Hold on — that tempting 200% match with “low wagering” might not be what it seems. Short version: bonuses are offers wrapped in math, limits and rules. If you treat them like a free lunch, you’ll learn the bill is coming. Read this first: a quick, practical way to test whether a bonus is worth chasing, then a full breakdown of the risks and a checklist to protect your bankroll.
Here’s the quick calculator you can use immediately: Effective Turnover = Wagering Requirement × (Deposit + Bonus) / Contribution Rate. Example: 40× on D+B with 100% slot contribution and $100 deposit → 40 × ($100+$100)/1 = $8,000 of turnover. Yes, that’s eight thousand dollars of bets to clear a $100 bonus. Crazy? It’s common.
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Why bonuses look generous (and where the trap is)
Wow. Bonuses shine because they’re easy to advertise: big dollar figures, big percentages, bright banners. But the headline figure is only half the story.
On the one hand, a big match inflates your playing bank immediately, which feels great. But on the other hand, wagering requirements (WR), contribution rates, max bet caps and time limits determine real value. For slots players who get 100% contribution, that WR is straightforward; for table players with 5–10% contribution, it becomes punitive.
Practical note: always compute the turnover, then divide by the average bet size to see how many spins or hands you actually need. If your average spin is $1 and turnover is $8,000, you need 8,000 spins — unrealistic in seven days.
Core pieces of the bonus puzzle (terms that matter)
- Wagering Requirement (WR): multiplier applied to deposit, bonus, or both — know which.
- Contribution rates: which games count and at what percentage (slots 100%, blackjack 5%).
- Max bet during wagering: often very low to prevent aggressive clearing.
- Time window: 7 days vs 30 days changes feasibility.
- Max cashout from bonus wins: commonly capped (e.g., $300–$2,500).
- KYC and source-of-funds triggers: large wins require documentation and can delay payouts.
Mini-case: Two £100 deposits, two different outcomes
Short story: I once chased a 100% match with 40× WR and lost two days of play because I ignored contribution rules. Another time I took a 50% match with 20× WR but focused on high-RTP slots and cleared it in three sessions with modest variance. The difference was not luck alone — it was math and discipline.
Numbers matter. In the 100%/40× example: Effective turnover = 40 × ($100 + $100) = $8,000. With average slot RTP of 96% and house edge built-in, expected loss over that turnover is roughly 4% × $8,000 = $320 (ignoring variance). So the bonus doesn’t cover the expected loss unless the bonus value exceeds that loss and the max cashout allows it.
Comparison: Bonus approaches (table)
| Approach |
When to use |
Expected effort (turnover) |
Risk / Pitfall |
| Slots-focused clearing |
High slot contribution (≥80%), comfortable with variance |
High (WR × D+B) |
Variance can wipe bonus; long play time |
| Table-game attempt |
Low WR and higher table contribution (rare) |
Very high (low contribution rates) |
Often impossible; may breach terms |
| Cashback-only |
Frequent player who prefers predictable returns |
Low (no WR) |
Lower headline value but steady |
| No-bonus/full-cash |
High-rollers or advantage players |
None |
Missed short-term boost but better long-term EV |
Where to place that one helpful link (and why)
When you’re comparing bonus terms you’ll want a concise summary of what’s on offer and a place to check terms side-by-side. The casino’s official bonus page is often the authoritative source for exact WR, contribution tables and max cashout figures — for example, check the advertised offers and their terms at only-win.ca/bonuses before you commit. Use it to copy the exact phrasing of the WR and contribution rules so you can calculate real turnover.
Quick Checklist — what to do before you accept any bonus
- Read the WR wording carefully: is it on deposit only, bonus only, or D+B?
- Check contribution rates per game and plan to play matching games (e.g., slots if 100%).
- Compute Effective Turnover = WR × (Deposit + Bonus) × (1 / ContributionRate).
- Estimate expected loss = House Edge × Effective Turnover (use 4% for 96% RTP slots as a rough baseline).
- Compare expected loss to max cashout — if expected loss ≥ potential net gain, skip.
- Note max bet limits and time windows — adjust bet size to stay compliant.
- Save screenshots of the bonus terms and your balance at activation (KYC disputes).
Common Mistakes and How to Avoid Them
- Ignoring contribution rates: Players pick a game they enjoy (blackjack) but the bonus credits only 10% of those bets. Avoid by matching game choice to contribution.
- Underestimating time pressure: A 7-day WR on a large bonus is often impossible. Avoid by calculating spins/hands needed before accepting.
- Violating max bet rules: Using big bets to finish faster can get you flagged and forfeit the bonus. Avoid by setting a strict bet ceiling below the bonus max.
- No documentation: Failing to upload KYC files promptly can freeze withdrawals. Avoid by completing account verification before heavy wagering.
- Chasing variance: Trying to “force” a clearing session leads to tilt. Avoid with stop-loss rules and session limits.
Mini-FAQ (short, sharp answers)
Is every bonus mine to keep if I clear it?
No. Casinos can reverse bonuses if terms were breached (e.g., prohibited bet patterns, using excluded games). Keep records and stick to the written terms.
Can I ever game the system with different casinos?
Some attempt “matched play” strategies across sites, but identity checks, IP detection and T&Cs usually make sustained advantage play impractical and risky. Don’t rely on it.
Are crypto withdrawals safer for avoiding delays?
Crypto often processes faster, but KYC and source-of-funds checks still apply for large amounts. Speed helps but does not remove compliance holds.
What’s the safest approach as a beginner?
Prefer small, low-WR offers or cashback; avoid large D+B packages with high WR unless you’re prepared for long play and possible loss.
Practical mini-method: Calculate if a bonus is worth your time
Step 1 — Pull the terms: WR, contribution %, max cashout, time window, max bet.
Step 2 — Compute Effective Turnover (ET): ET = WR × (D + B) / ContributionRate.
Step 3 — Estimate Expected Loss (EL): EL ≈ (1 − RTP) × ET. For slots, use RTP = 0.96 as a conservative baseline unless you know the specific game’s RTP.
Step 4 — Compare EL to potential net from the bonus: NetPotential = BonusValue − EL, but capped at MaxCashout. If NetPotential ≤ 0, the bonus is mathematically negative for expected value.
Shortcut example: $100 deposit, 100% bonus ($100), 40× WR, slots 100% contribution, RTP 96%.
ET = 40 × ($100 + $100) = $8,000. EL ≈ 4% × $8,000 = $320. BonusValue = $100. NetPotential = $100 − $320 = −$220. That’s a loss on expectation even before variance. Not worth it for long-run value.
Two short, realistic tactics for bonus use
- Conservative spin-down: Use small, consistent bets (well under the max) on high-RTP slots, spread across the time window. This reduces variance spikes and lowers the chance of being flagged for max-bet violations.
- Cashback prioritization: If you’re a frequent player, prefer periodic cashback offers — they have no WR and reduce long-term volatility.
Responsible play and regulatory notes (CA context)
18+ only. Canadian provinces may have differing rules; always follow local law and the casino’s KYC requirements. Keep session limits, deposit limits, and self-exclusion options enabled if you notice chasing behaviour. If gambling is causing harm, reach out to local resources such as the Responsible Gambling Council (RGC) or provincial support lines.
Closing echo — a reality check
Alright, quick gut check: That shiny bonus probably looks more valuable than it is. My gut says caution, then the math confirms it. On paper a bonus can increase your playtime; in practice it often increases expected losses unless the terms are sane and your strategy matches them.
To be honest, I still take bonuses sometimes — but only after running the math above and setting clear bet-size and session limits. If you want to practice this calculation before clicking “accept”, take a screenshot of the T&Cs and run the numbers in a notebook. It avoids later disputes and keeps you in control.
Gamble responsibly. 18+ only. If you or someone you know needs help, contact your provincial gambling support service. Terms and conditions apply to all offers; always verify current rules with the operator.
Sources
- https://www.itechlabs.com/
- https://www.responsiblegambling.org/
- https://www.curacao-egaming.com/
About the Author
Jordan Miles, iGaming expert. Jordan has a decade of experience analyzing casino offers, payment flows and player protections across North America. He writes practical guides for smarter play and safer bankroll management.
