Symmetrical Inductance

Calculate symmetrical conductor inductance per metre and per kilometre from spacing and geometric mean radius.

symmetrical inductance formulas and interpretation

Symmetrical conductor inductance depends logarithmically on conductor spacing relative to geometric mean radius.

The calculator preserves engineering outputs in H/m and mH/km with compact responsive inputs.

How to use the symmetrical inductance calculator

  1. Choose a model: Select the relationship matching the problem.
  2. Choose the unknown: Select the quantity to calculate.
  3. Enter values: Enter all known values with matching units and signs.
  4. Calculate: Review the result, formula, units, and direction.

Formula and variables

For the supported ideal symmetrical arrangement, inductance per length equals 2 × 10⁻⁷ times the natural logarithm of spacing divided by GMR.

L = (μ₀/2π) ln(D/GMR)
LInductance per length
Series inductance per conductor length (H/m)
DSpacing
Geometric conductor spacing (m)
GMRGeometric mean radius
Effective conductor radius (m)
μ₀Vacuum permeability
Magnetic constant (H/m)

Conductor-spacing example

Conductor spacing is 1 m and GMR is 0.01 m.

Spacing
1 m
GMR
0.01 m
  1. L = 2 × 10⁻⁷ ln(100)
  2. L ≈ 9.21 × 10⁻⁷ H/m

Result: Inductance is about 0.921 mH/km.

Increasing spacing raises inductance logarithmically.

Understanding your results

Interpreting the result

The equation assumes the supported symmetrical geometry and does not include earth-return or complex bundle effects.

Assumptions

  • The selected equation represents the physical system.
  • Inputs use a consistent reference direction.
  • Values are converted through coherent SI units.

Limitations

  • Vector components must be resolved along a common axis.
  • External forces or energy losses are not added automatically.
  • Results depend on the accuracy of entered measurements.

Common mistakes

  • Mixing incompatible units.
  • Dropping negative signs that represent direction.
  • Using weight where mass is required.
  • Entering a zero divisor.

Practical use cases

Physics problems

Check classroom, laboratory, and mechanics calculations.

Practical estimates

Estimate motion, forces, and energy for real systems.

Frequently asked questions

Can a result be negative?

Yes. For directional quantities, the sign indicates direction relative to the chosen positive axis.

Should I use SI units?

The interface can convert supported units, while the formulas are evaluated through coherent SI units.

Sources and review

Reviewed 2026-07-11.

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