The Naked Triple is the big brother of the Naked Pair. It applies the exact same logic, just with three numbers instead of two.
A Naked Triple occurs when you find three cells in the same group (row, column, or box) that collectively contain only three specific candidates.
Interactive Example
Click "Apply Logic" to see the strategy in action.
Real Example Explanation
In the interactive example above, look at Column 3:
- Spot the Triple: The top three cells (R1C3, R2C3, R3C3) are highlighted in Green.
- Check Candidates:
- R1C3:
1, 2 - R2C3:
1, 2, 7 - R3C3:
2, 7
- R1C3:
- The Observation: Between these three cells, there are only three unique numbers: 1, 2, and 7.
- The Logic: Since we have three cells and exactly three non-repeating numbers to put in them, those specific numbers must live in those specific cells.
- The Elimination: The number 1 (or 2 or 7) cannot exist anywhere else in Column 3. We can eliminate the
1from the cell below (R4C3), highlighted in Red.
How the Logic Works
Think of it as "Three Chairs for Three People". * You have three reserved seats. * You have three guests (Guest 1, Guest 2, Guest 7). * Reviewing the seating chart (the candidates), you see that: * Seat A is for Guest 1 or 2. * Seat B is for Guest 1, 2, or 7. * Seat C is for Guest 2 or 7. * Critically, nobody else is on the list for these seats.
Because these three chairs are exclusively reserved for those three guests, none of those guests can sit anywhere else in the room (the column).
Important Note: Not every cell needs to have all three numbers! As seen in the example, one cell might just have {1, 2} and another {2, 7}. As long as the union of all their candidates is exactly 3 numbers, it's a Naked Triple.
Related Strategies
- Naked Pair: The simpler 2-cell version.
- Naked Quad: The complex 4-cell logic.
- Hidden Single: The foundation of all solving.