EET 421 POWER ELECTRONIC DRIVES Indra Nisja General

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EET 421 POWER ELECTRONIC DRIVES Indra Nisja

EET 421 POWER ELECTRONIC DRIVES Indra Nisja

 • General Concept • Speed Control • SCR Drives • Switched-mode DC Drives

• General Concept • Speed Control • SCR Drives • Switched-mode DC Drives

Advantages of DC motor : Ø Ease of control Ø Deliver high starting torque

Advantages of DC motor : Ø Ease of control Ø Deliver high starting torque Ø Near-linear performance Disadvantages: ü High maintenance ü Large and expensive (compared to induction motor) ü Not suitable for high-speed operation due to commutator and brushes ü Not suitable in explosive or very clean environment

 • The DC drive is relatively simple and cheap (compared to induction motor

• The DC drive is relatively simple and cheap (compared to induction motor drives). But DC motor itself is more expensive. • Due to the numerous disadvantages of DC motor (especially maintenance), it is getting less popular, particularly in high power applications. • For low power applications the cost of DC motor plus drives is still economical. • For servo application, DC drives is still popular because of good dynamic response and ease of control. • Future Trend? Not so bright prospect for DC, especially in high power drives.

 • The field windings is used to excite the field flux. • Armature

• The field windings is used to excite the field flux. • Armature current is supplied to the rotor via brush and commutator for the mechanical work. • Interaction of field flux and armature current in the rotor produces torque.

 • When a separately excited motor is excited by a field current of

• When a separately excited motor is excited by a field current of if and an armature current of ia flows in the circuit, the motor develops a back emf and a torque to balance the load torque at a particular speed. • The if is independent of the ia. Each windings are supplied separately. Any change in the armature current has no effect on the field current. • The if is normally much less than the ia.

Field and armature equations Instantaneous field current : where Rf and Lf are the

Field and armature equations Instantaneous field current : where Rf and Lf are the field resistor and inductor, respectively Instantaneous armature current : where Ra and La are the armature resistor and inductor, respectively The motor back emf, which is also known as speed voltage, is expressed : eg = Kv ω if Kv is the motor voltage constant (in V/A-rad/s) and ω is the motor speed (in rad/sec)

Basic Torque Equation The torque developed by the motor is : Td = Kt

Basic Torque Equation The torque developed by the motor is : Td = Kt if ia Where (Kt = Kv) is the torque constant in V/A – rad/s Sometimes it is written as : Td = Kt Φ ia For normal operation the developed torque must be equal to the load torque plus the friction and inertia, i. e, : where B : viscous friction constant (N-m/rad/s) TL : load torque (N-m) J : inertia of the motor (kg. m 2)

Under steady-state operation, time derivatives is zero. Assuming the motor is saturated For field

Under steady-state operation, time derivatives is zero. Assuming the motor is saturated For field circuit, Vf = I f Rf The back emf is given by: Eg = K v ω i f The armature circuit Va = I a Ra + E g Va = I a Ra + K v ω I f

Steady-state Torque and Speed The motor speed can be easily derived : If Ra

Steady-state Torque and Speed The motor speed can be easily derived : If Ra is a small value (which is usual), or when the motor is slightly loaded, i. e, Ia is small That is if the field current is kept constant, the motor speed depends only on the supply voltage. The developed torque is : Td = K t I f Ia = B ω + T L The required power is : Pd = T d ω

§ From the derivation, several important facts can be deduced for steady-state operation of

§ From the derivation, several important facts can be deduced for steady-state operation of DC motor. § For a fixed field current, or flux (If) , the torque demand can be satisfied by varying the armature current (Ia). § The motor speed can be varied by: – controlling Va (voltage control) – controlling Vf (field control) § These observations leads to the application of variable DC voltage to control the speed and torque of DC motor.

Consider a 500 V, 10 k. W , 20 A rated- DC motor with

Consider a 500 V, 10 k. W , 20 A rated- DC motor with armature resistance of 1 ohm. When supplied at 500 V, the unloaded motor runs at 1040 rev/min, drawing a current of 0. 8 A – Estimate the full load speed at rated values – Estimate the no-load speed at 250 V. Va = Ia Ra + Kv ω If At full load and rated value, At no load and voltage at 250 V (Note : in reality, this equation strictly rad/sec)

 Family of steady-state torque speed curves for a range of armature voltage can

Family of steady-state torque speed curves for a range of armature voltage can be drawn as above. v The speed of DC motor can simply be set by applying the correct voltage. v Note that speed variation from no-load to full load (rated) can be quite small. It depends on the armature resistance. v

Or Shunt and Separately Excited Motor With a constant field current, the flux can

Or Shunt and Separately Excited Motor With a constant field current, the flux can be assumed to be constant. Let (Constant) Series Motor

Base Speed and Field-weakening • Base speed: ωbase the speed which correspond to the

Base Speed and Field-weakening • Base speed: ωbase the speed which correspond to the rated Va, rated Ia and rated If. • Constant Torque region ( w > wbase) Ia and If are maintained constant to met torque demand. Va is varied to control the speed. Power increases with speed. • Constant Power region ( w > wbase) Va is maintained at the rated value and if is reduced to increase speed. However, the power developed by the motor (= torque x speed) remains constant. Known as field weakening.

DC Shunt Motor

DC Shunt Motor

Motor efficiency

Motor efficiency

Example A 500 -V, 60 -hp, 600 -rev/min d. c. shunt motor has a

Example A 500 -V, 60 -hp, 600 -rev/min d. c. shunt motor has a full-load efficiency of 90%. The resistance of the field itself is 200 ohm and rated field current is 2 A. Ra = 0. 2 ohm. Calculate die full-load (rated) current Ia. R and in subsequent calculations, maintain this value. Determine the loss torque. The speed is to be increased up to 1000 rev/min by field weakening. Calculate the Extra resistance, over and above the field winding itself to cover the range 600 -1000 rev/min. Determine the output torque and power at the top speed, assuming that the loss torque varies in proportion to speed. For the magnetisation curve use the empirical expression below, which is an approximation to the curve shape. where the flux ratio is that between a particular operating flux and rated flux. The field-current ratio is that of the corresponding field currents.

 • Say the motor running at position A. Suddenly va is reduced (below

• Say the motor running at position A. Suddenly va is reduced (below eg). The current ia will reverse direction. Operating point is shifted to B. • Since ia is negative, torque Te is negative. • Power is also negative, which implies power is “generated” back to the supply. • In other words, during the deceleration phase, kinetic energy from the motor and load inertia is returned to the supply. • This is known as regenerative braking-an efficient way to brake a motor. Widely employ in electric vehicle and electric trains. If we wish the motor to operate continuously at position B, the machine have to be driven by mechanical source. • The mechanical source is a “prime mover”. • We must force the prime mover it to run faster so that the generated eg will be greater than va.

Braking circuits

Braking circuits

Example 3. 20 A 250 V, 500 rev/min d. c. separately excited motor has

Example 3. 20 A 250 V, 500 rev/min d. c. separately excited motor has an armature resistance of 0. 13 ohm and takes an armature current of 60 A when delivering rated torque at rated flux. If flux is maintained constant throughout, calculate the speed at which a braking torque equal in magnitude to the full-load torque is developed when: (a) regeneratively braking at normal terminal voltage; (b) plugging, with extra resistance to limit the peak torque on changeover to 3 per unit; (c) dynamically braking, with resistance to limit the current to 2 per unit; (d) regeneratively braking at half rated terminal voltage. (e) What terminal voltage would be required to run the motor in reverse rotation at rated torque and half rated speed?

 • SCR “phase-angle controlled” drive - By changing the firing angle, variable DC

• SCR “phase-angle controlled” drive - By changing the firing angle, variable DC output voltage can be obtained. – Single phase (low power) and three phase (high and very high power) supply can be used – The line current is unidirectional, but the output voltage can reverse polarity. Hence 2 - quadrant operation is inherently possible. – 4 -quadrant is also possible using “two sets” of controlled rectifiers. • Switched-mode drive – Using switched mode DC-DC converter. Dc voltage is varied by duty cycle. – Mainly used for low to medium power range. – Single-quadrant converter (buck): 1 - quadrant – Half bridge: 2 -quadrant – Full bridge: 4 -quadrant operation

 • Mains operated. • Variable DC voltages are obtained from SCR firing angle

• Mains operated. • Variable DC voltages are obtained from SCR firing angle control. • Slow response. • Normally field rectifier have much lower ratings than the armature rectifier. It is only used to establish the flux.

Continuous/Discontinuous current • The key reason for successful DC drive operation is due to

Continuous/Discontinuous current • The key reason for successful DC drive operation is due to the large armature inductance La. • Large La allows for almost constant armature current (with small ripple) due to “current filtering effect of L”. (Refer to notes on Rectifier). • Average value of the ripple current is zero. No significant effect on the torque. • If La is not large enough, or when the motor is lightly loaded, or if supply is single phase (halfwave), discontinuous current may occur. • Effect of discontinuous current: Output voltage of rectifier rises; motor speed goes higher. In open loop operation the speed is poorly regulated. • Worthwhile to add extra inductance in series with the armature inductance.

Armature For continuous current, armature voltage is : Armature (DC) current is : Field

Armature For continuous current, armature voltage is : Armature (DC) current is : Field voltage Field

1. Single-Phase Half-Wave Converter Drives for 2. Single-Phase Semiconverter Drives for 3. Single-Phase Full-Converter

1. Single-Phase Half-Wave Converter Drives for 2. Single-Phase Semiconverter Drives for 3. Single-Phase Full-Converter Drives for 4. Single-Phase Dual-Converter Drives for

Armature voltage : Armature (DC) current is : If single phase is used for

Armature voltage : Armature (DC) current is : If single phase is used for field is :

1. Three-Phase Half-Wave Converter Drives for 2. Three-Phase Semiconverter Drives for 3. Three-Phase Full-Converter

1. Three-Phase Half-Wave Converter Drives for 2. Three-Phase Semiconverter Drives for 3. Three-Phase Full-Converter Drives for 4. Three-Phase Dual-Converter Drives for

A separately excited DC motor has a constant torque load of 60 Nm. The

A separately excited DC motor has a constant torque load of 60 Nm. The motor is driven by a full-wave converter connected to a 240 V ac supply. The field constant of the motor KIf = 2. 5 and the armature resistance is 2 ohm. Calculate the triggering angle for the motor to operate at 200 rpm. Assume the current is continuous. For continuous current, and Where Eg is the back emf, i. e and

A rectifier-DC motor drive is supplied by a three-phase, full controlled SCR bridge 240

A rectifier-DC motor drive is supplied by a three-phase, full controlled SCR bridge 240 Vrms/50 Hz per-phase. The field is supplied by a single-phase 240 V rms/50 Hz, with uncontrolled diode bridge rectifier. The field current is set as maximum as possible. The separately excited DC motor characteristics is given as follows : Armature resistance: Ra = 0. 3 ohm Field resistance: Rf =175 ohm Motor constant: KV =1. 5 V/A-rad/s Assume the inductance of the armature and field circuit is large enough to ensure continuous and ripple-free currents. If the delay angle of the armature converter (αa) is 45 degrees and the required armature current is 30 A, • a) Calculate the developed torque, Td. • b) Speed of the motor, ω (rad/s) • c) If the polarity of the field current is reversed, the motor back emf will reverse. For the same armature current of 30 A, determine the required delay angle of the armature converter.

Since field current is maximum, α = 0. (b) Motor speed The armature is

Since field current is maximum, α = 0. (b) Motor speed The armature is supplied by three-phase with αa = 45 o,

Now the polarity of field is reversed, then and also

Now the polarity of field is reversed, then and also

 • DC motor in inherently bi-directional. Hence no problem to reverse the direction.

• DC motor in inherently bi-directional. Hence no problem to reverse the direction. It can be a motor or generator. • But the rectifier is unidirectional, because the SCR are unidirectional devices. • However, if the rectifier is fully controlled, it can be operated to become negative DC voltage, by making firing angle greater than 90 degrees, • Reversal can be achieved by: – armature reversal using contactors (2 quadrant) – field reversal using contactors (2 -quadrant) – double converter (full 4 -quadrants)

Reversal using armature or field contactors DRIVE REVERSING USING ARMATURE OR FIELD CONTACTORS CONTACTOR

Reversal using armature or field contactors DRIVE REVERSING USING ARMATURE OR FIELD CONTACTORS CONTACTOR AT THE ARMATURE SIDE (SINGLE PHASE SYSTEM)

Reversing using double converters Principle of reversal Practical circuit

Reversing using double converters Principle of reversal Practical circuit

A separately excited DC motor has rating 220 hp, 230 Vdc and 2000 rpm.

A separately excited DC motor has rating 220 hp, 230 Vdc and 2000 rpm. Armature voltage supplied by full bridge control rectifier with input voltage Field voltage supplied by diode rectifier with input - constant voltage Kv = 0. 8 V/A - armature resistance Ra = 5 Ohm - field resistanced Rf = 150 Ohm a. Calculate the load requiring torque if b. If armature voltage reduced such that the motor run at a speed of 1200 rpm, calculate the value of and developed torque. Armature current is 10 A

Solution Output of control rectifier for α=0: Output of diode rectifier:

Solution Output of control rectifier for α=0: Output of diode rectifier:

Equation of armature separately excitation DC motor: (1) (2) Substitute (2) into (1): Equation

Equation of armature separately excitation DC motor: (1) (2) Substitute (2) into (1): Equation of field winding of DC motor: So,

Torque requiring by the load is: b. from equation (2)

Torque requiring by the load is: b. from equation (2)

Firing angle ( a) is:

Firing angle ( a) is:

A 50 -hp, 250 -V, 1500 -rpm separately excited dc motor is controlled by

A 50 -hp, 250 -V, 1500 -rpm separately excited dc motor is controlled by a single-phase full wave converter as shown in Figure 1. Field current also controlled by a full wave converter. The field resistance (Rf) is 110 ohm and emf back is proportional to the motor speed (Nm) where Eg=0. 1 Nm. The armature resistance (Ra) viscous friction (B) and no load losses are negligible. The armature inductance and field inductance are sufficient to make the armature and field currents continuous and ripple free. a. Calculate the maximum field voltage (Vf, max) and field current (If, max). b. Calculate the rated load torque of the motor (TL). c. Calculate the maximum armature voltage (Va, max). d. Calculate the rated armature current (Ia, rated). e. If armature current remains the same as in (d) and the field current is reduced such that the motor run at a speed of 2800 rpm, calculate the load torque. f. If the polarity of motor emf back is reversed by reversing the polarity of the field current, calculate: i. the delay angle of the armature circuit converter to maintain the armature current constant at the same value as in (d). ii. the power fed back (P) to the supplying during regenerative braking of the motor in watt. Please Try to Solve This Problem