For the circuit shown in Fig. the emf of the generator is E. The current through the inductor is 1.6 A. While the current through the condenser is 0.4 A. Then

For the circuit shown in Fig. the emf of the generator is E. The curre

1.	For the circuit shown in Fig. the emf of the generator is E. The current through the inductor is 1.6 A. While the current through the condenser is 0.4 A. Then
Answer» Current drawn from the generator is `I=2A` Current drawn from the generator is `I=1.2A` `omega=(1)/(2sqrt(LC))` `omega=(1)/(4sqrt(LC))` Solution :`I=I_(C)+I_(L)` `implies I=I=(E_(0))/(X_(C))` `sin(omega t+pi//2)+(E_0)/(X_L) sin (omegat-pi//2)` `=[(E_0)/(X_C)-(E_0)/(X_L)] cos omega t` to find, `I_(v)=\|(1)/(SQRT(2)[(E_0)/(X_C)-(E_0)/(X_L)]\|`...(i) Given`I_(Cv)=(E_0)/(sqrt(2)X_(C))=0.4A`, ...(ii) `I_(Lv)=(E_0)/(sqrt(2)X_(L))=1.6 A` ...(iii) From EQUATIONS (i) (ii) and (iii) `I_(v)=1.2A` Dividing (ii) by (iii) `(X_L)/(X_C)=1/4 implies (OMEGAL)/(1//omegaC)=1/4 implies omega^(2)LC= 1/4 implies omega=(1)/(2sqt(LC))`.

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For the circuit shown in Fig. the emf of the generator is E. The current through the inductor is 1.6 A. While the current through the condenser is 0.4 A. Then

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