As usual from me a Venn-based challenge. The three overlapping ellipses form seven curved regions. There are seven tiles. Place one tile in each region so that the tiles in any one ellipse can be re-arranged to solve the corresponding clue.
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1$\begingroup$ I get the same as Jafe. Am I the only one who tore little pieces of paper as the tiles? $\endgroup$– Pierre PaquetteMay 25 at 5:14
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1$\begingroup$ I suppose the answer is yes, but can those be made so that the “nonshared” tiles make one word when joined together? Do you have such an example? $\endgroup$– Pierre PaquetteMay 25 at 5:21
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$\begingroup$ @PierrePaquette Is that a puzzle in itself? "The only one"? $\endgroup$– m4n0May 25 at 13:51
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$\begingroup$ @m4n0: No, it was just a question. $\endgroup$– Pierre PaquetteMay 26 at 22:02
1 Answer
This looks like
Viewers: AUDIENCE
One man one horse? CENTAURS (as in two half-horse half-men, making one whole man and one whole horse in total?)
Verdict: SENTENCE
Filled-in diagram