Thinking Outside the Box Again
(Published on 30. May 2024, 01:36 by Jrosas)
This is my second puzzle using the “outside the box” rule. Cracking the Cryptic featured my first “outside the box” puzzle here:
https://youtu.be/2ideCV0Ot_Q?si=j_tcyZlEnPq-60yY
watching that video might help explain the rule.
I have used different constraints and added a twist to this one.
The rules:
Normal sudoku rules apply.
Normal renban rules apply. Digits on a purple line are a set of consecutive digits in any order without repeats.
Normal diagonal constraint rules apply. Digits on the marked diagonals do not repeat.
Normal circle sum rules apply. A digit in a circle is equal to the number of circles that contain the digit.
"Think outside the box" rule applies: a digit in the center cell of a bold outlined 3x3 box is equal to the total of all circled digits in cells outside the box and adjacent to the box, including diagonally adjacent cells.
The 9 "thinking" cells in the centers of the bold outlined 3x3 boxes contain the digits 1 to 9 once each.
Solution code: Please insert the digits from row 8, left to right
Comments
on 13. July 2024, 18:19 by Jrosas
My solution video:
https://youtu.be/Z3U2cmNe5rs?si=-YK6tkHmlo98As5J
on 3. June 2024, 21:30 by Jrosas
I made it more difficult and added back the 4th star
on 30. May 2024, 20:06 by Jrosas
Removed a star
on 30. May 2024, 13:33 by marcmees
Nice. Thanks (imo 4* is a bit overrated.)
Thank you. I appreciate the feedback
