Find Inductance in a Coil

Question

Question: An inductive coil has an internal resistance of 20 $\Omega$. When an AC Voltage source with a frequency of 100 Hz is connected to the coil, the current lags the voltage by 30 degrees. What is the value of the inductance L.

My Work: I am unsure where to begin here. If we know that $\omega_d=\frac{1}{\sqrt{LC}}$ and we also know that $f=2\pi \omega_d$, then we can just find the capacitance and solve for L in the first equation and we will have our answer. However, I am not sure how to find capacitance. Any help is appreciated.

Answer 1

Given $\theta = 30$ and pure resistance is $20 \Omega$. Using a phase diagram it could be observed that $ \tan{\theta} = \frac{\chi_L}{R} $. Find $\chi_L$ and substitute that into $\chi_L = 2 \pi f L $. It's pretty straightforward I believe?

Answer 2

Your capacitance formula is not applicable here. If you can work with complex numbers, you can use the impedance of the inductor, $j \omega L$, to calculate the total impedance ($Z = v/i = R_{internal}+ j \omega L$), and then work out what L must be to yield the specified phase angle at the specified frequency.

Answer 3

Unless I'm mistaken you might wish to check out Inductive Reactance It's straight substitution

An inductor causes a lag of $\pi/2$; so when the lag is 30 degrees and given the internal resistance - what remains is the inductance.