The Marginal Product of Labour is Equal to the Average Product of Labour at Its Peak
When a firm hires workers, it wants to know how much extra output each new worker will generate. On top of that, that extra output is called the marginal product of labour (MPL). In micro‑economics, a key relationship ties the MPL to the average product of labour (APL): the MPL is equal to the APL precisely at the point where the APL reaches its maximum. Understanding this relationship clarifies why firms stop hiring more workers once the MPL falls below the average and helps explain the shape of production curves.
Introduction
In any production process, labour is one of the primary inputs. In practice, the marginal product of labour measures this incremental benefit. The average product of labour shows the output per worker on average. On top of that, by adding more workers, a firm raises its total output, but the incremental benefit of each additional worker is not constant. The intersection of these two concepts—where the marginal product equals the average product—occurs at the peak of the average product curve. This article explores why this equality holds, how it emerges mathematically, and what practical implications it has for managers and students of economics.
The Production Function and Key Definitions
A production function, Q = f(L, K), expresses total output (Q) as a function of labour (L) and capital (K). For simplicity, we often hold capital constant and examine how output changes with labour alone Easy to understand, harder to ignore..
- Total Product (TP): The total quantity of output produced with a given amount of labour.
- Average Product of Labour (APL): TP divided by the number of workers, APL = TP / L. It represents the output per worker on average.
- Marginal Product of Labour (MPL): The additional output produced by adding one more worker, MPL = ΔTP / ΔL.
Graphically, TP rises at an increasing rate, then at a decreasing rate, and eventually declines if labour is the only input. On the flip side, the APL curve rises, reaches a maximum, and then falls. The MPL curve is the slope of the TP curve; it starts high, decreases, and may become negative.
Why MPL Equals APL at the Peak of APL
1. Calculus Insight
Mathematically, the average product is a function of labour:
[ APL(L) = \frac{TP(L)}{L} ]
The marginal product is the derivative of TP with respect to labour:
[ MPL(L) = \frac{d,TP(L)}{dL} ]
To find where APL is maximized, take the derivative of APL with respect to L and set it to zero:
[ \frac{d}{dL}\left(\frac{TP(L)}{L}\right) = 0 ]
Using the quotient rule:
[ \frac{L \cdot TP'(L) - TP(L)}{L^2} = 0 ]
Multiplying both sides by (L^2) (which is positive) yields:
[ L \cdot TP'(L) - TP(L) = 0 ]
Rearranging:
[ TP'(L) = \frac{TP(L)}{L} ]
But (TP'(L) = MPL(L)) and (\frac{TP(L)}{L} = APL(L)). Therefore:
[ MPL(L) = APL(L) ]
Thus, mathematically, the condition that the average product is at its maximum is exactly that the marginal product equals the average product.
2. Economic Intuition
Think of hiring workers one by one. Day to day, as more workers join, the average output per worker may rise if the MPL is still above the current average. When the first worker arrives, the average product is the same as the marginal product because no other workers exist to dilute the output. And any further worker who adds less than the average will pull the average down, and any worker who adds more will lift it. Day to day, when the MPL equals the current average, each new worker contributes exactly the same amount as the current average output, so the average does not change. The point where the MPL equals the APL is the tipping point: after this, adding workers reduces the average output per worker.
Visualizing the Relationship
| Labour (L) | Total Product (TP) | APL (TP/L) | MPL (ΔTP/ΔL) |
|---|---|---|---|
| 1 | 10 | 10 | 10 |
| 2 | 22 | 11 | 12 |
| 3 | 30 | 10 | 8 |
| 4 | 34 | 8.5 | 4 |
| 5 | 35 | 7 | 1 |
Not obvious, but once you see it — you'll see it everywhere.
- APL peaks at L = 2 where APL = 11.
- MPL at L = 2 is also 12, slightly above APL, indicating that the average is still rising.
- At L = 3, MPL (8) falls below APL (10), signaling that adding a third worker would reduce the average output.
- The exact equality occurs between L = 2 and L = 3, where the incremental output equals the average output. In a continuous model, this equality would be exact.
Practical Implications for Firms
1. Hiring Decisions
A firm should continue hiring new workers as long as the marginal revenue product (MRP)—the additional revenue generated by an extra worker—exceeds the wage rate. Since the MRP is the MPL multiplied by the price of output, the firm’s hiring rule is:
[ MRP = MPL \times P \geq w ]
When MPL falls below the average product, it signals diminishing returns. If the wage rate is fixed, the firm may stop hiring once MPL < w, even if the average product remains high Small thing, real impact..
2. Productivity Management
Understanding the MPL–APL relationship helps managers identify the optimal labor intensity for a given capital stock. Plus, if the firm is operating at a point where MPL > APL, it can increase output by hiring more workers. Conversely, if MPL < APL, it should consider reducing labour or investing in capital to shift the production function.
3. Cost Analysis
The average variable cost (AVC) curve is inversely related to the APL. When APL is at its maximum, AVC is at its minimum. Thus, the point where MPL = APL also marks the lowest average cost per unit of output, a critical benchmark for pricing and competitive strategy.
Common Misconceptions
| Misconception | Reality |
|---|---|
| *MPL always equals APL.Consider this: * | Only at the peak of the APL curve. |
| *Higher MPL always means higher profits.Still, * | Profit depends on marginal revenue, not just marginal product. |
| Diminishing MPL means diminishing returns forever. | Diminishing returns are temporary; after a decline, the MPL may rise again if the firm changes capital or technology. |
Frequently Asked Questions
Q1: How does capital affect the MPL–APL relationship?
Holding capital constant, the relationship holds. That said, increasing capital can shift the production function upward, raising both MPL and APL. The equality point still occurs where MPL = APL, but the values will be higher.
Q2: What happens if labour is the only input and you keep hiring?
If labour is the sole input, the law of diminishing returns eventually forces MPL to become negative. Once MPL < 0, adding more workers reduces total output, and the average product will also decline sharply Not complicated — just consistent..
Q3: Can technology change the point where MPL equals APL?
Yes. Consider this: technological improvements can make each worker more productive, shifting the TP curve upward. This means the peak of APL rises and occurs at a higher level of labour, potentially allowing the firm to hire more workers before diminishing returns set in Not complicated — just consistent. That alone is useful..
Conclusion
The equality of the marginal product of labour and the average product of labour at the peak of the average product curve is a cornerstone of production theory. By recognizing this point, firms can optimize hiring, manage costs, and strategically invest in capital or technology. It emerges from simple calculus and offers powerful intuition for managerial decisions. For students, grasping this relationship deepens their understanding of how inputs translate into outputs and how economies of scale and diminishing returns shape real-world business practices Worth keeping that in mind..
