Model pipe losses, fittings, static head, and margins. Review flow, velocity, Reynolds number, and power. Get cleaner hydronic selections with practical outputs and charts.
Estimate total loop head, compare Darcy-Weisbach and Hazen-Williams friction methods, derive flow from load or manual entry, and size a practical pump motor with safety allowances for closed-loop circulation systems.
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Illustrative SI example for a closed-loop water system using Darcy-Weisbach.
| Item | Example Value | Unit |
|---|---|---|
| Flow | 12.50 | m³/h |
| Straight pipe length | 95.00 | m |
| Equivalent fitting length | 28.00 | m |
| Pipe internal diameter | 52.50 | mm |
| Static head | 4.20 | m |
| Fluid density | 998.00 | kg/m³ |
| Dynamic viscosity | 1.05 | cP |
| Roughness | 0.045 | mm |
| Pump efficiency | 72.00 | % |
| Safety factor | 1.15 | - |
| Calculated friction head | 6.87 | m |
| Calculated total head | 12.73 | m |
| Recommended selected motor | 0.69 | kW |
Flow (m³/h) = Heat Load (kW) / [1.163 × ΔT (°C)]Flow (gpm) = Heat Load (BTU/h) / [500 × ΔT (°F)]
hf = f × (L / D) × [v² / (2g)]f is the Darcy friction factor, L is equivalent length,
D is internal diameter, and v is fluid velocity.
Re = (ρ × v × D) / μhf = 10.67 × L × Q1.852 / [C1.852 × D4.871]Total Head = (Friction Head + Static Head) × Safety Factor
Hydraulic Power = ρ × g × Q × HMotor Input = Hydraulic Power / Pump EfficiencySelected Motor = Motor Input × Motor Service Factor
Loop head is the total energy the pump must add to move fluid through the circuit. It includes pipe friction, fitting losses represented by equivalent length, and any real static elevation requirement.
Use Darcy-Weisbach when you want a more general method that accounts for density, viscosity, Reynolds number, and pipe roughness. It is a strong choice for water, glycol mixes, and varied operating conditions.
Hazen-Williams is often acceptable for clean water-like fluids in turbulent flow. It is simple and common in practice, but it is less flexible for fluids whose viscosity differs strongly from water.
Many balanced closed loops have little or no net static lift. However, some real layouts, heat exchangers, or control arrangements can create a meaningful requirement, so enter the actual design condition rather than assuming zero every time.
Small diameter changes have a large effect on velocity and friction loss. Using nominal pipe size instead of true internal diameter can noticeably distort the estimated head and lead to poor pump sizing.
Many closed-loop systems work comfortably around moderate velocities. Excessively high velocity can increase noise and erosion, while very low velocity may reduce air removal quality and indicate oversized piping.
These factors help cover uncertainty from fittings, future fouling, control valves, and real operating variation. They also prevent selecting a motor that is too close to the exact calculated demand.
It is an engineering screening tool. Final selection should still be checked against manufacturer pump curves, minimum and maximum operating limits, control strategy, fluid temperature, and actual equipment arrangement.
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.