Spiral Wire Inductance Calculator

Calculator Inputs

Outer Diameter

Use the outer centerline diameter.

Inner Diameter

Use the inner centerline diameter.

Number of Turns

Decimal values are allowed for partial turns.

Dimension Unit

Spiral Shape

Wire Diameter

Same unit as the diameter fields.

Gap Between Turns

Leave zero for geometry-based pitch.

Lead Length

Extra wire length outside the spiral.

Operating Frequency

Used for reactance, skin depth, and Q.

Relative Permeability

Use 1 for air-core spirals.

Wire Material

Custom Resistivity

Ohm-meter. Used only for custom material.

Temperature

Degrees Celsius for resistance correction.

Manual Correction

Percent adjustment for nearby metal or layout effects.

Target Inductance

Optional comparison target.

Target Unit

Reset

Example Data Table

Outer Diameter	Inner Diameter	Turns	Wire Diameter	Shape	Approximate Use
40 mm	8 mm	6	0.8 mm	Circular	Small RF experiment
60 mm	10 mm	8	1.0 mm	Circular	General air-core coil
80 mm	16 mm	10	1.2 mm	Square	Flat prototype winding
120 mm	25 mm	12	1.5 mm	Octagonal	Higher inductance layout

Formula Used

Modified Wheeler Formula

L = μ0 × μr × K1 × N² × davg ÷ (1 + K2 × ρ)

Here, L is inductance in henries. μ0 is free-space permeability. μr is relative permeability. N is turns. davg is the average diameter. ρ is the fill factor. K1 and K2 are shape constants.

Current Sheet Formula

L = μ0 × μr × N² × davg × C1 ÷ 2 × [ln(C2 ÷ ρ) + C3ρ + C4ρ²]

This equation is useful for flat spiral layouts. It handles different spiral shapes with empirical constants. The calculator compares this result with Wheeler estimates and reports a preferred average.

Supporting Calculations

Wire length is estimated from the average spiral circumference. Resistance uses material resistivity and conductor area. Reactance is calculated as XL = 2πfL. The Q estimate is XL divided by estimated AC resistance.

How to Use This Calculator

Enter the outer and inner spiral diameters.
Add the total number of turns.
Select the unit used by the geometry fields.
Choose the closest spiral shape.
Enter wire diameter and spacing between turns.
Add frequency to calculate reactance and Q.
Use relative permeability of 1 for an air core.
Press the calculate button to show results above the form.
Download the CSV or PDF file for records.

Advanced Spiral Wire Inductance Guide

Why Spiral Inductance Matters

A spiral wire inductor gives useful inductance in a flat space. It is common in radio experiments, sensor loops, wireless power trials, and compact prototypes. Its value depends strongly on diameter, turn count, fill factor, and nearby materials. Small geometry changes can shift the final result by a visible amount.

Understanding the Geometry

The outer diameter sets the largest magnetic loop. The inner diameter controls the open center. More turns usually increase inductance by the square of the turn count. A wider spiral can improve inductance, but it also changes fill factor. Tight spacing may increase coupling between turns. Wide spacing may reduce the final inductance.

Why Multiple Formulas Are Included

Spiral inductors are not perfect textbook solenoids. Their field spreads through a flat winding area. That makes empirical formulas very useful. The modified Wheeler equation is simple and stable for many layouts. The current sheet method gives another practical estimate. The classic Wheeler estimate is also shown for comparison. The preferred value averages the suitable results, then applies spacing and correction adjustments.

Resistance and Frequency Effects

Inductance is only part of the design. Wire length creates resistance. Higher frequency creates reactance. The skin effect can raise AC resistance. That lowers the estimated Q factor. A thicker conductor can reduce resistance, but it may require wider spacing. The best winding balances inductance, size, resistance, and frequency behavior.

Practical Design Advice

Use accurate centerline dimensions for better results. Keep metal shields away unless they are part of the design. Measure the finished coil when precision matters. Air-core spirals should use relative permeability near one. Ferrite or magnetic backing can change inductance significantly. Use the manual correction field when test data shows a repeatable difference. Export the result to compare prototypes and document design choices.

FAQs

1. What is spiral wire inductance?

It is the inductance produced by a flat spiral conductor. Current flows through the turns and creates a magnetic field around the winding.

2. Which diameter should I enter?

Enter centerline diameters when possible. The outer value should follow the center of the outer turn. The inner value should follow the center of the inner turn.

3. Why are several formulas shown?

Spiral inductors are affected by shape and fill factor. Different formulas give useful checks. Comparing them helps reveal layout sensitivity.

4. What is fill factor?

Fill factor compares radial winding width with overall coil size. A higher value means the spiral occupies more of the available diameter.

5. What value should I use for relative permeability?

Use 1 for air-core designs. Use a higher value only when a magnetic core or backing material is intentionally used.

6. Why does frequency matter?

Frequency does not change ideal inductance, but it changes reactance, skin depth, AC resistance, and the estimated Q factor.

7. Is the result exact?

No calculated spiral value is perfect. Nearby metal, insulation, winding accuracy, and measurement conditions can change the final measured inductance.

8. When should I use manual correction?

Use it after comparing calculated values with measured prototypes. It helps match repeated real-world offsets in a specific build style.