An arithmetic gradient series is a cash-flow pattern that starts at zero in period 1, grows by a constant amount each period, and reaches in period . The cash flow in period is :
| Period | 1 | 2 | 3 | … | |
|---|---|---|---|---|---|
| Cash flow | 0 | … |
Two factors handle the standard equivalences:
Arithmetic gradient to present worth.
Arithmetic gradient to annuity.
The first gives the present worth of the whole gradient stream; the second converts the gradient into the equivalent annuity of equal payments (different magnitude than the gradient’s terms, but same total present worth).
When cash flows look like (a constant base plus an arithmetic gradient), split into two pieces: a uniform annuity of and a pure arithmetic gradient with first term and step . Then combine:
Where it shows up: an asset’s maintenance cost rising by a roughly constant amount each year as it ages (\0$200$400$ year 3, …), a contract whose payments step up by a fixed annual amount, a depreciation pattern in some accounting conventions. Constant change per period, not constant amount.
For the multiplicative version, where cost grows by a constant percentage each period, see Geometric gradient series.