Back of the Envelope: Quick Pipe Size From Flow Rate
Knowing the right pipe size without a calculator is a skill that separates experienced engineers from the rest. Here’s how to do it in your head.
The Rule
For liquid in carbon steel pipe, at reasonable velocities:
Pipe ID (mm) ≈ 18.8 × √(Flow in m³/h ÷ Velocity in m/s)
But that requires a calculator. The real shortcut:
DN (nominal diameter in mm) ≈ 25 × √(Flow in m³/h)
That gives you the right ballpark for most liquid services (velocity ~2 m/s). Then round up to the next standard pipe size.
For imperial: Pipe ID (inches) ≈ √(Flow in gpm ÷ 10) — close enough for water at 8–10 ft/s.
Why This Works
The velocity in a pipe:
v = Q / A = Q / (π × D² / 4)
Solve for D:
D = √(4Q / πv)
For v = 2 m/s (standard liquid velocity):
D(m) = √(4Q / π × 2) = √(0.637 × Q) where Q is in m³/s
D(mm) = 1000 × √(0.637 × Q/3600) = 18.8 × √Q(m³/h)
DN ≈ 25 × √Q (rounding 18.8 to something memorable and adding 30% for standard size selection).
Examples
Example 1 — Cooling water supply line:
- Flow: 200 m³/h
- DN ≈ 25 × √200 ≈ 25 × 14.1 ≈ 353 → pick DN350
Actual design: 200 m³/h at 2 m/s → ID = 188 mm → DN200 is too small (ID ~202mm, v = 6.9 m/s — too fast). DN250 (ID ~254mm, v = 4.4 m/s — still fast). DN300 (ID ~304mm, v = 3.1 m/s — better but higher than 2 m/s). DN350 (ID ~336mm, v = 2.5 m/s — reasonable). ✓
Example 2 — Chemical dosing line:
- Flow: 2 m³/h
- DN ≈ 25 × √2 ≈ 25 × 1.41 ≈ 35 → pick DN40
Real check: 2 m³/h at 2 m/s → D = 18.8 × √2 = 26.6mm → DN32 (ID ~36mm, v = 1.1 m/s — acceptable for small bore dosing). ✓
Example 3 — Pump suction line (lower velocity required):
- Flow: 100 m³/h
- Suction requires ~1 m/s (not 2 m/s)
- DN ≈ 25 × √100 = DN250 for normal discharge
- For suction: 18.8 × √(100/1) = 188mm → DN200
Notice the suction line is larger than the formula suggests — because you need lower velocity on the suction side. Always use v = 1.0–1.5 m/s for pump suction.
Velocity Rules of Thumb
| Service | Velocity (m/s) | Why |
|---|---|---|
| Pump suction (flooded) | 1.0 – 1.5 | Minimize pressure drop, ensure NPSH |
| Pump discharge (water) | 2.0 – 3.5 | Balance pipe cost vs pumping cost |
| Gravity flow | 0.5 – 1.0 | Available head is usually small |
| Compressed air (instrument) | 15 – 20 | Dry gas, no erosion concern |
| Steam (saturated, <10 bar) | 25 – 35 | Higher velocity acceptable for gas |
| Slurry | 1.5 – 2.5 | Below 1.5: solids settle. Above 2.5: erosion |
| Two-phase flow | Design for slug flow regime | Avoid stratified and annular-mist |
When NOT to Use the Shortcut
- Gas/vapor lines: Velocity is 10–50× higher → pipe size is much smaller than the shortcut predicts
- High-viscosity liquids (>50 cP): Pressure drop dominates → need detailed calculation
- Long pipelines (>1 km): Pressure drop economics usually dictate larger pipe
- Two-phase flow: Flow regime, not just velocity, determines proper pipe size
- Vacuum lines: Pressure drop budget is tiny → usually 2–3 sizes larger than you think
The Takeaway
DN ≈ 25 × √Q(m³/h) for liquid lines. Round up to next standard size. For pump suction, go one size up.
Memorize the velocity rules. Pipe sizing is economics dressed up as hydraulics — you’re trading pipe cost (CAPEX) against pumping cost (OPEX). But that balance usually lands around 2 m/s for liquids. When in doubt, size for 2 m/s and you’ll be within one pipe size of optimal.
*Next time on Back of the Envelope: Heat Exchanger Area — How Big Is It Really?*