Risk vs Reward
Risk versus reward is the comparison between the amount you can lose if a trade goes wrong and the amount you can gain if it goes right, expressed as a reward-to-risk ratio that must be judged together with the probability of each outcome.
Quick answer: Risk versus reward is the comparison between the amount you can lose if a trade goes wrong and the amount you can gain if it goes right, expressed as a reward-to-risk ratio that must be judged together with the probability of each outcome.
In simple words
Every trade has two sides: how much you can lose and how much you can gain. Risk versus reward compares them, usually as a ratio like 2 to 1, meaning you aim to gain twice what you risk. But a ratio alone means nothing without the odds; a great reward-to-risk with a tiny chance of winning is still a bad bet. The two together, ratio and probability, decide whether a trade is worth taking.
Purpose
This page defines the reward-to-risk ratio, shows how it combines with win probability to determine expectancy, and warns why the ratio is meaningless in isolation.
Visual explanation
Risk vs Reward
A trade's potential reward measured against the distance to its stop, expressed as a reward-to-risk ratio.
Professional explanation
Defining the reward-to-risk ratio
The reward-to-risk ratio compares the distance from entry to the profit target against the distance from entry to the stop-loss. If you enter Nifty at 25,000 with a stop at 24,900 and a target at 25,200, you are risking 100 points to make 200, a reward-to-risk of 2 to 1. The ratio is a property of the trade plan, fixed by where you place the target and stop, and it is what tells you how large a winner is relative to a loser. It is often written the other way as risk-to-reward, so always confirm which convention is meant before comparing figures.
The ratio is meaningless without probability
A reward-to-risk ratio says nothing about whether a trade is worth taking until it is paired with the probability of hitting the target versus the stop. A 5 to 1 ratio that only wins 10 percent of the time is a losing proposition, while a 1 to 1 ratio that wins 70 percent of the time is profitable. This is the most common misunderstanding of the concept: beginners chase high ratios without asking how often those targets are actually reached. Reward-to-risk and win rate are two blades of the same scissor, and neither cuts alone.
Expectancy: combining ratio and odds
The quantity that actually matters is expectancy, the average profit or loss per trade over many trades. Expectancy equals the win probability times the average win, minus the loss probability times the average loss. A positive expectancy means the strategy makes money on average; a negative one means it loses no matter how good any single trade felt. The reward-to-risk ratio and the win rate are simply the inputs to expectancy, which is why professionals think in expectancy rather than in either number alone.
The breakeven win rate for a given ratio
For any reward-to-risk ratio there is a breakeven win rate below which the strategy loses and above which it profits, before costs. At 1 to 1 you need to win more than 50 percent; at 2 to 1 you need more than about 33 percent; at 3 to 1 more than 25 percent. This inverse relationship is why a higher reward-to-risk ratio lets you be right less often and still profit, and why cutting losses short, which raises the effective ratio, is such a powerful habit. Costs raise every one of these breakeven thresholds, so the real bar is always a little higher than the theory.
Why the ratio interacts with the asymmetry of loss
Reward-to-risk connects directly to the survival theme of the whole discipline. Trades with poor reward-to-risk, small gains against large losses, are exactly the payoff shape that produces deep drawdowns, because the occasional loss undoes many wins. Selling options naked is the archetype: a high win rate with a terrible reward-to-risk, where one loss can dwarf dozens of gains. Insisting on a sensible reward-to-risk keeps individual losses bounded relative to gains, which keeps drawdowns shallow and recovery realistic.
Reward-to-risk is a plan, not a guarantee
The ratio is defined by your intended target and stop, but the market does not promise to honour either. Stops can gap through their level on news, making the realised loss larger than planned, and targets are often not reached before a reversal. A backtested or assumed reward-to-risk therefore describes intention, not outcome, and the realised distribution of wins and losses can differ materially. Treating the planned ratio as if it were the guaranteed result is a subtle but common error that flatters expectations.
Formula
Reward-to-risk = (Target − Entry) ÷ (Entry − Stop); Breakeven win rate = 1 ÷ (1 + Reward-to-risk)
Target = intended profit price; Entry = entry price; Stop = stop-loss price; Reward-to-risk = potential gain divided by potential loss in the same units. Breakeven win rate is the minimum fraction of trades that must hit target, before costs, for expectancy to be zero. Example: reward-to-risk of 2 gives a breakeven win rate of 1 ÷ 3 ≈ 33 percent.
Amateur view vs professional view of risk and reward
| Aspect | Amateur view | Professional view |
|---|---|---|
| Focus | How much can I make | How much can I lose to make it |
| Ratio use | Chase the highest reward-to-risk | Judge reward-to-risk against win probability |
| Decision metric | Feels like a big winner | Positive expectancy over many trades |
| Loss size | An afterthought | The first number set, via the stop |
| High win rate | Proof the system works | Suspect if paired with tiny wins and huge losses |
Practical example
Illustrative example (Indian market)
A trader plans a Nifty long at 25,000 with a stop at 24,900 and a target at 25,200 on Rs 5,00,000. The risk is 100 points and the reward is 200, a reward-to-risk of 2 to 1, so the breakeven win rate is about 33 percent. With one lot of 75, the risk is 100 times 75, Rs 7,500, and the target reward is Rs 15,000. If historical testing suggests this setup hits target about 45 percent of the time, expectancy per trade is roughly 0.45 times Rs 15,000 minus 0.55 times Rs 7,500, about Rs 2,625 before costs. Subtract brokerage, STT and slippage, and the edge is thinner but still positive; without the favourable ratio, the same 45 percent win rate at 1 to 1 would lose money.
On NSE a common trap is selling deep out-of-the-money Bank Nifty options for a high win rate. The reward-to-risk can be 1 to 10 or worse, so a single adverse expiry can erase months of small premiums; the attractive hit rate hides a payoff shape that guarantees eventual deep drawdowns.
Limitations
- The ratio is meaningless without a reliable estimate of win probability
- Planned reward-to-risk assumes stops and targets fill at their levels, which gaps break
- Estimated win rates are uncertain and drift as market regimes change
- It says nothing about correlation between trades or portfolio-level risk
- Costs raise every breakeven threshold, so theory overstates the real edge
Common mistakes
- Chasing high reward-to-risk without asking how often the target is hit
- Confusing reward-to-risk with risk-to-reward and inverting the ratio
- Treating the planned ratio as a guaranteed outcome despite gaps and reversals
- Preferring a high win rate with tiny wins and rare huge losses
- Widening the stop after entry, silently worsening the real reward-to-risk
- Ignoring costs, which push the true breakeven win rate above the textbook figure
Professional usage
Professional traders judge every setup by expectancy, not by the reward-to-risk ratio or the win rate alone. They set the stop first to define the risk, size the position off that risk, and only then assess whether the reachable reward and the realistic probability combine to a positive edge net of costs. They are especially wary of high-win-rate, poor-ratio payoffs, because those hide the tail loss that produces ruinous drawdowns.
Key takeaways
- Reward-to-risk compares potential gain to potential loss on a trade
- The ratio is meaningless without the probability of hitting the target
- Expectancy, win rate times average win minus loss rate times average loss, is what matters
- A higher reward-to-risk lowers the win rate you need, keeping losses bounded
Frequently asked questions
What is the reward-to-risk ratio?
What is a good risk-reward ratio?
Why is the ratio meaningless without probability?
What is expectancy?
What win rate do I need for a 2 to 1 reward-to-risk?
How does reward-to-risk relate to cutting losses?
Is a high win rate always good?
How do costs affect reward-to-risk?
Does the planned ratio always hold?
Is risk-to-reward the same as reward-to-risk?
How do I set a reward-to-risk ratio in practice?
Can I improve expectancy without a better win rate?
Why do professionals set the stop before the target?
Does a 1 to 1 reward-to-risk ever make sense?
Voice search & related questions
Natural-language questions people ask about Risk vs Reward.
What is risk reward in trading?
What is a good risk reward ratio?
Why isn't a big reward ratio enough?
What win rate do I need for two to one?
Is a high win rate always a good thing?
What does expectancy mean?
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.