Seems I missed the fact that puzzle number 2 has three solutions, so I added an additional condition to this one.
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Bump for finally solved. so much trouble for a cheap game xD
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well i give up on the second one, i tried things for more than an hour and i noticed i was using 379 instead of 319, too lazy to restart D:
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Found a solution for second puzzle but failed to reach the prize. @@
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Take me some time to differ the second solution's colors.
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There are just too many, even if we get rid of sums with same digits:
299=13+102+184
299=146+70+83
299=70+139+90
307=13+70+224
307=98+70+139
307=102+104+101
320=13+83+224
320=98+83+139
320=146+70+104
327=13+90+224
327=98+146+83
327=98+139+90
337=13+223+101
337=146+90+101
337=70+83+184
375=13+139+223
375=146+139+90
375=90+101+184
376=13+139+224
376=70+83+223
376=102+90+184
415=13+83+319
415=102+90+223
415=90+224+101
460=13+223+224
460=98+139+223
460=146+90+224
471=13+139+319
471=146+102+223
471=146+224+101
509=146+139+224
509=102+223+184
509=224+101+184
548=146+83+319
548=139+90+319
548=223+224+101
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I think I got what you meant: not sum not having two of the same digit, but sum comprised of all different numbers
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Here are two puzzles for you.
Puzzle has ended. Solution is posted here.
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