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Penny Parity (Posted on 2013-07-18) Difficulty: 3 of 5
Consider n pennies arranged in a straight line.

A move consists of taking a penny and turning it over (from head to tail or visa versa) and of doing the same to each of its neighbors.

If the penny happens to be at the end of the line, then it will have only one neighbor. For example, if the sequence is HHTH and you choose the 3rd penny, then your move would result in HTHT.

The question is, given any sequence of n pennies, is it possible to find a sequence of moves to bring it to all Heads? Show that the answer is no for n=5 but yes for n=6.

No Solution Yet Submitted by Danish Ahmed Khan    
Rating: 3.0000 (1 votes)

Comments: ( You must be logged in to post comments.)
  Subject Author Date
re: An algorithmSteve Herman2017-07-25 13:00:54
Hints/TipsAn algorithmBrian Smith2017-07-24 20:46:19
Solutionyes for n = 6 (spoiler)Steve Herman2013-07-18 18:04:07
Some Thoughtsno for n = 5 (spoiler)Steve Herman2013-07-18 17:07:13
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