Water Pressure Loss Calculator
Calculate pressure loss (head loss) in pipes using the Darcy-Weisbach equation combined with the Colebrook-White equation for friction factor.
Formulas Used
Darcy-Weisbach Equation (head loss):
hf = f · (L / D) · V² / (2g)
where: f = Darcy friction factor, L = pipe length (m), D = internal diameter (m), V = mean flow velocity (m/s), g = 9.80665 m/s²
Flow Velocity: V = Q / A = Q / (π D² / 4)
Reynolds Number: Re = V · D / ν
Colebrook-White Equation (turbulent flow, Re ≥ 4000):
1 / √f = −2 · log₁₀( ε/(3.7·D) + 2.51 / (Re · √f) )
Solved iteratively; initial guess from Swamee-Jain: f = 0.25 / [log₁₀(ε/(3.7D) + 5.74/Re⁰·⁹)]²
Laminar flow (Re < 2300): f = 64 / Re
Pressure Loss: ΔP = ρ · g · hf (Pa)
Kinematic Viscosity (Andrade equation): μ = 2.414×10⁻⁵ · 10^(247.8 / (T + 140)) Pa·s; ν = μ / ρ
Assumptions & References
- Steady-state, incompressible, fully developed pipe flow.
- Circular cross-section pipe with uniform roughness.
- Only major (friction) losses are calculated; minor losses (fittings, bends, valves) are not included.
- Transitional flow (2300 ≤ Re < 4000) uses the Colebrook-White equation as an approximation; results in this range carry higher uncertainty.
- Water density modelled as ρ = 999.842 − 0.0622T − 0.00354T² (kg/m³), valid 0–100 °C.
- Dynamic viscosity via Andrade equation; accurate to ±1% over 0–100 °C.
- References: Moody (1944); Colebrook & White (1937); White, F.M. — Fluid Mechanics, 8th ed.; Swamee & Jain (1976) for explicit friction factor approximation.