![]() I assure you that you can easily solve this diagonal sudoku puzzle in no time. Try using the combined rules of the standard sudoku and the diagonal rule as explained above to finish this puzzle. Which only leaves us number 5 to be placed in R4C6. Some cells already contain numbers, known as 'givens'. The puzzle is most frequently a 9 x 9 grid made up of 3 x 3 subgrids (called 'regions'). It is also not applicable in R6C4 because 5 is already given in row 6 and also not in R5C5 because 5 is already given in row 5. Advertising Cross+A Sudoku Sudoku (also known as 'Number Place') is a placement puzzle. Number 5 cannot be in R7C2 because 5 is already present in that region. Focusing on the diagonal line slanted up to the right (/), we know that numbers 1-9 will appear exactly once in that diagonal line. Cure your boredom with these great logic puzzles and sharpen your logic skills Simply choose your difficulty level from our selection easy, medium, hard, and very hard and put your brain to the test. So, weare only left with 8 to be placed in R7C2.Īnother clue using the diagonal rule, look at the numbers and lines highlighted in pink. Whether you’re a new sudoku player or a skilled veteran, we have over 100 printable sudoku puzzles from easy to hard for you to enjoy. It is also not applicable in R8C3 because 8 is already given in row 3. ![]() Why? Because if you look at that diagonal line, there is already number 8, therefore 8 cannot be placed in R8C2. In region 6, number 8 is only possible in R7C2. Now focus on numbers and lines highlighted in blue. Therefore, by using the fourth rule that says the numbers 1-9 will appear exactly once in the diagonal line, 3 is the missing number in Row 1 Column 9 (R1C9) cell. Looking at the diagonal, you can see that 2 and 9 are already given. In region 3 of the puzzle, the only missing numbers are 2, 3, and 9. When cross-hatching, the player needs to remain aware of. Look at those that are highlighted in green. This method involves cross-referencing columns and rows to find unique numbers specific to that grid.
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