Play 3 — Connecticut Lottery
Sum analysis for Connecticut Play 3 examines the distribution of digit sums (the total of all three drawn digits). Sums range from 0 (0-0-0) to 27 (9-9-9), with middle values being far more common due to combinatorial probability.
The sum distribution table shows each possible sum value with its count and percentage. The peak range (typically 12-15) has the most combinations. Sum statistics include the average, median, most common, and least common sums.
Sum distribution follows a bell curve by mathematical necessity — there are more three-digit combinations that sum to 13-14 than to 0 or 27. This is probability, not a pattern to exploit.
| Sum | Count | % | Distribution |
|---|---|---|---|
| 0 | 19 | 0.10% | 0.10% |
| 1 | 59 | 0.32% | 0.32% |
| 2 | 124 | 0.67% | 0.67% |
| 3 | 183 | 0.99% | 0.99% |
| 4 | 272 | 1.48% | 1.48% |
| 5 | 397 | 2.16% | 2.16% |
| 6 | 572 | 3.11% | 3.11% |
| 7 | 670 | 3.64% | 3.64% |
| 8 | 828 | 4.50% | 4.50% |
| 9 | 1024 | 5.56% | 5.56% |
| 10 | 1143 | 6.21% | 6.21% |
| 11 | 1308 | 7.10% | 7.10% |
| 12 | 1346 | 7.31% | 7.31% |
| 13 | 1447 | 7.86% | 7.86% |
| 14 | 1354 | 7.35% | 7.35% |
| 15 | 1317 | 7.15% | 7.15% |
| 16 | 1232 | 6.69% | 6.69% |
| 17 | 1121 | 6.09% | 6.09% |
| 18 | 983 | 5.34% | 5.34% |
| 19 | 876 | 4.76% | 4.76% |
| 20 | 634 | 3.44% | 3.44% |
| 21 | 501 | 2.72% | 2.72% |
| 22 | 361 | 1.96% | 1.96% |
| 23 | 275 | 1.49% | 1.49% |
| 24 | 190 | 1.03% | 1.03% |
| 25 | 99 | 0.54% | 0.54% |
| 26 | 56 | 0.30% | 0.30% |
| 27 | 21 | 0.11% | 0.11% |