Fixed Position Sizing
Fixed position sizing is trading the same constant quantity on every trade regardless of account size, so a backtest measures the raw quality of the entry and exit rules without letting a compounding or scaling scheme flatter or distort the equity curve.
Quick answer: Fixed position sizing is trading the same constant quantity on every trade regardless of account size, so a backtest measures the raw quality of the entry and exit rules without letting a compounding or scaling scheme flatter or distort the equity curve.
In simple words
Fixed position sizing means you always trade the same amount, for example one Nifty lot on every signal, no matter how big or small your account has become. It is the simplest possible sizing rule and the cleanest way to see whether a trading idea actually works. Because the bet never grows with the account, the equity curve rises in a straight-line, additive way rather than compounding.
Purpose
Fixed sizing exists as the neutral baseline for validation: it isolates the signal from the money-management overlay, so you can judge whether the rules have an edge before deciding how aggressively to bet on them.
Visual explanation
Fixed Position Sizing
A constant quantity applied across trades of different account sizes, producing additive rather than compounding growth.
Professional explanation
What fixed sizing actually holds constant
Fixed position sizing fixes the traded quantity, not the money at risk. Trading one Nifty lot of 75 units means the notional exposure and the rupee risk per trade change as price and volatility change, even though the lot count is constant. This is the crucial subtlety: a constant contract count is not constant risk, because a wider stop or a higher price silently increases the rupees exposed. In a backtest this makes fixed sizing simple to implement but means the risk per trade drifts with market conditions unless you deliberately hold it steady.
Why it is the right baseline for validation
When you are testing whether an entry and exit rule has genuine edge, any sizing scheme that scales bets with recent wins or account equity can inflate or hide the underlying performance. Fixed sizing removes that overlay, so the sequence of per-trade results reflects the signal alone. Expectancy, win rate and payoff ratio computed on a fixed-size series are the honest inputs you later feed into a Kelly or fixed-fractional calculation. Most disciplined research therefore runs the first pass at one unit per trade and only adds a sizing model once the edge is established.
The equity curve it produces
Because the bet does not grow with the account, a fixed-size backtest compounds additively rather than geometrically. Each winning trade adds roughly the same rupee amount regardless of how large the account has become, so the equity curve tends toward a straight line rather than the upward-curving exponential of a compounding scheme. This makes drawdowns easier to read as absolute rupee figures, but it also understates the growth a live trader would achieve by scaling up, and it makes early and late trades contribute equally, which is unrealistic for anyone reinvesting profits.
Fixed size and risk of ruin
With a constant quantity, risk of ruin depends on the ratio of the fixed bet to total capital and on the strategy's win rate and payoff. If one lot risks a large fraction of a small account, a normal losing streak can be terminal even when the long-run expectancy is positive. Conversely, if the fixed size is tiny relative to capital, ruin is nearly impossible but growth is glacial. Because the fraction at risk falls automatically as the account grows and rises as it shrinks, fixed sizing is anti-martingale in reverse: it bets a larger share precisely when you can least afford it, which is its most dangerous property.
When fixed sizing is genuinely appropriate
Beyond research baselines, fixed sizing suits accounts constrained by lot indivisibility, such as F&O where you cannot trade a fraction of a Nifty lot, and it suits strategies where consistent, comparable trade records matter more than growth optimisation. It is also the honest way to report a track record, since compounding can make a mediocre edge look dramatic over a long sample. The trade-off is that it leaves geometric growth on the table and does not adapt the bet to changing conviction, volatility or account size.
Fixed size vs Fixed-fractional
| Aspect | Fixed size | Fixed-fractional |
|---|---|---|
| What is held constant | Quantity (e.g. 1 lot) | Fraction of capital risked |
| Equity curve shape | Additive, near-linear | Geometric, compounding |
| Risk per trade | Drifts with price and stop | Held roughly constant in percent |
| Behaviour after losses | Fraction at risk rises | Rupee bet shrinks with account |
| Best use | Signal validation baseline | Growth once edge is proven |
Practical example
Illustrative example (Indian market)
You test a Bank Nifty breakout rule on capital of Rs 5,00,000 and trade a constant 1 lot every time. Over the sample the strategy takes 200 trades; each winner adds roughly the same rupee amount because the position never grows. The equity curve rises from Rs 5,00,000 toward Rs 7,00,000 in a broadly straight line. When you re-run the same signals with a fixed-fractional overlay that risks 1 percent per trade, the later trades are far larger and the curve bends upward, ending higher but with deeper percentage drawdowns. The signals are identical; only the sizing changed, which is exactly why the fixed-size run is the fairer test of the idea itself.
In NSE F&O you cannot trade half a Nifty lot of 75, so fixed sizing at one lot is often the practical floor for a small account. On capital of Rs 5,00,000 a single Nifty lot near 25,000 carries roughly Rs 18,75,000 of notional exposure, so even the minimum fixed size is a large bet, which is why lot indivisibility forces sizing decisions on Indian retail traders that a fractional-share market would not.
Limitations
- A constant quantity is not constant risk, because rupee exposure drifts with price and stop width
- It bets a larger share of capital after losses shrink the account, worsening risk of ruin
- It forgoes geometric growth, understating what a compounding trader would achieve
- Lot indivisibility in F&O means the minimum fixed size can already be too large for a small account
- It does not adapt to volatility or conviction, so calm and turbulent regimes get the same bet
Why it matters in practice
- It is the cleanest way to measure whether a signal has real edge before adding money management
- It makes absolute-rupee drawdowns easy to read but hides the compounding a live trader would get
Common mistakes
- Believing a constant lot count means constant risk, when a wider stop quietly increases rupees at risk
- Comparing a fixed-size backtest curve directly against a compounding one without noting the sizing difference
- Setting the fixed size so large that a routine losing streak can ruin a small account
- Leaving sizing at one lot in production purely because it was convenient in research
- Reporting a compounded track record while the signal was actually validated at fixed size, mixing the two
- Ignoring that fixed sizing bets more of the account exactly after a drawdown has already hurt
Professional usage
Professional researchers almost always begin at one unit per trade precisely because it strips the money-management overlay away and exposes the signal. They compute expectancy, win rate, payoff and maximum drawdown on the fixed-size series, treat those as the ground-truth statistics of the edge, and only then layer a fixed-fractional or volatility-target scheme on top for the production sizing study. Reporting standards at serious desks often show both a fixed-size and a compounded curve so a reader can separate skill from the flattering effect of reinvestment.
Key takeaways
- Fixed sizing trades a constant quantity and is the neutral baseline for judging a signal
- A constant lot count is not constant risk; rupee exposure drifts with price and stop
- It produces an additive, near-linear equity curve rather than compounding growth
- It bets a larger share of capital after losses, which is its main risk-of-ruin flaw
- Validate the edge at fixed size first, then add a sizing model for production
Frequently asked questions
What is fixed position sizing?
Does fixed sizing mean constant risk per trade?
Why use fixed sizing in a backtest?
What does a fixed-size equity curve look like?
Is fixed sizing safe?
How does fixed sizing affect risk of ruin?
When is fixed sizing the right choice?
How is fixed sizing different from fixed-fractional?
Why does fixed sizing understate live growth?
Can I compound a fixed-size backtest afterward?
Does lot indivisibility force fixed sizing?
Why is a constant lot count risky after a drawdown?
Should I report backtests at fixed size or compounded?
Is fixed sizing suitable for production trading?
Voice search & related questions
Natural-language questions people ask about Fixed Position Sizing.
What is fixed position sizing in simple terms?
Does trading one lot every time keep my risk the same?
Why do traders use fixed sizing when testing?
Is fixed sizing dangerous?
Should I keep fixed sizing when I go live?
Why does a fixed-size equity curve look like a straight line?
Sources & references
Last reviewed 12 July 2026. Educational content only — not investment advice. Markets and rules change; verify current conventions with SEBI, NSE/BSE and your broker.