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LC Resonant Frequency Calculator

Enter any two of f / L / C to solve the third, plus the characteristic impedance Z₀.

Basic No backend · 100% client-side

What it does: Compute the resonant frequency of an LC tank, or work back to the inductor/capacitor you need.

When to use it: When designing oscillators, tuned tanks, LC filters or frequency-selective networks.

Solve for:

At the resonant frequency, the reactance^? of the inductor and capacitor cancel each other.

f₀ resonant frequency

L inductance

C capacitance

→ f₀ ≈ 50.3 kHz

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How to

How to use the LC resonance calculator

Pick the unknown → enter the other two → read f₀ and Z₀.

01

Pick the value to solve for

Click f / L / C to choose which is unknown; the selected field becomes the result box.
02

Enter the other two

Supports 100u, 100n, 10p, 455k notation (µ/n/p/k/M prefixes).
03

Read the resonant frequency and Z₀

The result updates live and also gives the characteristic impedance Z₀ = √(L/C). Expand to see the formula with values substituted in.

Reference

Common resonance combinations

A few typical LC values and their resonant frequencies for quick reference when estimating.

L	C	f₀ ≈	Use case
100 µH	100 nF	50.3 kHz	Low-frequency oscillation / filtering
100 µH	220 pF	1.07 MHz	AM medium-wave band
10 µH	10 pF	15.9 MHz	Shortwave / HF
25 µH	1.0 nF	1.01 MHz	IF tuning

Computed from f₀ = 1/(2π√(LC)) (ideal, lossless).

FAQ

Common questions, answered in 3 minutes

What does this frequency mean?

It is the resonant frequency f₀ of the LC tank — at this frequency the reactances of the inductor and capacitor cancel and the tank impedance reaches an extreme (maximum for a parallel tank, minimum for a series tank).

What is Z₀ (characteristic impedance) good for?

Z₀ = √(L/C) reflects the tank's energy-storage character. For the same f₀, a larger L/C ratio gives a higher Z₀, which affects frequency selectivity and the quality factor (Q).

Why does the real resonance point differ from the computed one?

This tool assumes an ideal, lossless LC. Real inductors have DC resistance, capacitors have losses, and there are parasitics, which shift the resonance slightly and introduce bandwidth — for precise design, factor in the part datasheets and the Q value.

Do series and parallel LC use the same formula?

The resonant frequency f₀ formula is the same; the difference is the impedance at resonance: series shows minimum impedance, parallel shows maximum impedance.

Can I work backwards and choose components from a frequency?

Yes. Switch "Solve for" to L or C, enter the target frequency and the other known component value, and it computes the required inductor or capacitor.

Data Provenance

Standards and sources referenced by this tool

Item	Value / Formula	Source
Resonant frequency	`f₀ = 1/(2π√(LC))`	Thomson formula (ideal LC)
Characteristic impedance	`Z₀ = √(L/C)`	LC tank surge impedance

Ideal, lossless LC formula, no external API.

Pick the value to solve for

Enter the other two

Read the resonant frequency and Z₀