Model non‑Newtonian flow using Bingham plastic assumptions easily. Estimate yield stress and plastic viscosity accurately. Built for labs, pipelines, slurries, and drilling fluids today.
Bingham plastic model: τ = τy + μp γ̇. Use one-point when μp is known, or two-point to solve both parameters.
The Bingham plastic model assumes a material needs a threshold stress before it flows. It can be written as:
τ = τy + μp γ̇
One-point: τy = τ − μp γ̇. Two-point: μp = (τ2−τ1)/(γ̇2−γ̇1), then τy = τ1 − μp γ̇1.
Sample values for a fluid measured at 25°C.
| Shear rate, γ̇ (s⁻¹) | Shear stress, τ (Pa) | Notes |
|---|---|---|
| 40 | 110 | Use as Point 1 for two-point mode. |
| 80 | 180 | Use as Point 2 for two-point mode. |
| 50 | 120 | Works for one-point with μp = 1.5 Pa·s. |
Many concentrated suspensions behave like a solid until a minimum stress is applied. The Bingham model captures that “no-flow then flow” transition with two parameters: yield stress and plastic viscosity. This calculator helps translate rheometer readings into engineering values you can compare, report, and reuse in design work.
Yield stress τy represents the threshold needed to initiate continuous shear. Below τy, the material may only deform elastically or creep very slowly. Once τ exceeds τy, the extra stress drives steady flow. In pipes, τy influences plug formation, restart pressure, and minimum pump requirements.
Plastic viscosity μp is the slope of τ versus shear rate in the linear region. Apparent viscosity, by contrast, is τ/γ̇ and changes with γ̇. For Bingham fluids, apparent viscosity drops as shear rate rises because τy becomes less dominant. Reporting both τy and μp gives a clearer material signature.
One-point estimation is useful when μp is known from prior calibration, a datasheet, or a separate fit. You provide one measured shear stress and shear rate, and the calculator returns τy from τy = τ − μpγ̇. This method is fast for routine checks and quality-control sampling.
With two measurements (τ₁, γ̇₁) and (τ₂, γ̇₂), the calculator computes μp as the slope (τ₂ − τ₁)/(γ̇₂ − γ̇₁) and then back-calculates τy. Choose points within the same linear regime. If your curve is strongly curved, consider fitting more points externally and using the one-point mode for τy validation.
Yield stress can range from near 0 Pa for weakly structured fluids to hundreds of Pa for dense slurries. Plastic viscosity commonly spans from a few mPa·s (thin dispersions) to several Pa·s (heavy pastes). This tool converts between Pa, kPa, MPa, and psi, plus Pa·s, mPa·s, and cP, keeping your calculations consistent.
Stable temperature, steady shear, and repeatable geometry are essential. If τy comes out negative, it usually means the chosen point(s) sit below the linear Bingham region or μp is overestimated. Many labs clamp negative τy to zero, but you should also review measurement selection and instrument settings.
Engineers use τy and μp to approximate start-up pressure, plug size, and energy demand in transport and mixing. Typical sectors include drilling fluids, wastewater sludge, mineral slurries, food pastes, and cementitious materials. Exporting CSV and PDF outputs supports lab notebooks, audits, and consistent specification sheets.
A Bingham plastic behaves like a solid below a yield stress, then flows with an approximately linear stress–shear-rate relationship above that threshold.
You need one measured shear stress, the corresponding shear rate, and a known plastic viscosity. The calculator then returns yield stress using the Bingham relation.
Use it when you have two stress–shear-rate measurements in the same linear regime and want both yield stress and plastic viscosity from those points.
Negative values typically indicate non-linear data selection, noise, or an overestimated plastic viscosity. Consider choosing higher shear-rate points or fitting more data.
Plastic viscosity is the slope of the stress versus shear-rate line above yield. It reflects how much additional stress is needed for each increase in shear rate.
Only if units are inconsistent. This tool converts stress and viscosity to internal base units before calculating, then converts results to your chosen output units.
No. Many materials are shear-thinning or time-dependent. Use the Bingham model when your stress–shear-rate data is approximately linear above a threshold.
Important Note: All the Calculators listed in this site are for educational purpose only and we do not guarentee the accuracy of results. Please do consult with other sources as well.