Wind Tunnel Session
Reference models: A2 Wind Tunnel (Mooresville), Faster Wind Tunnel (Scottsdale), Silverstone Sports Engineering Hub
CWPM vs Sustained bike power
Cost per minute saved across the full slider range, all other parameters held at your current profile.
FORMULA CWPM = cost ÷ Δt, where Δt = (min/h at your speed) × κ(slider) × Tbaseline(slider).
Curve direct-aero sets the empirical κ bump; Tbaseline is the leg duration at your profile.
Time saved vs Sustained bike power
Minutes shaved at the 140.6 Full format as your slider value varies.
FORMULA Δt = (min/h at your speed) × κ(slider) × Tbaseline(slider).
Curve direct-aero sets κ; Tbaseline is your 140.6 Full bike leg duration.
Time saved across race formats
Minutes shaved if you raced each distance at your current profile.
FORMULA For each format f: Δtf = (min/h at your speed) × κ(profile) × Tbaseline(f). Only the leg distance — and therefore Tbaseline — varies between bars; κ is held constant from your profile.
Cost vs time saved — bike alternatives
Every bike upgrade in the catalog plotted at your current profile. The line is the Pareto frontier: anything above it is dominated by a cheaper item that saves the same or more time.
HOW TO READ Each dot is one upgrade. Its horizontal position is the time it would save you at your current profile — the same Δt computed in the charts above. Its vertical position is the upgrade's cost. The green dashed line is the Pareto frontier: items where no cheaper alternative matches or beats them on time saved. Anything floating above the line is dominated — somewhere down-and-to-the-right sits a frontier item that delivers the same or more minutes for less money, so it's the better buy.
Why it works
Real-time CdA measurement lets you A/B-test position, helmet, suit, and bottle configurations under realistic yaw sweeps. The single biggest CdA reduction available beyond a bike fit — but requires expert interpretation and willingness to accept that your “fast position” might be slower than you think.
Direct aero — watts saved scale with $v^3$ (flat in power); an empirical $(P/225)^{0.15}$ bump on top.
Source basis for the savings estimate
2 referencesThe ΔCdA = 0.01871 m² primitive is a calibrated
midpoint drawn from the literature below. Peer-reviewed studies are weighted most heavily;
independent / industry labs fill gaps where peer review is sparse for this gear category.
- Aerodynamic study of different cyclist positions: CFD analysis and full-scale wind-tunnel tests.Journal of Biomechanics, 43(7):1262–1268.Quantifies CdA changes across upright, dropped and TT positions — the canonical position-drag reference.doi.org/10.1016/j.jbiomech.2010.01.025
- Riding against the wind: a review of competition cycling aerodynamics.Sports Engineering, 20(2):81–110.Comprehensive review of CdA contributions from rider position, helmet, frame, wheels and clothing.doi.org/10.1007/s12283-017-0234-1
How the savings estimate was built
ΔCdA 0.01871 m²Published CdA reduction → watts saved at your actual speed → minutes per hour.
- Pull reported ΔCdA (m²) from wind-tunnel / velodrome data for items in this category and price tier.
- Compute watts saved at the rider's on-the-fly drag-only speed: ΔP = ½·ρ·v³·ΔCdA.
- Convert to minutes per hour via the master identity ΔM/h = 20·ΔP/P, then apply the empirical (P/225)^0.15 bump.
- Round to a conservative midpoint of the observed range to avoid manufacturer bias.
This is a calibrated model number, not a measurement of your equipment.
The value reflects published delta-ranges for the Position category
with a direct-aero response, biased toward independent rather than manufacturer data.
The slider sweep above shows how watts-saved at your speed and the curve κ reshape it across athlete profiles.