0195136047.pdf

592 ROTATING MACHINES

The line-to-line excitation voltage for machineAis

√

3

√

4. 62 + 1272 = 8 .26 kV.

E ̄fB=V ̄t+I ̄BZ ̄B=( 6. 6 /

√

3 )+( 131. 1 −j 124 )( 0. 4 +j 12 )× 10 −^3

= 5. 35 +j 1 .52 kV per phase

Power angleδB=tan−^1 ( 1. 52 / 5. 35 )= 15 .9°

The line-to-line excitation voltage for machineBis

√

3

√

5. 352 + 1. 522 = 9 .6kV.

The corresponding phasor diagram is sketched in Figure E13.3.3(b).

IA IB

ZA ZB

IL

+

−

EfA

+

−

EfB

+

−

Vt Load

(a)

Vt

(b)

δB

φB

δA

φA

IA

IAZA

IBZB

IB

EfA

EfB Figure E13.3.3

Steady-State Stability

The property of a power system that ensures that it will remain in equilibrium under both normal

and abnormal conditions is known aspower-system stability. Steady-state stabilityis concerned

with slow and gradual changes, whereastransient stabilityis concerned with severe disturbances,

such as sudden changes in load or fault conditions. The largest possible flow of power through

a particular point, without loss of stability, is known as thesteady-state stability limitwhen

the power is increased gradually, and as thetransient-stability limitwhen a sudden disturbance

occurs.

For a generator connected to a system that is very large compared to its own size, the system

in Figure 13.3.5 can be used. The power-angle equation (neglecting resistances) for the system

under consideration becomes