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Two balanced Y-connected loads in parallel, one drawing 15kW at 0.6 power factor lagging and the other drawing 10kVA at 0.8 power factor leading, are supplied by a balanced, three-phase, 480-volt source. (a) Draw the power triangle for each load and for the combined load. (b) Determine the power factor of the combined load and state whether lagging or leading. (c) Determine the magnitude of the line current from the source. (d) Δ-connected capacitors are now installed in parallel with the combined load. What value of capacitive reactance is needed in each leg of the A to make the source power factor unity? Give your answer in Ω. (e) Compute the magnitude of the current in each capacitor and the line current from the source.

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Answer:

(a) attached below

(b) [tex]pf_{C}=0.85[/tex] [tex]lagging[/tex]

(c) [tex]I_{C} =32.37 A[/tex]

(d) [tex]X_{C} =49.37[/tex] Ω

(e) [tex]I_{cap} =9.72 A[/tex] and [tex]I_{line} =27.66 A[/tex]

Explanation:

Given data:

[tex]P_{1}=15 kW[/tex]

[tex]S_{2} =10 kVA[/tex]

[tex]pf_{1} =0.6[/tex] [tex]lagging[/tex]

[tex]pf_{2}=0.8[/tex] [tex]leading[/tex]

[tex]V=480[/tex] [tex]Volts[/tex]

(a) Draw the power triangle for each load and for the combined load.

[tex]\alpha_{1}=cos^{-1} (0.6)=53.13[/tex]°

[tex]\alpha_{2}=cos^{-1} (0.8)=36.86[/tex]°

[tex]S_{1}=P_{1} /pf_{1} =15/0.6=25 kVA[/tex]

[tex]Q_{1}=P_{1} tan(\alpha_{1} )=15*tan(53.13)=19.99[/tex] ≅ [tex]20kVAR[/tex]

[tex]P_{2} =S_{2}*pf_{2} =10*0.8=8 kW[/tex]

[tex]Q_{2} =P_{2} tan(\alpha_{2} )=8*tan(-36.86)=-5.99[/tex] ≅ [tex]-6 kVAR[/tex]

The negative sign means that the load 2 is providing reactive power rather than consuming  

Then the combined load will be

[tex]P_{c} =P_{1} +P_{2} =15+8=23 kW[/tex]

[tex]Q_{c} =Q_{1} +Q_{2} =20-6=14 kVAR[/tex]

(b) Determine the power factor of the combined load and state whether lagging or leading.

[tex]S_{c} =P_{c} +jQ_{c} =23+14j[/tex]

or in the polar form

[tex]S_{c} =26.92<31.32[/tex]°

[tex]pf_{C}=cos(31.32) =0.85[/tex] [tex]lagging[/tex]

The relationship between Apparent power S and Current I is

[tex]S=VI^{*}[/tex]

Since there is conjugate of current I therefore, the angle will become negative and hence power factor will be lagging.

(c) Determine the magnitude of the line current from the source.

Current of the combined load can be found by

[tex]I_{C} =S_{C}/\sqrt{3}*V[/tex]

[tex]I_{C} =26.92*10^3/\sqrt{3}*480=32.37 A[/tex]

(d) Δ-connected capacitors are now installed in parallel with the combined load. What value of capacitive reactance is needed in each leg of the A to make the source power factor unity?Give your answer in Ω

[tex]Q_{C} =3*V^2/X_{C}[/tex]

[tex]X_{C} =3*V^2/Q_{C}[/tex]

[tex]X_{C} =3*(480)^2/14*10^3[/tex] Ω

(e) Compute the magnitude of the current in each capacitor and the line current from the source.

Current flowing in the capacitor is  

[tex]I_{cap} =V/X_{C} =480/49.37=9.72 A[/tex]

Line current flowing from the source is

[tex]I_{line} =P_{C} /3*V=23*10^3/3*480=27.66 A[/tex]

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