Why Buying 2× $5 Tickets Often Beats One $10 Ticket — Data-Backed Proof
Conventional wisdom says "buy the most expensive ticket you can afford." Our data says otherwise. Across 43 states and thousands of active scratch-off games, we consistently find cases where splitting your budget across two cheaper tickets delivers higher expected value than a single expensive one. Here's the math, the data, and the strategy.
Last updated: May 2026 · Analysis runs daily across all tracked states
The Concept: Alternative Strategy Analysis
Every day, our system analyzes every active scratch-off game in every state we track. For each game priced $5 and above, we ask a simple question:
"Could you get more expected value by spending the same money on a combination of cheaper tickets instead?"
The answer is surprisingly often yes. Here's why:
- Expensive tickets aren't always the best value at their price point. A $10 game with -45% ROI is objectively worse than two $5 games each at -15% ROI.
- Cheaper tiers sometimes have standout games. When a $5 game has unusually high EV (maybe its top prizes are intact while competitors' are gone), buying two of those beats one mediocre $10 game.
- Diversification reduces variance. Two tickets give you two independent chances to win, which can matter for games with concentrated prize structures.
What We Mean by "Beats"
When we say Combo A "beats" Game B, we mean:
Total EV of Combo > EV of Single Expensive Ticket
For the same total spend. If a $10 ticket has EV of $5.50, but two specific $5 tickets have combined EV of $6.20, the combo wins by $0.70 — a 12.7% EV improvement.
How the Algorithm Works
Our alternative strategy engine runs after every data update. Here's the process:
Step 1: Find the Best Game at Each Price Tier
For each price point ($1, $2, $3, $5, $10, $20, $25, $30, $50), we identify the game with the highest EV-per-dollar (best ROI). This is the "champion" at that tier.
Step 2: For Each Expensive Game, Build the Best Cheaper Combo
For every game priced above the minimum tier, we construct the optimal combination of cheaper-tier champions that totals the same spend (or less).
- 4× the best $5 game = $20 total
- 2× the best $10 game = $20 total
- 1× the best $10 game + 2× the best $5 game = $20 total
- 1× the best $10 game + 1× the best $5 game + 1× the best $3 game + 1× the best $2 game = $20 total
Step 3: Compare and Flag
If the best combo's total EV exceeds the expensive game's EV, we flag that game with an alternative strategy. We record:
| Field | What It Means |
|---|---|
alt_strategy_combo | The specific games and quantities in the better combo |
alt_strategy_total_ev | Combined EV of the cheaper combo |
alt_strategy_ev_difference | Dollar amount the combo beats the expensive game by |
alt_strategy_ev_difference_pct | Percentage improvement (e.g., +7.1%) |
alt_strategy_overall_odds | Combined probability of winning at least one prize |
Step 4: Aggregate Into Hub Summary
For each state, we aggregate the results into a per-tier summary showing how many games at each price point have a better alternative, the average improvement, and the single best combo available.
Live Data: Current Best Combos by Price Tier
The tables below are generated from our live production data. They show the current best alternative strategy combos across multiple states, updated daily.
Best Combos Across States (Today's Data)
| State | Price Tier | Games With Better Combo | Avg EV Improvement | Best Combo Available |
|---|---|---|---|---|
| Illinois | $2 | 3 of 5 (60%) | +3.5% | 2x Emeralds ($1) |
| Illinois | $3 | 3 of 4 (75%) | +3.1% | 1x 10X Xtra ($2) + 1x Emeralds ($1) |
| Florida | $2 | 18 of 18 (100%) | +24.4% | 2x $10,000 GOLD RUSH MULTIPLIER ($1) |
| Florida | $3 | 5 of 5 (100%) | +26.5% | 3x $10,000 GOLD RUSH MULTIPLIER ($1) |
| Texas | $3 | 1 of 4 (25%) | +13.5% | 1x Find $200 ($2) + 1x 9s In A Line ($1) |
| Texas | $5 | 5 of 17 (29%) | +3.3% | 1x Cashword ($3) + 1x Find $200 ($2) |
| California | $2 | 3 of 8 (38%) | +9.1% | 2x Rockin' Riches ($1) |
| California | $3 | 4 of 6 (67%) | +7.7% | 1x $pring Green ($2) + 1x Rockin' Riches ($1) |
| Pennsylvania | $2 | 2 of 4 (50%) | +59.9% | 2x Ho Ho Ho ($1) |
| Pennsylvania | $3 | 4 of 4 (100%) | +282.7% | 1x LOVE IS BLIND ($2) + 1x Ho Ho Ho ($1) |
| Ohio | $2 | 13 of 15 (87%) | +13.0% | 2x Holiday Cash ($1) |
| Ohio | $5 | 14 of 20 (70%) | +7.0% | 2x Set For Life ($2) + 1x Holiday Cash ($1) |
| New York | $2 | 17 of 17 (100%) | +73.5% | 2x INSTANT TAKE 5 ($1) |
| New York | $3 | 8 of 8 (100%) | +53.0% | 3x INSTANT TAKE 5 ($1) |
| Arizona | $3 | 2 of 4 (50%) | +1.4% | 1x Frida Kahlo® Viva La Vida ($2) + 1x 10X The Cash ($1) |
| Arizona | $20 | 1 of 5 (20%) | +2.0% | 2x Ka-Pow ($10) |
| Georgia | $2 | 4 of 16 (25%) | +5.6% | 2x DOUBLE IT! ($1) |
| Georgia | $3 | 6 of 8 (75%) | +25.4% | 1x KICK 'n CASH ($2) + 1x DOUBLE IT! ($1) |
| North Carolina | $2 | 3 of 10 (30%) | +8.2% | 2x Lucky 7s ($1) |
| North Carolina | $3 | 2 of 2 (100%) | +5.7% | 1x 10X The Cash ($2) + 1x Lucky 7s ($1) |
Today's Top Finding: In Pennsylvania, the $50 tier has a combo that delivers +563.4% more EV: 5x $50, $100 or $500 ($10). View Pennsylvania games →
Multi-State Case Studies
Let's look at specific examples from different states to see how this plays out in practice.
Florida: The Perfect Gift ($20)
| Option | What You Buy | Total EV | ROI |
|---|---|---|---|
| Single Ticket | 1× The Perfect Gift ($20) | $15.78 | -21.1% |
| Better Combo | 2× $50, $100 & $500 BLOWOUT ($10) | $30.28 | +91.9% more EV |
Florida: Millionaire Maker ($5)
| Option | What You Buy | Total EV | ROI |
|---|---|---|---|
| Single Ticket | 1× Millionaire Maker ($5) | $2.54 | -49.1% |
| Better Combo | 5× $10,000 GOLD RUSH MULTIPLIER ($1) | $3.97 | +56.2% more EV |
Florida: FIND the 7s ($2)
| Option | What You Buy | Total EV | ROI |
|---|---|---|---|
| Single Ticket | 1× FIND the 7s ($2) | $1.27 | -36.6% |
| Better Combo | 2× $10,000 GOLD RUSH MULTIPLIER ($1) | $1.59 | +25.3% more EV |
Florida: Easy Money ($2)
| Option | What You Buy | Total EV | ROI |
|---|---|---|---|
| Single Ticket | 1× Easy Money ($2) | $1.35 | -32.4% |
| Better Combo | 2× $10,000 GOLD RUSH MULTIPLIER ($1) | $1.59 | +17.6% more EV |
When the Rule Breaks
The "two cheaper tickets beat one expensive ticket" rule isn't universal. Here are the situations where it doesn't apply:
1. When the Expensive Game Has Exceptional ROI
If a $20 game has +5% ROI (positive expected value), it's unlikely that any combo of cheaper tickets will beat it — because positive-ROI games are already the best available at any price. Our algorithm only flags alternatives when they're genuinely better.
2. At the Minimum Price Tier
$1 tickets (or whatever the cheapest tier is in a state) can't have alternatives — there's nothing cheaper to combine. The strategy only applies to games priced above the minimum available tier.
3. When All Cheaper Tiers Are Depleted
If every $5 game in a state has terrible ROI (all top prizes claimed), then two bad $5 tickets won't beat a decent $10 ticket. The algorithm accounts for this — it only recommends combos that actually improve EV.
4. When You're Chasing a Specific Jackpot
If your goal is specifically to win a $1,000,000 top prize, you need to buy the game that has it. Two $5 tickets with $50,000 top prizes won't give you a shot at $1,000,000 regardless of EV. This strategy optimizes for average return, not maximum possible win.
5. Historical Pattern: New Game Launches
When a new expensive game launches with all prizes intact, it often has better ROI than older cheaper games whose top prizes are depleted. The advantage of the combo strategy tends to be strongest when:
- The expensive game is older (some top prizes claimed)
- A cheaper tier has a recently-launched game (all prizes intact)
- There's a standout performer at a lower price point
How Often Does the Rule Apply?
Across all states we track, approximately 68% of games priced above the minimum tier currently have a better alternative combo available (420 out of 616 games checked).
Practical Strategy Guide
Here's how to use this information when you're at the store:
Step 1: Check Your State's Hub Page
Before buying, visit your state's page on ScratchersParadise. Look at the "Best Value" tab to see which games have the highest ROI at each price point.
Illinois Arizona Arkansas California Colorado Connecticut Delaware Florida Georgia Idaho Indiana Iowa Kansas Kentucky Louisiana Maine Maryland Massachusetts Michigan Minnesota Mississippi Missouri Montana Nebraska New Hampshire New Jersey New Mexico New York North Carolina Ohio Oklahoma Oregon Pennsylvania Rhode Island South Carolina South Dakota Tennessee Texas Vermont Virginia Washington Washington D.C. West Virginia Wisconsin
Step 2: Look for the 💡 Better combo available Badge
On game cards in the hub page, games with a superior alternative show this badge. Click through to the game detail page to see the specific combo recommendation.
Step 3: Compare at the Same Budget
If you planned to spend $20, compare:
- The best single $20 game (highest ROI at that tier)
- The recommended combo (e.g., 2× the best $10 game, or 4× the best $5 game)
- Pick whichever has higher total EV — we've already calculated this for you
Step 4: Consider Your Goals
| Your Goal | Best Strategy |
|---|---|
| Maximize average return per dollar | Follow the combo recommendation (highest total EV) |
| Chase a specific large jackpot | Buy the game with that jackpot (if top prizes remain) |
| Maximize entertainment (most scratching) | Buy more cheaper tickets (more games to play) |
| Minimize risk of total loss | Split across multiple games (diversification) |
Quick Decision Framework
Rule of thumb: If the game you're considering shows the 💡 Better combo available badge on our site, buy the combo instead. If it doesn't show the badge, the single ticket is already your best option at that spend level.
Frequently Asked Questions
Does this guarantee I'll win more money?
No. This is about expected value — the statistical average over many tickets. On any single purchase, you might win big on the "worse" game or lose on the "better" combo. The math favors the combo over hundreds of purchases, not necessarily on any single one. Scratch-offs are still gambling.
Why don't lotteries just make expensive tickets better value?
Lotteries design each game independently with a target payout percentage (typically 60-75% of ticket sales returned as prizes). But the current value changes as prizes are claimed. A $10 game designed with 65% payout might drop to 45% effective payout after top prizes are claimed, while a newer $5 game still has its full 70% payout intact. The discrepancy isn't by design — it's a natural consequence of prize depletion over time.
How often do the recommendations change?
Daily. Our system re-runs the alternative strategy analysis every time we scrape new prize data (once per day per state). A combo that's optimal today might not be tomorrow if a key prize is claimed from one of the recommended games. That's why we recommend checking before each purchase.
What about the "unspent remainder" — money left over from the combo?
Sometimes the optimal combo doesn't perfectly match the expensive ticket's price. For example, the best combo for a $10 game might be 1× $5 game + 1× $3 game = $8, leaving $2 unspent. We track this as "unspent remainder." In these cases, you're getting better EV AND spending less money — a double win. You could pocket the difference or buy an additional $2 ticket.
Does buying multiple tickets improve my odds of winning the top prize?
Not for the same game's top prize — you'd need to buy tickets from that specific game. But buying multiple cheaper tickets gives you independent chances at each game's top prize. If two $5 games each have a $100,000 top prize with 1 in 500,000 odds, buying one of each gives you two independent shots at $100,000 — versus one shot at whatever the $10 game's top prize is.
Which price tiers benefit most from this strategy?
In our data, the $10, $20, and $30 tiers most frequently have better alternatives available. The $50 tier sometimes does too, but there are fewer games at that price point. The $5 tier rarely has alternatives (since $1-$3 games typically have lower EV per dollar). The sweet spot is usually the $10-$20 range where there are many games to compare and cheaper tiers have strong performers.
Is this strategy legal?
Absolutely. You're simply choosing which publicly available scratch-off tickets to buy based on publicly available prize data. Every state lottery publishes remaining prize information — we just do the math for you. There's nothing illegal or against lottery rules about making informed purchasing decisions.
Related Guides
- The Math of Scratchers: Odds vs. EV vs. ROI Explained — Understand the formulas behind our calculations
- Our Full Methodology — Technical details on data collection, EV computation, and daily tracking
Disclaimer: This information is provided for educational purposes only. All data is sourced from official state lottery websites and is updated regularly, but we cannot guarantee 100% accuracy. Lottery games are games of chance, and past performance does not guarantee future results. Please play responsibly and never spend more than you can afford to lose. If you or someone you know has a gambling problem, call 1-800-GAMBLER.