Hello.
Ic=C*dv/dt comes from Q=CV.
V(Voltage across inductor)=L*di/dt comes from what?
I found that integral of (v*dt)=L*integral of (di)
Replacing v by R*I, and replacing I by dq/dt we have that
Integral of (R*dq/dt*dt)=L*integral of (di)
Integral of (R*dq)=L*integral of (di)
OBS.: limits are from 0 and 0 to q and i, respectively.
R*Q=L*I
L=RQ/I
So that means inductance is proportional to the resistance of the inductor?
I think I did a big mistake and a maybe a big confusion but, at least, I tried to find.
The question remains the same.
Ic=C*dv/dt comes from Q=CV.
V(Voltage across inductor)=L*di/dt comes from what?
I found that integral of (v*dt)=L*integral of (di)
Replacing v by R*I, and replacing I by dq/dt we have that
Integral of (R*dq/dt*dt)=L*integral of (di)
Integral of (R*dq)=L*integral of (di)
OBS.: limits are from 0 and 0 to q and i, respectively.
R*Q=L*I
L=RQ/I
So that means inductance is proportional to the resistance of the inductor?
I think I did a big mistake and a maybe a big confusion but, at least, I tried to find.
The question remains the same.