Tweet
Being impressed with how often my intuition is wrong in this business, especially with coils, I decided to tempt fate once again. I was not disappointed.
My latest experiment (inspired by a picture mikebg posted of a search head with three coils) involves testing the combined inductance of two identical circular coils, in various connection configurations and amounts of lateral separation.
My original intent was to measure how the combined inductance of "cancelling" coils (connected in series with current circulating in opposite directions) varies with lateral separation. Can you visualize that??? I can't.
My speculation was that if the coils were centered at the same point (100% overlap) and one resting on the other, the inductance would be near zero. When separated by a good distance, the inductance should be L + L (sum of the inductances of the identical coils).
It's all about flux, I figured. It seemed to me that the two coils should share at least 95% of the flux if stacked as close as possible (but maybe looks are deceiving). And if the current circulates in opposite directions, the fluxes should cancel and the inductance go to near zero.
But flux has me flummoxed, as usual.
Well, yes and no.
Here is my conundrum wrapped in an enigma and dropped in a quandry basket: the inductance was not near zero but slightly more than L/2 !!!!!
What, you're not amazed? Let's think about it. Take a different case altogether: If I had two identical coils in parallel not sharing any flux (no mutual inductance), the combined inductance should be L/2. But these coils, albeit in series, are smack-dab slapped up against each other and phased in opposite directions. I would have sworn on my mother's bobbin that they should cancel nicely and have at most L/10 combined inductance.
But I was wrong...shocking...
However, I tried one other gambit, now connecting my stacked coils in parallel, still phased in opposite directions (as before) to cancel each other.
The combined flux was now approx L/7. Better, I guess. Maybe.
So I decided to study this one physical configuration (coils 100% overlapped) and take some measurements while connecting the coils electrically in different ways. I hereby present you gentlemen (and ladies?) with the results and scant further analysis.
Pictures of the coils are below to assist in pointing out the flaws in my thinking.
Coil(s) description:
Diameter: 22 cm
Turns: 20
Wire: 24 AWG
1. L1 Inductance of coil1: .251 mH
2. L2 Inductance of coil2: .255 mH (virtually same as L1)
3. L3 Combined inductance coil1 || coil2 (parallel), phased opposite: .038 mH (15% L1)
4. L4 Combined inductance coil1 || coil2 (parallel), phased same: .214 mH (85% L1)
5. L5 Combined inductance coil1 -- coil2 (series), phased opposite: .156 mH (62% L1)
6. L6 Combined inductance coil1 -- coil2 (series), phased same: .858 mH (340% L1)
Scant analysis:
Case 3 seems somewhat predictable, very low inductance with coils in parallel but phased opposite. I would have expected less than 15%, but flux has a way of leaking more than you think.
Case 4 fairly predictable - two identical coils with 100% mutual inductance should have same inductance as one coil but half the resistance. 85% is ballpark.
Case 5 - this one fooled me, I thought it would be more like Case 3. Ideas welcome.
Case 6 - need Qiaohzi's calculator for this one, but basically conforms to the power law of windings and inductance -- double the windings gives much more than twice the inductance.
Using Q's calculator:
Inner Radius: 105 mm (using 21 cm inner diameter)
Wire thickness: .511 mm
Turns: 20
Inductance: .252 (spot on!)
Turns: 40 (two coils stacked 100% overlap)
Inductance: .939 (compare to .858, not bad, considering leaking flux)
So it is really Case 5 that beguiles me. I have a feeling that some calcs using mutual inductance might explain it.
Cheers,
-SB
My latest experiment (inspired by a picture mikebg posted of a search head with three coils) involves testing the combined inductance of two identical circular coils, in various connection configurations and amounts of lateral separation.
My original intent was to measure how the combined inductance of "cancelling" coils (connected in series with current circulating in opposite directions) varies with lateral separation. Can you visualize that??? I can't.
My speculation was that if the coils were centered at the same point (100% overlap) and one resting on the other, the inductance would be near zero. When separated by a good distance, the inductance should be L + L (sum of the inductances of the identical coils).
It's all about flux, I figured. It seemed to me that the two coils should share at least 95% of the flux if stacked as close as possible (but maybe looks are deceiving). And if the current circulates in opposite directions, the fluxes should cancel and the inductance go to near zero.
But flux has me flummoxed, as usual.
Well, yes and no.
Here is my conundrum wrapped in an enigma and dropped in a quandry basket: the inductance was not near zero but slightly more than L/2 !!!!!
What, you're not amazed? Let's think about it. Take a different case altogether: If I had two identical coils in parallel not sharing any flux (no mutual inductance), the combined inductance should be L/2. But these coils, albeit in series, are smack-dab slapped up against each other and phased in opposite directions. I would have sworn on my mother's bobbin that they should cancel nicely and have at most L/10 combined inductance.
But I was wrong...shocking...
However, I tried one other gambit, now connecting my stacked coils in parallel, still phased in opposite directions (as before) to cancel each other.
The combined flux was now approx L/7. Better, I guess. Maybe.
So I decided to study this one physical configuration (coils 100% overlapped) and take some measurements while connecting the coils electrically in different ways. I hereby present you gentlemen (and ladies?) with the results and scant further analysis.
Pictures of the coils are below to assist in pointing out the flaws in my thinking.
Coil(s) description:
Diameter: 22 cm
Turns: 20
Wire: 24 AWG
1. L1 Inductance of coil1: .251 mH
2. L2 Inductance of coil2: .255 mH (virtually same as L1)
3. L3 Combined inductance coil1 || coil2 (parallel), phased opposite: .038 mH (15% L1)
4. L4 Combined inductance coil1 || coil2 (parallel), phased same: .214 mH (85% L1)
5. L5 Combined inductance coil1 -- coil2 (series), phased opposite: .156 mH (62% L1)
6. L6 Combined inductance coil1 -- coil2 (series), phased same: .858 mH (340% L1)
Scant analysis:
Case 3 seems somewhat predictable, very low inductance with coils in parallel but phased opposite. I would have expected less than 15%, but flux has a way of leaking more than you think.
Case 4 fairly predictable - two identical coils with 100% mutual inductance should have same inductance as one coil but half the resistance. 85% is ballpark.
Case 5 - this one fooled me, I thought it would be more like Case 3. Ideas welcome.
Case 6 - need Qiaohzi's calculator for this one, but basically conforms to the power law of windings and inductance -- double the windings gives much more than twice the inductance.
Using Q's calculator:
Inner Radius: 105 mm (using 21 cm inner diameter)
Wire thickness: .511 mm
Turns: 20
Inductance: .252 (spot on!)
Turns: 40 (two coils stacked 100% overlap)
Inductance: .939 (compare to .858, not bad, considering leaking flux)
So it is really Case 5 that beguiles me. I have a feeling that some calcs using mutual inductance might explain it.
Cheers,
-SB
.
Comment