Takeaway
Structure becomes numerically visible when we compare employment shares with value-added shares.
If a sector produces more value than its employment share, it is, on average, relatively more productive.
Total output per person can be understood as a weighted sum:
GDP per capita = Σ (Employment Share × Productivity per Worker)
This identity is not abstract. It implies a concrete diagnostic:
We now place the two maps side by side: where people work and where value is produced.
Sectoral employment data extend to more recent years, but sectoral value-added data currently extend to 2021 for complete G7 coverage. Therefore, 2021 is used as the latest common year for both series.
This table builds directly on the sectoral structure shown in EPISODE #005. It is reproduced here so that this episode can be read independently.
| Country | Year | Emp: Agr (%) | VA: Agr (%) | Emp: Ind (%) | VA: Ind (%) | Emp: Svc (%) | VA: Svc (%) |
|---|---|---|---|---|---|---|---|
| Canada | 2021 | 1.36 | 1.60 | 19.34 | 25.33 | 79.30 | 66.39 |
| Germany | 2021 | 1.21 | 0.75 | 27.38 | 25.16 | 71.41 | 63.55 |
| France | 2021 | 2.51 | 1.46 | 19.51 | 16.09 | 77.97 | 70.67 |
| United Kingdom | 2021 | 0.90 | 0.70 | 16.92 | 16.96 | 82.18 | 72.17 |
| Italy | 2021 | 4.05 | 1.83 | 26.64 | 22.56 | 69.31 | 64.84 |
| Japan | 2021 | 3.17 | 1.01 | 23.70 | 29.22 | 73.14 | 69.02 |
| United States | 2021 | 1.66 | 0.96 | 19.18 | 17.88 | 79.15 | 77.60 |
Table 1. Employment share and value-added share by sector, G7 economies, 2021.
This table reproduces the sectoral structure shown in EPISODE #005 so that the present episode can be read independently.
How to read this table:
We can convert the gap into a simple index called Relative Productivity:
Relative Productivity = Value-Added Share ÷ Employment Share
Interpretation: 1.00 = economy average; 1.20 = 20% above average; 0.80 = 20% below average.
| Country | Year | RP Index: Agr | RP Index: Ind | RP Index: Svc |
|---|---|---|---|---|
| Canada | 2021 | 1.171 | 1.310 | 0.837 |
| Germany | 2021 | 0.622 | 0.919 | 0.890 |
| France | 2021 | 0.582 | 0.824 | 0.906 |
| United Kingdom | 2021 | 0.779 | 1.002 | 0.878 |
| Italy | 2021 | 0.453 | 0.847 | 0.935 |
| Japan | 2021 | 0.319 | 1.233 | 0.944 |
| United States | 2021 | 0.577 | 0.932 | 0.980 |
Table 2. Implied relative productivity by sector, G7 economies, 2021.
Relative productivity is computed as value-added share divided by employment share.
Notes:
While most relative productivities cluster around 0.8–1.0, a few sectors stand out clearly:
These are not marginal deviations. They reflect structural positioning — how labor is distributed across sectors that differ greatly in productivity intensity.
Takeaway
Productivity differences become visible when structure is expressed numerically.
Relative productivity shows how strongly labor is positioned toward sectors that generate more or less value than their employment weight would suggest.
We can now ask a more precise version of the productivity question:
Unresolved Question:
→ If two countries utilize labor similarly, how much of their productivity gap is explained by sectoral allocation (employment shares) and sectoral advantage (relative productivity)?
Next:
EPISODE #007 — Where Does Productivity Actually Come From?
All tables and figures on this site are generated from publicly available macroeconomic datasets.