id:A156954 - OEIS Search Results

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Integers N such that by inserting + or - or * or / or ^ between each of their digits, without any grouping parentheses, you can get N (the ambiguous a^b^c is avoided)

+0
2

736, 2592, 11664, 15617, 15618, 15622, 15624, 15632, 15642, 15645, 15656, 15662, 15667, 15698, 17536, 27639, 32785, 39363, 39369, 45947, 46633, 46644, 46648, 46655, 46660, 46663, 117635, 117638, 117639, 117642, 117643, 117647, 117650 (list; graph; listen)

	OFFSET	`1,1`
	COMMENT	`736 = 7+3^6` `2592 = 2^59^2` `11664 = 116^6/4` `15617 = 15^6-1-7` `15618 = 15^6+1-8` `15622 = 1+5^6-22` `15624 = 1+5^6+2-4` `15632 = 1+5^6+32` `15642 = 1+5^6+4^2` `15645 = 15^6+45` `15656 = 1+56+5^6` `15662 = 1+5^6+6^2` `15667 = 15^6+67` `15698 = 1+5^6+98` `17536 = 17^5+3^6` `27639 = 2^76^3-9` `32785 = 3+27+8^5` `39363 = 3^9/36-3` `39369 = 3+9^369` `45947 = 45+9^47` `46633 = 4+6^6-3^3` `46644 = 4+6^6-44` `46648 = 46^6/4-8` `46655 = 4+66^5-5` `46660 = 4+6^66^0` `46663 = 4+6+6^6-3` `117635 = 11+7^6-35` `117638 = 117^6-3-8` `117639 = 1+1+7^6-3-9` `117642 = 11+7^6-42` `117643 = 11+7^6-4-3` `117647 = 11+7^6+4-7` `117650 = 117^6+5^0` `117652 = 117^6+5-2` `117653 = 1+1+7^6+5-3` `117662 = 11+7^6+62` `117695 = 11+7^6+95` `156250 = 15^625+0` `156251 = 15^625+1` `156252 = 15^625+2` `156253 = 15^625+3` `156254 = 15^625+4` `156255 = 15^625+5` `156256 = 15^625+6` `156257 = 15^625+7` `156258 = 15^625+8` `156259 = 15^625+9` `186622 = 186^6/2-2` `186624 = 186^62/4` `262149 = 26/2-1+4^9` `279867 = 2-79-8+6^7` `295245 = 29^52/45` `390658 = 39+0+6+5^8` `437564 = 4^3+75^64` `589864 = 58+98^6/4` `824577 = 8+2+4^5+7^7`
	CROSSREFS	`Adjacent sequences: A156951 A156952 A156953 this_sequence A156955 A156956 A156957` `Sequence in context: A121342 A067866 A157198 this_sequence A004078 A043633 A077723`
	KEYWORD	`base,nonn`
	AUTHOR	`Jean-Marc Falcoz (jeanmarcfalcoz(AT)vtxnet.ch), Feb 19 2009`

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Last modified November 9 12:23 EST 2009. Contains 166233 sequences.

AT&T Labs Research