ADAMSON UNIVERSITY COLLEGE OF ENGINEERING ELECTRICAL ENGINEERING DEPARTMENT STUDENT NO: SECTION: NAME: PROFESSOR: 865. In symmetrical components, what is the vector sum of 1+a+a2? a = 1<120 = -0.5+j0.866 a2 = 1<240 = -0.5-j0.866 1+a+ a2 = 1 + 1<120 + 1<240 = 1 + (-0.5+j0.866) + (-0.5-j0.866) =0 866. If the load of a wye-connected transformer are: IA = 10 cis (-30) IB = 12 cis 215 IC = 15 cis 82 What is the phase b positive sequence component? IA1 = (1/3) (IA + a IB + a2IC) = (1/3) [10<-30 + (1<120)(12<215) + (1<240)(15<82)] = (1/3) [10<-30 + 12<335 + 15<322] = (1/3) [8.66-j5 + 10.875-j5.071 + 11.820-j9.235] IA1 = 10.45-j6.435 = 12.27<-31.624 IA1 = a2 IA1 = (1<240) (12.27<-31.624) IA1 = 12.27<208.376 867. Given three unbalanced three-phase voltages: VA = 150+j0 V VB = -90-j120 V VC = -120+j90 V Determine VA1 VA = 150+j0 = 150<0 VB = -90-j120 = 150<-126.869 VC = -120+j90 = 150 <143.13 VA1 = (1/3) (VA +a VB + a2 VC) = (1/3) [150<0 + (1<120)(150<-126.869) + (1<240)(150<143.13)] = (1/3) [150<0 + 150<-6.869 + 150<383.13] = (1/3) [150+j0 + 148.923-j17.94 + 137.942+j58.923] VA1 = 145.62 + j 13.66 868. The three-phase unbalanced currents are: IA = 10 cis (-30) IB = 0 IC = 10 cis 150 Find the negative sequence current of phase a. IA2 = (1/3) (IA + a2 IB + a IC) = (1/3) [10<-30 + (1<240) (0) + (1<120) (10<150)] = (1/3) [10<-30 + 0 + 10<270] = (1/3) [8.66-j5 + 0 –j10] IA2 = 2.886-j5 = 5.77<-60 IA2 = 5.77 cis (-60) 869. Given the following currents: IA = 60+j0 A IB = -36-j48 A IC = -48+j36 A Solve for the negative sequence component of IA. IA = 60+j0 = 60<0 IB = -36-j48 = 60<-126.869 IC = -48+j36 = 60 <143.13 IA2 = (1/3) (IA +a2 IB + a IC) = (1/3) [60<0 + (1<240) (60<-126.869) + (1<120) (60<143.13)] = (1/3) [60<0 + 60<113.13 + 60<263.13] = (1/3) [60 + (-23.569+j55.177) + (-7.177-j59.569)] IA2 = 9.751-j1.464 870. The three-phase unbalanced currents are: IA = 10 cis (-30) IB = 0 IC = 10 cis 150 Find the zero sequence current. IA0 = (1/3) (IA1 + IA2 + IA0) = (1/3) [10<-30 + (0) + (10<150)] = (1/3) [8.66-j5 + 0 + (-8.66+j5)] IA0 = 0 871. Given the following currents: IA = 60+j0 A IB = -36-j48 A Solve for zero sequence component of IA. IC = -48+j36 A IA0 = (1/3) (IA1 + IA2 + IA0) = (1/3) [60+j0 + (-36-j48) + (-48+j36)] IA0 = -8-j4 872. The sequence currents of phase a current are as follows: Zero sequence current =12.13 <17.34 Positive sequence current =2.98 <10.06 Negative sequence current =708.26 <-31 Determine phase a current Ia = Ia1 + Ia2 + Ia0 = [2.98<10.06+ 708.26< - 31 + 14.13<17.34)] = 2.934 +j 0.52 + 607.097 – j364.78 +13.487 + j 4.211 = 623.518 – j 360.05 Ia = 720<30 873. The sequence currents of phase a current are as follows: Zero sequence current =0.47 + j1.49 Positive sequence current =18.4 cis (-31.6) Negative sequence current =3.23 cis 168.2 Determine phase a current Ib1 = a2Ia1 = 1<240 * 18.4<-31.6 = 18.4<208.4 = -16.185 – j 8.75 Ib2 = aIa2 = 1<120 * 3.23<168.2 = 3.23<288.2 = 1.009 – j 3.068 Ib0 = aIa0 = 0.47 + j 1.49 Ib = Ib1 + Ib2 + Ib0 = -15.185 – j 8.75 + 1.009 – j3.068 + 0.47 + j1.49 = -14.706 – j10.328 = 17.97<-145 = 18<(360 -145) Ib = 18cis 215 874. The sequence currents of phase a current are as follows: Zero sequence current =0.47 + j1.49 Positive sequence current =18.4 cis (-31.6) Negative sequence current =3.23 cis 168.2 Determine phase c current Ic1 = aIa1 = 1<120 * 18.4<-31.6 = 18.4<88.4 = 0.513 – j 18.39 Ib2 = a2Ia2 = 1<120 * 3.23<168.2 = 3.23<408.2 = 2.153 + j 2.407 Ic0 = Ia0 = 0.47 + j 1.49 Ic = Ic1 + Ic2 + Ic0 = 0.513 + j 18.39 2.153+ j 2.407 + 0.47 + j1.49 = 3.136 + j22.287 + 22.5<82 Ic = 22.5 cis 82 875. Determine the symmetrical components of the line current in line a if one of the in phase impedance of its delta connected load connected across lines ca is removed. The delta load with impedance of 10<0 ohms per phase is supplied from a 220 volts, 6- cycle, 3 phase. Assume a phase sequence of a-b-c. Iab = Vab /Z = 220<0/10<0 = 22<0 =22 A Ibc = Vbc /Z = 220<-120/10<0 = 22<0 =22<-120 A = -11- j19.052 Ia = Iab = 22<0 A Ib = Ibc – Iab = -11 –j19.052 -22 = -33 – j 19.052 = 38.104< -150 A Ic = -Ibc = - (-11 – j19.052) = 22<60 A Ia1 = 1/3 (Ia + aIb + a2Ic) = 1/3 [22<0 + (1<120*38.104<-150) + (1<240*22<60)] Ia1 = 22 – j12.7 = 25.4<-30 A Ia2 = 1/3 (Ia + a2Ib + aIc) = 1/3 [22<0 + (1<240*38.104<-150) + (1<120*22<60)] Ia2 = j 12.7 = 12.7<90 A Ia0 = 1/3 (Ia1 + Ia2 + I0) = 1/3 [22<0 + 38.104<-150 + 22<60] Ia0 = 0 A 876. A star connected balanced load takes 75 A from a balanced 3 phase, 4wire supply. If the two supply lines of the fuses are removed determine the symmetrical components of the line currents after the fuses are removed. Ia = 75<0 A Ib = 0 A Ic = 0 A Ia1 = 1/3 (Ia + aIb + a2Ic) = 1/3 [75<0 + (1<120*0) + (1<240*0)] Ia1 = 25<0 A Ib1 = a2Ia1 = (1<240)*(25<0) = 25<240 A Ic1 = aIa1 = (1<120)*(25<0) = 25<120 A Ia2 = 1/3 (Ia + a2Ib + aIc) = 1/3 [75<0 + (1<240*0) + (1<120*0)] Ia2 = 25<0 A Ib2 = aIa1 = (1<240)*(25<0) = 25<120 A Ic2 = a2Ia2 = (1<120)*(25<0) = 25<240 A Ia0 = 1/3 (Ia1 + Ia2 + I0) = 1/3 [75<0 +0 + 0] Ia0 = 25<0 A Ib0 = Ic0 = 25<0 A 877. A 50 MVA, 33kv/ 11kv, 3 phase, wye delta connected transformer has a 3% impedance. What is the percent impedance at 100 MVA base and 34.5kv base? Zpu2 = Zpu1 (Vbase1 / Vbase2)2 (Sbase2/Sbase1) = 0.03 *(33/34.5)2 * (100/50) = 0.054896 Zpu2 = 5.49% 878. At a certain location of an electrical system, the available short circuit MVA is 10 at 110 kV while its Thevenin’s equivalent reactance is 0.05 pu. Determine the per unit reactance of this point using a base 20 MVA and 115 KV? Solution: Z pu2 = (0.05)(110/110)²(20/10) Z pu2 = 0.09 879. A 13.8 kV/440v, 50 KVA single phase transformer has a leakage reactance of 300 ohms referred to the 13.8 kv side. Determine the per unit value of the leakage reactance for the voltage base. Solution: X pu = (300x50,000)/(13,800) X pu = 0.079 880. A 5 KVA, 2400-120/240 volt distribution transformer when given a short circuit test has 94.2 volts applied with rated current flowing in the short circuited wiring. What is the per unit impedance of the transformer? Solution: Isc = 5000/2400 = 2.083 A Z = 94.2/2.083 = 45.22 Ω ZPU = (2.083X45.22)/(2400) ZPU = 0.0392 881. A 3 phase, 375 KVA, 480 V, 50 HZ, wye connected alternator has an equal positive and negative sequence reactance of 10%. Find the symmetrical fault current if a 3 phase fault occurs at the alternator terminals. Solution: IPU = 1/j.01 = -j10 Ibase = (375X10ᶾ)/(√3 X 480) = 451.05 A IF = 10(451.05) = 4510.5 A KVA = 375/0.1 = 3750 KVA IF = 3750/(√3X0.48) IF =4510.5 A 882. A generator rated 600 kVa, 2400v, 60 cycles, 3 phase, 6 poles and wye connected has 10% synchronous reactance. If a three phase fault occurs, what will be the short circuit current? Solution: IPU = 1/j.01 = -j10 Ibase = (600X10ᶾ)/(√3X2400) = 144.34 A IF = 10X 144.34 IF =1443.4A 883. A 20 MVA, 13.8 KV, 60 HZ, three phase synchronous turbo alternator has a positive, negative and zero sequence reactance of 0.25, 0.35 and 0.15 respectively. If lines b and c are short circuited, determine the sub transient fault current in line b. Assume the alternator is operating at no load and at rated voltage with the neutral of the alternator solidly grounded. Solution: Ibase = (20000000)/(√3X13800) = 836.7 A Ia1 = 1.0/(j0.25+j0.35) Ia1 = -j1.667 pu Ia2 = j1.667 pu Ia0 = 0 Ic = (1<120)(1.667<-90)+(1<-120)(1.667<90)+0 Ic = 2.886 pu Ic fault = 2.886(836.7) Ic fault =2414.7 A 884.) At a certain location in an electric system, the available fault MVA is 400 MVA. A 15 MVA, 34.5 kV/6.24 kV, 2.5% impedance, wye-wye grounded transformer is installed at the location. Determine the short circuit MVA at the secondary side of the transformer. Solution: Sf = √3Vf [(Vt / √3) / (Zf)] Zf = (6.24 x 103)2 / (400 x 106) = 0.097 Ω ZL = 0.064896 Ω Sf new = Vf2 / Zf = (6.24 x 103)2 / (0.16224) Sf new= 240 MVA 885.) two three-phase transformers are connected in parallel at the primary as well as at the secondary sides. One is rated 10 MVA, 34.5/13.8 kV and 4% impedance while the other is rated 7.5 MVA, 34.5/13.8 kV and 5% impedance. The primary tapping point has a 3-phase short circuit MVA of 1000 MVA. Determine the fault current delivered to a 3-phase fault at the secondary side bus bars. Solution: MVAf = MVAc / Z1 pu = 10 / 0.035 = 285.714 MVA If = 285.714 x 106 / √3(13.8 x 103) If = 11,953.41 A 886.) a 100 MVA, 22 kV synchronous turbo generator has positive and negative reactances of o.20 p.u and a zero sequence reactance of 0.05 p.u The neutral of the generator is grounded through a reactor of 0.242 ohm. Determine the ratio of the subtransient current for a single line to ground fault to the subtransient current for a three-phase fault. Assume the generator is operated without a load and at rated voltage. Solution: Xbase = Vbase2 / Sbase = (22,000)2 / (100,000,000) Xbase = 4.48 Ω Ratio = -j5.001 / -j5 Ratio = 1.0 887.) a generator is rated 100 MVA, 15 kV, it is Y-connected, solid grounded and is operated at rated voltage at no-load and is disconnected from the rest of the system. Its positive and negative sequence reactances are each 0.10 p.u and its zero sequence reactance is 0.05 p.u Calculate in ohms of inductive reactance to be inserted in the neutral connection of the generator to limit the fault current for a single line to ground fault to the fault current of a symmetrical three-phase fault. Solution: Xbase = (15,000)2 / (100,000,000) Xbase = 2.25 Ω Xneutral = (0.0167)(2.25) Xneutral = 0.0376 Ω 888.) the reactance of a three-phase alternator is 8 percent. If the alternator is rated 25 MVA at 13.25 kV output voltage, line to phase, solve for the magnitude of the fault current generated when a short circuit occurs between 2 phases at the terminals. Solution: kVAf = KVAc / Xpu = 25000 / 0.08 = 312500 kVA If 3Ф = kVAf / √3 (kVf) = 312,500 / √3 (√3 (13.25) If 3Ф = 7861.6 A IfLL = (√3 / 2) (If 3Ф) IfLL = 6808 A 889.) a 3-phase, 375 kVA, 480 V, 50 Hz, wye connec ted alternator has an equal positive and negative sequence reactance of 10%. Find the unsymmetrical fault current, if a 2-phase fault (line to line) occurs at the alternator terminals. Solutions: Ia1 = 1.0 / j0.1 + j0.1 Ia1 = -j5 pu Ia2 = -Ia1 = j5 pu Ia0 = 0 Ib fault = Ib pu (Ibase) = 8.66(451.05) Ib fault =3906.09 A 890. A 5 MVA, 13.8 kVA , 480 V. 5% impedance transformer is tapped at 13.8 kV line where the Thevenin’s equivalent impedance is 0.5 ohm. Determine the fault current at the primary for a three phase fault at the secondary. %IZ = SZ/V2 Z = (%IZ)(V2) / S = ((0.05)(13.8 x 103)2) / (5x106) Z = 1.9044 ohm Zt = Zth + Z = 0.5 +1.9044 = 2.4044 ohm If = Vf / Zt = (13800/sqrt3) / 2.4044 = 3313.68 A 891. A 10 kVA, 110V, 3 phase, 4 wire, 60 Hz alternator generates 70 volts per phase when excited to give rated at full load. The armature synchronous impedance per phase is 0.2 ohm. What is the current in each phase if the generator terminals are short circuited? If = Vp / Zp = 70 / 0.2 = 360 A 892. At a certain point of the system network the positive, negative and zero sequence impedances are 0.25 pu, 0.25 pu, and 0.3 pu, respectively. The base MVA is 100. The voltage level at that point is 34.5 kV. Determine the zero sequence current for a one line to ground fault. Ia0 pu = Ia1 pu = Ia2 pu Ia0 pu = 1 / 0.25 + 0.25 + 0.3 = 1.25 pu Ibase = 100x106 / sqrt(3) (34.5x103) = 1673.48 A Ia0 = Ia0 pu (Ibase ) = 1.25(1673.38) Ia0 = 2091.81 A 893. In a short circuit analysis, the positive, negative and zero sequence impedances are 0.20 pu, 0.20 pu, and 0.25 pu respectively, using a base MVA of 50. Estimate the fault current on the faulted lines if a double line to ground fault at the 138 kV level occurs. Ia1 = 1 / j(0.2 + (0.2x0.25 )/(0.2+0.25)) Ia1 = -j3.214 Va1 = 0.3572 pu Ia0 = j1.4288 Ia2 = j1.786 Ib = -4.3297 + j2.1428 = 4.831˂153.67 pu Ibase = (50x106) / sqrt(3) (138x103) = 209.184 A If = 4.831(209.183) = 1010.568 A = 1011A 894. A 15 MVA, 6600 V, 60 Hz, y connected synchronous alternator has a positive, negative and zero sequence per unit reactance of 0.20, 0.20, and 0.10 respectively. The neutral of the generator is grounded through a reactor with a per unit reactance of 0.05 based on the generator rating. If a double line to ground fault occurs at the alternator terminals, estimate the current that flows in the reactor. Ia1 = - j3.214 Va1 = 0.3572 pu Ia0 = j1.4288 Ia2 = j1.786 Ib = -4.3297 + j2.1428 Ic = 2.7983 + j1.1607 + ( 1.5467 – j0.892) + j1.4288 Ic = 4.3297 +j2.1428 If = 4.2856(1312.16) = 5623.39 A If = 5623 A 895. In a short circuit analysis, the positive, negative and zero sequence per unit reactance of 0.25, 0.25, and 0.3 respectively. The base MVA is 100. Determine the fault current for a three phase fault at the 115kV level. KVAf = KVAc / Xpu = 100000/0.25 = 1312.18 A If = 400000 / sqrt(3)(115) = 2008 A 896. A 3 – phase 220 – V, Y- connected alternator has a synchronous impedance of 0.15 + j2 ohms per phase. The alternator is connected through a short transmission line whose impedance per wire is 2 + j1 ohms to a Y-Y connected transformer bank whose total equivalent impedance referred to the secondary is 50 + j86.6 ohms. A three – phase load is connected from the secondary side of the bank through a transmission line whose impedance is 50 + j75 ohms per wire. If a symmetrical three – phase fault occurs at the side. How much is the current will flow to the alternator windings. Assume the bank has a transformation ratio of 1:10. Total impedance per phase at the secondary side of the transformer bank: Z2 = (50 + j86.6) + (50 + j75) Z1 = 3.15 + j4.616 = 5.588 cis 55.69o If = E/Zt = 220 sqrt. 3 /5.588 If =22.73 A 897. Three single-phase transformers each rated 50 kVA, 2400 volts primary. 277 volts secondary, four (4) percent impedance have their primaries connected in delta and their secondaries in wye. Calculate the fault drawn if a short circuit occurs between two phases at the secondary terminals. %IZ = SZ / V2 Z = 0.06138 Ω If = VL / 2Z = 277 / 2x0.0138 If = 2256.43 A 898. La Tondena Distillery inc. located in canluabng calamba. Laguna installed an emergency 3-phase generator GM generator is rated 350kVA, 460 volts, 60 Hz with a reactance of 8%. Solve for the symmetrical 3-phase short circuit. KVA = KVA / Xpu = 350/ 0.08 = 4375 kVA If = KVA / sqrt. 3 (KVf) = 4375 /sqrt. (0.46) If = 5491 A 899. A 15 MVA. 34.5 kV / 6.24 kV transformer is connected at an infinite bus. The percent impedance of the transformer is 2.5. What is the current at the 34.5 kV side for a three phase short at the 6.24 kV side? KVAf = KVA / Xpu = 15000 / 0.025 = 600000 kVA If = kVA / sqrt. 3 x kVf = 600000 /sqrt. 3 x 34.5 If = 10040.87 A 900. A three-phase, 3-wire generator Is rated 325kVA, 480 volts, 60 Hz with a reactance of eight percent. Solve for the fault current delivered by the generator during a 2-phase short circuit at the terminals. KVAf = KVA / Xpu = 325 / 0.08 = 4062.5 kVA If = kVA / sqrt. 3 x kVf = 4062.5 /sqrt. 3 x 0.08 If = 4232 A 901. The secondary side of 5 MVA, 345 / 13.8k, 3-phase transformer is connected to a bus bar served by a 20 MVA, 13.8 kV, 3-phase alternator. The primary side of the transformer is tapped from an infinite bus. Estimate the fault current delivered to a 3-phase fault near the common bus bar. The transformer and alternator have 4% and 7% reactance, respectively. Ztrans.pu = Ztrans.pu X (MVAc / MVAtran) = 0.16 Refer to the equivalent circuit diagram: Ztrans.pu = Ztrans.pu x Zalt.pu / Ztrans.pu +Zalt.pu =0.16(0.075) / 0.16 + 0.075 = 0.051 Ztrans.pu =0.235 Strans = MVAc / Ztrans.pu = 20 /0.051 = 392.157 MVA If = 16,406.66 A 902. Determine the minimum rupturing capacity of the circuit breaker as shown, if a three-phase symmetrical fault occurs at a point P. Use the 10 MVA as the common MVA base. Xa = Xpu (MVAc / MVAbase) Xg = 0.03 (10 / 25) = 0.12 pu Xtransfomer = 0.20 (10 / 20 =0.10 Refer to the equivalent circuit diagram: X1 = 0.12 + 0.15 + 0.15 + 0.10 X1 =0.52 pu MVAf = MVAc / X1 =19.23 Rupturing capacity od CB =MVA =20 MVA 903. Given the one line diagram as shown. Determine the current delivered by generator. A when a three-phase fault occurs at point P. Use the 75 MVA as the common MVA base. Xa = Xpu (MVAc / MVAbase) Xa = 0.20 (75 / 50) = 0.30 pu Xtransfomer = 0.20 (10 / 20 =0.10 Refer to the equivalent circuit diagram: X1 = (0.3)(0.15) /0.3 + 0.15 =0.25 X1 =0.35 pu Refer to the equivalent circuit diagram: Sf = kVAc / X Ipu = 214285 kVA If =8965 A Refer to circuit diagram of the transformer bank : Ia =172.5 A 904. Given the one-line diagram as shown, determine the reactance of the limiting reactor x in order to limit the three-phase symmetrical fault power at point P to 400 MVA. three-phase fault occurs at point P. Use the 20 MVA as the common MVA base. Xa = Xpu (MVAc / MVAbase) Xa = 0.20 (20 / 25) = 0.16 pu Xtransfomer = 0.25 (20 / 50 ) =0.10 Refer to the equivalent circuit diagram: X1 = 1/ (1 /0.15) + (1 /0.16) + (1 / 0.1 + X) X1 =0.1+X / (2.2916 + 12.916X EQ. 1 Refer to the equivalent circuit diagram: MVAf = MVAc / X Ipu Xf= MVAc / MVAf =20 /400 Xf=0.05 Substitute X1 in EQ. 1: 0.05 =0.1+X / (2.2916 + 12.916X) 0.11458 + 0.6458X = .1 + X X = 0.04116 pu Xbase = Vbase 2/ Sbase =9.522 Ω X = Xpu (Xbase ) =0.04116 (9.522) X = 0.392 Ω
