Answer:
(a). The reactive power is 799.99 KVAR.
(c). The reactive power of a capacitor to be connected across the load to raise the power factor to 0.95 is 790.05 KVAR.
Explanation:
Given that,
Power factor = 0.6
Power = 600 kVA
(a). We need to calculate the reactive power
Using formula of reactive power
[tex]Q=P\tan\phi[/tex]...(I)
We need to calculate the [tex]\phi[/tex]
Using formula of [tex]\phi[/tex]
[tex]\phi=\cos^{-1}(Power\ factor)[/tex]
Put the value into the formula
[tex]\phi=\cos^{-1}(0.6)[/tex]
[tex]\phi=53.13^{\circ}[/tex]
Put the value of Φ in equation (I)
[tex]Q=600\tan(53.13)[/tex]
[tex]Q=799.99\ kVAR[/tex]
(b). We draw the power triangle
(c). We need to calculate the reactive power of a capacitor to be connected across the load to raise the power factor to 0.95
Using formula of reactive power
[tex]Q'=600\tan(0.95)[/tex]
[tex]Q'=9.94\ KVAR[/tex]
We need to calculate the difference between Q and Q'
[tex]Q''=Q-Q'[/tex]
Put the value into the formula
[tex]Q''=799.99-9.94[/tex]
[tex]Q''=790.05\ KVAR[/tex]
Hence, (a). The reactive power is 799.99 KVAR.
(c). The reactive power of a capacitor to be connected across the load to raise the power factor to 0.95 is 790.05 KVAR.
