id:A113153 - OEIS Search Results

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Sum of the first n tribonacci numbers, in ascending order, as bases, with the same, in descending order, as exponents.

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19

1, 2, 4, 8, 17, 54, 472, 27216, 84738887, 299164114847940, 311903053042108587337426568, 5846720173185251353387753850814872871131756204168 (list; graph; listen)

	OFFSET	`1,2`
	FORMULA	`a(n) = SUM[from i = 1 to n] (A000073(i))^A000073(n-i+1)`
	EXAMPLE	`For the tribonacci sequence, starting t(1)=t(2)=1:` `a(1) = t(1)^t(1) = 1^1 = 1.` `a(2) = t(1)^t(2) + t(2)^t(1) = 1^1 + 1^1 = 2.` `a(3) = t(1)^t(3) + t(2)^t(2) + t(3)^t(1) = 1^2 + 1^1 + 2^1 = 4.` `a(4) = t(1)^t(4) + t(2)^t(3) + t(3)^t(2) + t(4)^t(1) = 1^4 + 1^2 + 2^1 + 4^1 = 8.` `a(5) = 1^7 + 1^4 + 2^2 + 4^1 + 7^1 = 17.` `a(6) = 1^13 + 1^7 + 2^4 + 4^2 + 7^1 + 13^1 = 54.` `a(7) = 1^24 + 1^13 + 2^7 + 4^4 + 7^2 + 13^1 + 24^1 = 472.` `a(8) = 1^44 + 1^24 + 2^13 + 4^7 + 7^4 + 13^2 + 24^1 + 44^1 = 27216.` `a(9) = 1^81 + 1^44 + 2^24 + 4^13 + 7^7 + 13^4 + 24^2 + 44^1 + 81^1 = 84738887.` `a(10) = 1^149 + 1^81 + 2^44 + 4^24 + 7^13 + 13^7 + 24^4 + 44^2 + 81^1 + 149^1 = 299164114847940.` `a(11) = 1^274 + 1^149 + 2^81 + 4^44 + 7^24 + 13^13 + 24^7 + 44^4 + 81^2 + 149^1 + 274^1 = 311903053042108587337426568.` `a(12) = 1^504 + 1^274 + 2^149 + 4^81 + 7^44 + 13^24 + 24^13 + 44^7 + 81^4 + 149^2 + 274^1 + 504^1 = 5846720173185251353387753850814872871131756204168.`
	CROSSREFS	`Cf. A000073.` `Sequence in context: A090375 A104879 A156805 this_sequence A092507 A024415 A018096` `Adjacent sequences: A113150 A113151 A113152 this_sequence A113154 A113155 A113156`
	KEYWORD	`easy,nonn`
	AUTHOR	`Jonathan Vos Post (jvospost3(AT)gmail.com), Jan 04 2006`

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Last modified December 10 12:37 EST 2009. Contains 170569 sequences.

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