Remember
“Unique and restricted” ? ,b (pid=13696)
There I have asked for a restricted answer to an alphametic puzzle and got a set of many words.
Now I have fiddled with a similar equation and again will allow only answers not using any of the letters appearing in “TWELVE”.
TWELVE + TWELVE = (Oompha, grubby, payoff, droppy ….et al)
Your task is to find an answer to my puzzle such that adding the numerical values of all 6 letters in the word chosen by you (a long list of candidate solutions) will be closest to 24.
Start your chase.
Good luck!
The patterns (combined TWELVE and "other word") may occur for more than one valid addition (ones where no digit in the sum matches any in TWELVE). The numbers for each set are:
abcdec ffggfhg 3
abcdec ffgghg 6
abcdec ffgghig 1
abcdec ffghfhh 4
abcdec ffghfih 2
abcdec ffghgi 1
abcdec ffghhfh 2
abcdec ffghhg 3
abcdec ffghifh 1
abcdec ffghig 5
abcdec ffghihh 1
abcdec ffghij 1
abcdec fgfhgf 8
abcdec fgfhgi 1
abcdec fgfhgih 2
abcdec fgfhhf 8
abcdec fgfhhfh 2
abcdec fgfhhih 2
abcdec fgfhif 6
abcdec fgfhifh 3
abcdec fgfhij 2
abcdec fgfhijh 4
abcdec fggfhi 1
abcdec fgghfhh 2
abcdec fgghfih 1
abcdec fgghig 4
abcdec fgghij 2
abcdec fghfhi 1
abcdec fghfig 1
abcdec fghfii 1
abcdec fghgfh 3
abcdec fghgfhg 2
abcdec fghgfig 1
abcdec fghgih 3
abcdec fghhfih 2
abcdec fghhgh 6
abcdec fghhih 4
abcdec fghiffi 2
abcdec fghifh 3
abcdec fghifhi 1
abcdec fghifii 3
abcdec fghifji 2
abcdec fghigfi 2
abcdec fghigh 9
abcdec fghigj 2
abcdec fghihh 4
abcdec fghihj 3
abcdec fghiifi 4
abcdec fghiigi 1
abcdec fghiih 8
abcdec fghiihi 1
abcdec fghiij 1
abcdec fghijfi 4
abcdec fghijg 2
abcdec fghijh 6
abcdec fghijhi 2
abcdec fghiji 1
abcdec fghijj 1
abcdec fghijji 2
Only the ones that have a 1 are useable for an alphametic.
Edited on April 26, 2024, 6:56 am
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Posted by Charlie
on 2024-04-25 21:48:42 |
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