Membrane Potential Calculator

Inputs

Temperature value

Typical physiological: 37 °C.

Temperature unit

Log base

Both are equivalent with the correct factor.

Concentrations (mM)

[K+] inside

[K+] outside

[Na+] inside

[Na+] outside

[Cl-] inside

[Cl-] outside

[Ca2+] inside

[Ca2+] outside

Valences

z for K+

z for Na+

z for Cl-

z for Ca2+

Permeabilities for GHK (relative)

GHK here uses K, Na, and Cl as monovalent ions.

P_K

P_Na

P_Cl

Reset

Results appear above this form after submission.

Example data table

Parameter	Inside	Outside	Units
K+	140	5	mM
Na+	12	145	mM
Cl-	4	120	mM
Ca2+	0.0001	1.2	mM

Permeability example: Pk=1.0, Pna=0.04, Pcl=0.45.

Formula used

Nernst potential for ion i:

E_i = (RT / (zF)) ln( [i]_out / [i]_in )

Goldman-Hodgkin-Katz (monovalent K, Na, Cl):

V_m = (RT/F) ln( (P_K[K]_out + P_Na[Na]_out + P_Cl[Cl]_in) / (P_K[K]_in + P_Na[Na]_in + P_Cl[Cl]_out) )

Outputs are reported in millivolts (mV). If base-10 logs are selected, the correct conversion factor is applied.

How to use this calculator

Enter temperature and choose °C or K.
Provide inside and outside concentrations for each ion.
Adjust valences only if modeling unusual charge states.
Set relative permeabilities for K, Na, and Cl for the GHK estimate.
Press Compute to show results above the form.
Use the download buttons to export CSV or PDF reports.

Technical article

1) What membrane potential represents

The membrane potential is the voltage difference between intracellular and extracellular fluid created by selective ion movement across a thin membrane. In many neurons a resting value near -65 mV is typical, while skeletal muscle can sit closer to -80 mV, depending on potassium and chloride handling.

2) Nernst potentials as equilibrium references

The Nernst equation predicts the equilibrium voltage for a single permeant ion. At 37 °C, RT/F is about 26.7 mV, and the base-10 form gives roughly 61.5 mV per tenfold concentration ratio for z=1. Comparing V_m to each E_i shows the direction of the ionic driving force.

3) Typical concentration data used in modeling

Common intracellular/extracellular concentrations (mM) are: K⁺ 140/5, Na⁺ 12/145, Cl^- 4/120, and free Ca²⁺ about 0.0001/1.2. These values are representative for mammalian cells and highlight why calcium equilibrium potentials are usually strongly positive.

4) Temperature dependence and scaling

Because voltage scales with absolute temperature, potentials shift with experimental conditions. RT/F is about 25.2 mV at 20 °C (293 K) and about 26.7 mV at 37 °C (310 K). For unchanged gradients, moving from room temperature to physiological temperature increases magnitudes by roughly 6%.

5) Permeability weighting in the GHK estimate

The Goldman-Hodgkin-Katz equation combines multiple monovalent ions under a constant-field assumption. A frequently used resting set is P_K:P_Na:P_Cl = 1:0.04:0.45. With the example concentrations, this often produces a V_m near -60 to -75 mV, consistent with many measured resting potentials.

6) Chloride sign conventions and correct placement

Chloride is an anion, so its charge reverses the electrical contribution compared with cations. In the Nernst equation this is handled by using z = -1. In the GHK expression, chloride uses inside concentration in the numerator and outside in the denominator, matching the anion flux sign under the same field.

7) Sensitivity: why small changes can matter

Membrane voltage can be highly sensitive to extracellular potassium. Doubling K⁺_out from 5 to 10 mM shifts E_K by about +18.5 mV at 37 °C because ln(2) multiplied by RT/F gives a sizable change. This is why hyperkalemia can depolarize cells and increase excitability.

8) Practical limits and extensions

These formulas assume ideal dilute solutions and do not explicitly include electrogenic pumps, buffering reactions, or activity coefficients. For higher accuracy, consider ion activities, liquid junction potentials, and explicit channel conductances. Calcium is included here via Nernst; multi-ion GHK extensions for divalents require additional assumptions.

FAQs

1) Why are there both Nernst and GHK results?

Nernst gives the equilibrium voltage for one ion at a time. GHK estimates the overall membrane voltage when multiple monovalent ions contribute simultaneously, weighted by their relative permeabilities.

2) What does a positive Nernst potential mean?

A positive E_i means outside is higher than inside for a cation, or the reverse for an anion. It is the voltage needed to balance diffusion so net flux is zero.

3) How should I choose permeabilities for GHK?

Use relative values that reflect the channel state you want to model. Resting membranes often have P_K much larger than P_Na. P_Cl varies with transporters and the cell type.

4) Why is chloride placed differently in the GHK formula?

Chloride carries negative charge, so its flux direction under the same electric field is opposite to cations. The inside/outside placement in GHK accounts for this sign while keeping the logarithm structure consistent.

5) Can I use micromolar units?

Yes. Enter all concentrations in the same unit system. If you choose micromolar, the calculator converts internally for consistency, so the computed voltage remains correct.

6) Why is calcium equilibrium potential so large?

Intracellular free calcium is extremely low relative to outside, often by 10,000-fold or more. With z=2, the Nernst relationship yields a large positive equilibrium voltage, commonly above +100 mV.

7) What are common input mistakes?

Common mistakes include swapping inside and outside values, entering negative concentrations, setting a valence to zero, or setting all permeabilities to zero. Double-check units and ensure all concentrations are strictly positive.