Position Sizing Cheat Sheet
A single-page reference to the main position sizing methods, their formulas placed side by side, a worked NSE example, and an honest comparison of what each one does well and where it fails.
Position Sizing Cheat Sheet: Position sizing decides how many units to trade, and the main methods are: fixed lots (always the same quantity), fixed-fractional or percentage-risk (risk a set fraction of equity, then derive quantity from the stop), Kelly and half-Kelly (size to a formula-driven optimal fraction of a known edge), and volatility or ATR sizing (size inversely to recent volatility). The most widely used honest default is the percentage-risk model: Risk per trade = Capital times Risk%, and Quantity = risk divided by (stop distance times point value). Every method here is a standard formula or a labelled heuristic for education only, and none promises profit.
Position sizing usually matters more to long-run results and to the shape of your drawdowns than the entry rule itself. This page places the main methods side by side with their formulas, works a full NSE example, and compares them honestly, including where each one misleads. The percentages and the Kelly output are estimates and heuristics, not guarantees; sizing controls risk, it does not create an edge. For the surrounding rules see the Risk Management Cheat Sheet.
The methods and their formulas
| Method | Formula | Variables |
|---|---|---|
| Fixed lots | Quantity = a constant (e.g. 1 lot) | Fixed by the trader regardless of capital or stop. |
| Fixed-fractional / percentage-risk | Risk = Capital × Risk% ; Quantity = Risk ÷ (Stop distance × Point value) | Capital = equity in ₹; Risk% = fraction risked; Stop distance = entry − stop in points; Point value = ₹ per point per unit. |
| Kelly | f* = W − (1 − W) ÷ R | f* = fraction of capital to risk; W = win probability; R = payoff ratio (avg win ÷ avg loss). |
| Half-Kelly | f = 0.5 × f* | Half the Kelly fraction; quarter-Kelly uses 0.25 × f*. |
| Volatility / ATR sizing | Quantity = Risk budget ÷ (ATR × Point value) | Risk budget = ₹ allotted to the trade; ATR = average true range in points; Point value = ₹ per point per unit. |
The percentage-risk model in detail
This is the workhorse of honest position sizing, because it holds the money at risk constant across trades of different stop widths. Two steps:
1. Risk per trade = Capital × Risk%
2. Quantity = Risk per trade ÷ (Stop distance × Point value)
Capital is account equity in ₹; Risk% is the fraction you accept losing on the trade (0.5% to 2% is a common heuristic); Stop distance is entry minus stop in points; Point value is the ₹ per point per unit, which for index derivatives is the lot multiplier. A wider stop yields a smaller quantity, keeping the rupee risk fixed.
Worked NSE example (illustrative only)
Suppose capital is ₹5,00,000 and you risk 1% per trade. You trade Nifty, where one lot is 75 units, so the point value is ₹75 per point. Your stop is 40 points from entry.
- Risk per trade = ₹5,00,000 × 1% = ₹5,000.
- Risk per lot = 40 points × ₹75 = ₹3,000.
- Quantity = ₹5,000 ÷ ₹3,000 ≈ 1.67 lots.
- Round down to 1 lot, because 2 lots would risk ₹6,000, breaching the ₹5,000 budget.
At 1 lot your actual risk is ₹3,000, or 0.6% of capital, comfortably inside the limit. If the stop were tighter, say 20 points (₹1,500 per lot), the same ₹5,000 budget would allow 3 lots. These are illustrative figures, not a recommendation, and they exclude brokerage, STT, GST and slippage, which raise the true cost of the trade.
Comparison of methods
| Method | What it does | Pro | Con | Blind spot |
|---|---|---|---|---|
| Fixed lots | Trades a constant quantity every time. | Simple; easy to execute and track. | Per-trade risk drifts with stop width and price. | Ignores the stop entirely, so a wide-stop trade risks far more than a tight one. |
| Percentage-risk | Holds rupee risk constant as a set fraction of equity. | Compounds after wins, shrinks after losses; risk stays uniform. | Needs a defined stop; small accounts hit the one-lot floor. | Assumes the stop reflects true risk; a gap can blow past it. |
| Kelly | Sizes to the growth-optimal fraction of a known edge. | Maximises long-run growth if inputs are exact. | Produces severe drawdowns; very sensitive to input error. | Assumes W and R are known precisely, which live trading never delivers. |
| Half-Kelly | Bets half the Kelly fraction. | Cuts volatility and drawdown sharply for little lost growth. | Still relies on estimating the edge. | A wrong edge estimate still oversizes, just less than full Kelly. |
| Volatility / ATR | Sizes inversely to recent volatility. | Equalises risk contribution across instruments and regimes. | Reacts to volatility changes with a lag. | Volatility can jump faster than the ATR updates, understating fresh risk. |
Using Kelly safely
The Kelly fraction f* = W − (1 − W) ÷ R gives the bet size that maximises long-run growth for a known edge, where W is the win probability and R the payoff ratio. Two cautions make it usable rather than dangerous:
- It is an upper bound, not a target. Full Kelly produces large, uncomfortable drawdowns, and it assumes W and R are exact. In trading they are noisy estimates, so full Kelly systematically oversizes.
- Bet a fraction of it. Half-Kelly or quarter-Kelly retains most of the growth while cutting volatility and drawdown substantially. This is why practitioners almost never trade full Kelly.
If the Kelly formula returns zero or a negative number, the implied edge is non-existent; the correct size is not a small bet but no bet.
Volatility and ATR sizing
Volatility sizing allots each trade a risk budget and converts it to quantity using a volatility measure, usually the ATR: Quantity = Risk budget ÷ (ATR × Point value). A volatile instrument gets a smaller position and a calm one a larger position, so each contributes similar risk to the portfolio. The trade-off is lag: because the ATR is a trailing average, a sudden volatility spike is under-counted until the average catches up, so a gap or event can deliver more risk than the sizing assumed.
Choosing a method
- For most discretionary traders with defined stops, the percentage-risk model is the sensible default: uniform risk, natural compounding, simple maths.
- Volatility or ATR sizing suits systematic and multi-instrument portfolios where equalising risk across positions matters.
- Kelly, used at a fraction, is a useful sanity check on how aggressive a size is, not a size to adopt literally.
- Fixed lots is acceptable only when capital and stop widths are stable, or as a deliberately simple starting point.
Whichever method you use, it controls risk and shapes the equity curve; it does not manufacture an edge. Every formula and figure here is educational and evergreen, and none of it promises a profit.
Frequently asked questions
What is the most reliable position sizing method?
How do I size a Nifty position from a stop?
What does the Kelly criterion actually give me?
Why use half-Kelly instead of full Kelly?
What is volatility or ATR-based position sizing?
What is wrong with trading fixed lots?
Does correct position sizing guarantee profit?
What if the Kelly formula gives a negative number?
Last reviewed 12 July 2026. Educational content only — not investment advice.