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A070741
z such that the Diophantine equation x^3+y^4=z^3 has solutions.
0
14, 57, 78, 148, 224, 252, 305, 490, 546, 585, 620, 639, 889, 897, 912, 1134, 1248, 1290, 1352, 1526, 1953, 2212, 2345, 2368, 2394, 2470, 2678, 2710, 3096, 3474, 3584, 3641, 3880, 4032, 4088, 4617, 4764, 4880, 5219, 5436, 5985, 6097, 6318, 6489, 6552, 6570
OFFSET
1,1
EXAMPLE
5219 is a member because 307^3 + 614^4 = 5219^3. - Sean A. Irvine, Jun 11 2024
PROG
(PARI) for(n=0, 350, if(sum(i=1, n, sum(j=1, i, if(i^3+j^4-n^3, 0, 1)))>0, print1(n, ", ")))
CROSSREFS
Sequence in context: A067326 A202242 A041374 * A022286 A005915 A211069
KEYWORD
easy,nonn
AUTHOR
Benoit Cloitre, May 14 2002
EXTENSIONS
More terms from Lambert Klasen (Lambert.Klasen(AT)gmx.net), Dec 15 2004
Missing 5219 inserted by Sean A. Irvine, Jun 11 2024
STATUS
approved