Number Theory Miracle
(Published on 4. November 2024, 07:43 by ivanip)
This is part of an Exam question for the course "MATH4141: Number Theory and Applications" at HKUST. Some knowledge of elementary number theory is required to solve this puzzle.
Click on the puzzle image to play.
Fill in the 4 × 4 grid with four distinct digits from {0, 1, 2, 3, 4, 5, 6, 7, 8} such that
Click on the puzzle image to play.
Fill in the 4 × 4 grid with four distinct digits from {0, 1, 2, 3, 4, 5, 6, 7, 8} such that
- Each row, column, and L-shaped region does not contain repeated digits.
- The digits are all quadratic residues (mod 17).
- The 4-digit integer formed by the first row is a perfect square.
- Each clue outside the grid shows the number of ways the 4-digit integer in that column/row can be expressed as a sum of two squares of nonnegative integers (up to permutation).
Solution code: Enter the digits of the 3rd row followed by the 4th row.
Last changed on on 4. November 2024, 10:20
Solved by Dr Logic, marcmees, CHalb, SKORP17, Clueless, toboed
Comments
on 4. November 2024, 08:58 by Dr Logic
Wonderful puzzle! Felt more like a 2 star for me, as the most difficult thing is trying to remember first year number theory.
Thanks for setting!
