Polyominous Killer
(Eingestellt am 10. August 2020, 13:28 Uhr von Gravatus)
Divide the grid into regions consisting of the 5 tetronimoes (i, l, o, s, t) which have totals of 15 - 19 respectively, and 12 pentominoes (F, I, L, N, P, T, U, V, W, X, Y, Z) which have totals of 21 - 32 respectively. Each polyomino consists of distinct values (i.e. normal Killer sudoku rules). Cells with letters indicate which polyomino they are part of, thick lines are boundaries between polyominoes, and the cell marked yellow is the only one not included in any polyomino.
Thanks to glum_hippo for the penpa link!
Lösungscode: Row 4, Column 6
Kommentare
am 28. August 2020, 20:46 Uhr von Gravatus
Rule clarification
am 12. August 2020, 15:13 Uhr von Gravatus
@RockyRoer glad you liked it! Perhaps I can work on the logic a bit more on my next one, so that it makes for a smoother solution path
am 12. August 2020, 15:03 Uhr von RockyRoer
I incorrectly thought "Once I get the polynomios placed, it will be a breeze." Nope -- part 2 of this puzzle was trickier than part 1! Nice puzzle again! Thanks for the help!
am 10. August 2020, 19:51 Uhr von glum_hippo
penpa-Link: https://git.io/JJDBu
am 10. August 2020, 19:28 Uhr von Gravatus
@henrypijames, yes i = 15, l = 16 etc.
am 10. August 2020, 19:10 Uhr von henrypijames
By "respectively", do you mean i=15, l=16, ... - or {i, l, o, s, t} = {15...19} as (mathematical) set?
