Killer Sudoku reference

Killer Sudoku cage combinations

Every cage size and sum, with the digit combinations that satisfy them. A reference you can keep open while solving.

A cage of N cells with target sum S is the question 'which N distinct digits from 1 to 9 sum to S?'. The tables below answer that question for every cage size you'll meet on a 9x9 board, plus the locked-combination cheat sheet for cages with a single forced answer.

What this page covers

  • Full combination tables for two-, three-, four-, and five-cell cages.
  • Reading larger cages (six, seven, eight cells) by their complement.
  • The locked-combination cheat sheet: every cage with exactly one possible digit set.
  • How to read the tables: minimums, maximums, and forbidden digits.

What a cage is and why combinations matter

A cage is a group of adjacent cells outlined by a dashed border. The small number in the corner is the target sum. The cells inside the cage must add up to that sum, with no digit repeated inside the cage.

Cages reduce a Sudoku problem to two simultaneous questions: which digits can fill these cells, and how can they sum to the target. The digit-set question is what these tables answer. The placement question is what classical Sudoku techniques solve.

Reading larger cages by their complement

A cage of six or more cells has too many combinations to list usefully. Don't enumerate the cage; enumerate the cells around it.

If a six-cell cage sits inside a single 3x3 box, the three cells of the box outside the cage form an implicit three-cell cage with a known sum: 45 minus the original cage's sum. Read the small cage's combinations from the three-cell table and the original cage holds the complementary digits.

The same trick works for seven-cell cages (the complement is two cells, read from the two-cell table) and eight-cell cages (the complement is a single cell).

Reading the tables

Every row is a target sum. Every entry is a possible digit set, written without separators (12 means {1, 2}; 1234 means {1, 2, 3, 4}).

The smallest possible sum for an N-cell cage is 1+2+...+N. The largest is (10-N)+(11-N)+...+9. Sums outside that range cannot exist.

If the cage's house already contains certain digits, you can cross out any combination that includes those digits. What survives is the actual set of possibilities, and often only one combination remains.

Two-cell cages

SumCombinations
312
413
514, 23
615, 24
716, 25, 34
817, 26, 35
918, 27, 36, 45
1019, 28, 37, 46
1129, 38, 47, 56
1239, 48, 57
1349, 58, 67
1459, 68
1569, 78
1679
1789

Three-cell cages

SumCombinations
6123
7124
8125, 134
9126, 135, 234
10127, 136, 145, 235
11128, 137, 146, 236, 245
12129, 138, 147, 156, 237, 246, 345
13139, 148, 157, 238, 247, 256, 346
14149, 158, 167, 239, 248, 257, 347, 356
15159, 168, 249, 258, 267, 348, 357, 456
16169, 178, 259, 268, 349, 358, 367, 457
17179, 269, 278, 359, 368, 458, 467
18189, 279, 369, 378, 459, 468, 567
19289, 379, 469, 478, 568
20389, 479, 569, 578
21489, 579, 678
22589, 679
23689
24789

Four-cell cages

SumCombinations
101234
111235
121236, 1245
131237, 1246, 1345
141238, 1247, 1256, 1346, 2345
151239, 1248, 1257, 1347, 1356, 2346
161249, 1258, 1267, 1348, 1357, 1456, 2347, 2356
171259, 1268, 1349, 1358, 1367, 1457, 2348, 2357, 2456
181269, 1278, 1359, 1368, 1458, 1467, 2349, 2358, 2367, 2457, 3456
191279, 1369, 1378, 1459, 1468, 1567, 2359, 2368, 2458, 2467, 3457
201289, 1379, 1469, 1478, 1568, 2369, 2378, 2459, 2468, 2567, 3458, 3467
211389, 1479, 1569, 1578, 2379, 2469, 2478, 2568, 3459, 3468, 3567
221489, 1579, 1678, 2389, 2479, 2569, 2578, 3469, 3478, 3568, 4567
231589, 1679, 2489, 2579, 2678, 3479, 3569, 3578, 4568
241689, 2589, 2679, 3489, 3579, 3678, 4569, 4578
251789, 2689, 3589, 3679, 4579, 4678
262789, 3689, 4589, 4679, 5678
273789, 4689, 5679
284789, 5689
295789
306789

Five-cell cages

SumCombinations
1512345
1612346
1712347, 12356
1812348, 12357, 12456
1912349, 12358, 12367, 12457, 13456
2012359, 12368, 12458, 12467, 13457, 23456
2112369, 12378, 12459, 12468, 12567, 13458, 13467, 23457
2212379, 12469, 12478, 12568, 13459, 13468, 13567, 23458, 23467
2312389, 12479, 12569, 12578, 13469, 13478, 13568, 14567, 23459, 23468, 23567
2412489, 12579, 12678, 13479, 13569, 13578, 14568, 23469, 23478, 23568, 24567
2512589, 12679, 13489, 13579, 13678, 14569, 14578, 23479, 23569, 23578, 24568, 34567
2612689, 13589, 13679, 14579, 14678, 23489, 23579, 23678, 24569, 24578, 34568
2712789, 13689, 14589, 14679, 15678, 23589, 23679, 24579, 24678, 34569, 34578
2813789, 14689, 15679, 23689, 24589, 24679, 25678, 34579, 34678
2914789, 15689, 23789, 24689, 25679, 34589, 34679, 35678
3015789, 24789, 25689, 34689, 35679, 45678
3116789, 25789, 34789, 35689, 45679
3226789, 35789, 45689
3336789, 45789
3446789
3556789

Locked combinations cheat sheet

Cages with exactly one digit combination. The cage size plus the sum forces a unique digit set. These cages do half your work for you.

Cage sizeSumForced combination
2312
2413
21679
21789
36123
37124
323689
324789
4101234
4111235
4295789
4306789
51512345
51612346
53446789
53556789

FAQ

Do I need to memorize these tables?

No. Recognize the locked combinations on sight (those are the cages that solve themselves) and use the larger tables as a reference while solving. Most regular players end up memorizing the two-cell table by accident.

Why do six-, seven-, and eight-cell cages skip the table?

They have too many combinations to list usefully, and you don't need them. Read the cage's complement instead: in a 3x3 box, a six-cell cage of sum S has a three-cell complement of sum 45-S, which is in the three-cell table.

What's a locked combination?

A cage where the size and sum together force exactly one digit set. The classic examples are 2-cell sum 3 (must be {1,2}) and 4-cell sum 30 (must be {6,7,8,9}). The cheat sheet above lists all of them.