logistic_guy
Senior Member
- Joined
- Apr 17, 2024
- Messages
- 2,214
Ignoring any mutual inductance, what is the equivalent inductance of two inductors connected \(\displaystyle \bold{(a)}\) in series, \(\displaystyle \bold{(b)}\) in parallel?
inductance
- Thread starter logistic_guy
- Start date
Draw a circuit diagram first.
Please show us what you have tried and exactly where you are stuck.
Please follow the rules of posting in this forum, as enunciated at:
Please share your work/thoughts about this problem
logistic_guy
Senior Member
- Joined
- Apr 17, 2024
- Messages
- 2,214
\(\displaystyle \bold{(a)}\) in series
\(\displaystyle L_{\text{series}} = \textcolor{blue}{L_1 + L_2}\)
\(\displaystyle \bold{(b)}\) in parallel?
\(\displaystyle \frac{1}{L_{\text{parallel}}} = \frac{1}{L_1} + \frac{1}{L_2} = \frac{L_1 + L_2}{L_1L_2}\)
This gives:
\(\displaystyle L_{\text{parallel}} = \textcolor{blue}{\frac{L_1L_2}{L_1 + L_2}}\)
\(\displaystyle L_{\text{series}} = \textcolor{blue}{L_1 + L_2}\)
\(\displaystyle \bold{(b)}\) in parallel?
\(\displaystyle \frac{1}{L_{\text{parallel}}} = \frac{1}{L_1} + \frac{1}{L_2} = \frac{L_1 + L_2}{L_1L_2}\)
This gives:
\(\displaystyle L_{\text{parallel}} = \textcolor{blue}{\frac{L_1L_2}{L_1 + L_2}}\)