Inputs
Example Data Table
These sample inputs demonstrate typical midlatitude values and expected layer-to-layer wind changes.
| Method | Latitude (deg) | dT/dx (K/100 km) | dT/dy (K/100 km) | Layer | Δu (m/s) | Δv (m/s) |
|---|---|---|---|---|---|---|
| Height | 45 | 6 | -4 | Δz = 3000 m, T̄ = 280 K | ≈ 6.1 | ≈ 9.1 |
| Pressure | 45 | 6 | -4 | p1 = 1000 hPa, p2 = 500 hPa | ≈ 7.7 | ≈ 11.6 |
Numbers are approximate; your results depend on latitude and chosen layer thickness.
Formula Used
Thermal wind links horizontal temperature gradients to vertical shear of the geostrophic wind. Using x=east, y=north:
Δu = −(g/(f·T̄)) · (∂T/∂y) · Δz
Δv = (g/(f·T̄)) · (∂T/∂x) · Δz
Δu = −(R/f) · (∂T/∂y) · ln(p1/p2)
Δv = (R/f) · (∂T/∂x) · ln(p1/p2)
- f = 2Ω sin(φ), where φ is latitude and Ω is Earth’s rotation rate.
- R is the gas constant for dry air, and g is gravity.
- Directions use standard meteorological axes: u toward east, v toward north.
How to Use This Calculator
- Select a computation method: height-based (Δz) or pressure-based (ln(p1/p2)).
- Enter latitude to compute the Coriolis parameter.
- Provide temperature gradients dT/dx and dT/dy using your chosen unit.
- For height method, enter mean layer temperature T̄ and height difference Δz.
- For pressure method, enter pressures p1 (lower level) and p2 (upper level).
- Click Calculate to see Δu, Δv, magnitude, and direction above the form.
- Use the export buttons to download a CSV or a PDF snapshot.
Professional Notes
This guide explains how to prepare inputs and interpret thermal-wind shear in a practical, report-ready way.
1) What thermal wind represents
Thermal wind is the layer-to-layer change of the geostrophic wind produced by horizontal temperature contrasts. Stronger gradients typically imply stronger vertical shear, shaping jets and frontal zones. The calculator returns the shear vector components and its magnitude.
2) Inputs and reliable data sources
You need latitude, horizontal temperature gradients, and a layer thickness. Gradients can come from model grids, reanalysis, analyses, or map-based estimates from isotherm spacing. Choose the correct unit option, and keep signs consistent with east and north axes.
3) Height versus pressure formulation
The height form uses mean layer temperature T̄ and geometric thickness Δz, useful for altitude-based profiles. The pressure form uses ln(p1/p2), which fits standard synoptic layers such as 1000–850 hPa or 850–500 hPa where pressure surfaces are common.
4) Sign conventions and turning with height
The vector (Δu, Δv) describes how the upper-level flow differs from the lower level. Positive Δu means more eastward flow aloft, and positive Δv means more northward flow aloft. The reported bearing summarizes the “to-direction” of the shear.
5) Latitude sensitivity and equatorial limits
The Coriolis parameter increases with latitude, so identical gradients yield smaller computed shear where f is larger. Near the equator, f approaches zero and geostrophic assumptions weaken; modest gradient errors can inflate shear. Treat low-latitude outputs as qualitative.
6) Operational and research uses
Thermal-wind shear helps locate baroclinic zones, anticipate jet strengthening, and evaluate frontal environments. Strong shear layers can correlate with turbulence risk near jets. In case studies, exported CSV/PDF files provide a transparent record of assumptions and inputs.
7) Common pitfalls and uncertainty
Most issues come from unit mismatches, reversed pressure levels, or inconsistent gradient signs. Coarse grids can create noisy derivatives; consider smoothing or centered differences. To express uncertainty, rerun the calculation with plausible gradient bounds and compare outcomes.
8) Quick quality checks before sharing
Verify latitude, gradient unit, and layer definition, then confirm that “warmer toward” directions match your sign choices. Compare magnitudes against regional expectations: modest layers often yield a few m/s, while strong baroclinic zones can produce larger shear changes.
For consistent case comparisons, keep the same layer definition, grid spacing, and gradient method across runs. If you blend observations and model fields, note the analysis time and resolution. Document all inputs so your shear estimate remains traceable and repeatable.
FAQs
1) Is this the actual wind, or a wind difference?
It is a wind difference between two levels: the upper-layer geostrophic wind minus the lower-layer geostrophic wind. It describes vertical shear linked to temperature gradients, not the full wind including ageostrophic components.
2) How do I estimate dT/dx and dT/dy from a map?
Measure temperature change across a known horizontal distance along east–west and north–south directions. Divide ΔT by distance, then select the matching unit option. Keep the sign: warmer toward east gives positive dT/dx, warmer toward north gives positive dT/dy.
3) Which pressure levels should I choose?
Pick levels that bracket the layer of interest. Common synoptic choices are 1000–850 hPa for near-surface shear and 850–500 hPa for mid-tropospheric shear. Ensure p1 is the larger (lower-level) pressure and p2 is the smaller (upper-level) pressure.
4) What mean temperature should I use in the height method?
Use a representative layer-mean temperature in kelvin, such as an average from a sounding or gridded profile. If only two levels are available, a simple mean of those temperatures is often acceptable for a first-order estimate.
5) Why does the calculator warn near the equator?
Because the Coriolis parameter becomes very small, the geostrophic balance is weak and the formulas amplify errors. Small gradient uncertainty can produce unrealistically large shear. For tropical applications, consider alternative diagnostics beyond standard thermal-wind assumptions.
6) Can I use virtual temperature instead of temperature?
Yes, if moisture is important and you have virtual temperature fields, they can better represent density effects. Use the same gradient workflow, but document that the gradients are based on virtual temperature so interpretations remain consistent across cases.
7) How should I cite outputs in a report?
Include latitude, gradient values with units, the layer factor (Δz or ln(p1/p2)), and the resulting Δu, Δv, and magnitude. Attach the exported CSV or PDF so others can reproduce the computation with the same inputs.