpendicular to
-
the existing direction orthogonal direction there is no flux and then so on it keeps going
-
like this.
-
so when the when the flux When the flux is in this position the position which is which
-
is like this let me let me remove all these things let it be easier for you to.... now I will show
-
it in a different colour let us say the coil has now taken the position which is like that
-
and this is gone like that that is this is the vertical position probably it is confusing......
-
Let me redraw that one, it is better to look at it like this. Let me make some space here.
-
Let us draw the four possible modes in 2D so that you get a good idea.
-
This is north, this is south; north pole south pole, the north pole south pole, the north
-
pole and the south pole. Now we are going to show the conductors in 2D as just the cross
-
section when you cut the section of the coil and it is going to be in this position and
-
then rotates again and comes into this position and rotates and comes into this position.
-
So let me call this one as coil side a 1 a 2 a 1 a 2 a 2 a 1 a 1 a 2.
-
Therefore, if you look back to the previous figure this is a 1, this is a 2 and the current
-
going into the page we are going to put X mark like that and coming out of the page
-
is like this. So, as the coil has rotated as the coil has rotated 90 degrees you see
-
that there is no current flowing in this position because the induced emf is zero and the coil
-
further rotates in the other direction which makes this is in this direction. However,
-
the direction in a 1 and a 2 have interchanged; you see that the direction has changed in
-
a 2 and so in a one and therefore we are showing it as the negative direction here this portion
-
shown as the negative direction and when it comes again to this point it again becomes
-
zero, no current flow in any of the coil sides and then from here it shifts here. So this
-
is position 1 position 2 position 3 position 4 and then back again to position 1 2 3 4
-
so on it keeps flowing in this fashion.
-
These are the various positions the four important positions in the motor in this particular
-
equipment. So what we have here is a generator but it generates an AC waveform. How do we
-
generate a DC waveform from this; means how do we rectify it. So, if we pass it through
-
a rectifier we get from the AC waveform that the AC induced voltage a DC. But we are not
-
going to build the rectifier using diodes but it will be built in along with the motor
-
here.
-
So let us make a slight modification in the way the motor is built. Let us have again
-
the north pole and the south pole and let us have up coil here. Now this coil is shown like this in this fashion. See the
-
poles can of course be extended
-
and we have the north and the south pole like this. Now this coil is now connected to the rings in this
-
fashion. So let us have a ring in this fashion. Now this portion is........ this one end of
-
the coil is now soldered to this. Probably we will solder it from the inside so that
-
the brushes.......... so we solder one end of the coil to this and the other end of the
-
coil is soldered to in this fashion let us say.
-
There is a vertical split in the ring such that this portion of the ring does not make
-
contact with this portion of the ring and then we still have the brushes we still have
-
the brushes like that which is making contact we still have the brushes which is making
-
contact and it is from the brushes we are going to take it to the external load like this.
-
So now what happens we have the coil side a 1 coil side a 2. Now this right now this
-
is going to induce a current in this direction here and in this direction here flows through
-
the external circuit and the current flows through this coil. Now as the coil is rotating
-
and comes in an orthogonal plane it becomes zero the voltage becomes zero and starts going
-
negative. So when this has turned 90 degrees these two splits are going to be at around
-
the centre of the brush and then on further rotation this split that is let us say this
-
is a 1 and this is a 2 portion of the ring so a 2 ring a 2 portion of the ring is going
-
to be in contact with this left brush and a 1 portion is going to be in contact with
-
this. But at that point when it has crossed over the orthogonal plane there is a reversal
-
in the current for a 2 and a 1 and therefore a 2 becomes positive and a 1 becomes negative
-
therefore you would see in the time axis temporal axis time versus the induced emf versus the
-
induced emf e here so it starts with a peak like that and then the moment it comes to
-
zero here when it is on the orthogonal plane, flux is zero and now on further movement flux
-
would actually have gone negative but here the other ring is now making contact with
-
this brush, this the ring which was positive is now making contact with the other brush
-
and therefore there is a reversal in the contacts with the brush which is again going to make
-
the current through the load in the same direction and this is going to go like that and so on
-
in this fashion.
-
So there is a rectification which is which has come about due to the way in which this
-
ring has been made, this is called the commutator commu tator. The way the ring was formed in
-
this case in the AC motor this is called the slip ring the slip ring. So the commutator
-
can be used for obtaining a rectifier waveform at the output and thereby we get a unidirectional
-
induced voltage and therefore that would be a DC output. Therefore this machine with the
-
commutator even though the current through the coil is both direction that is AC because
-
of the external commutator the voltage across the external load is unidirectional the currents
-
through that one is also unidirectional and therefore this can be considered as a DC generator.
-
We stop here and continue in the next class consolidating the concepts of the DC generator
-
further. Thank you.
