Squares:360000s

360011

360011 = 3² + 600² + 1² + 1².

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

360034

360034 = 3² + 600² + 3² + 4².

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

360074

360074 = 3² + 600² + 7² + 4².

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

360091

360091 = 3² + 600² + 9² + 1².

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

361152

A cubic polynomials:
(X + 44²)(X + 57²)(X + 144²) = X³ + 161² + 10668²X² + 361152².

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

361760

361760² = 899 * 900 + 901 * 902 + 903 * 904 + 905 * 906 + ... + 9227 * 9228.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

362020

362020² = 4227 * 4228 + 4229 * 4230 + 4231 * 4232 + 4233 * 4234 + ... + 9515 * 9516.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

362124

362124² = 131133791376, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

362154

362154² = 131155519716, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

362401

362401² = 168⁴ + 175⁴ + 600⁴, the 8th primitive sum of three 4-th powers.

Page of Squares : First Upload August 4, 2013 ; Last Revised August 4, 2013
by Yoshio Mimura, Kobe, Japan

362424

362424² = 131351155776, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

362646

362646² = 131512121316, a square pegged by 1.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

362756

362756² = 131591915536, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

363222

363222² is the sum of (16x + 13)² for x = 0,1,2,...,1155.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

363545

363545² = (1² + ... + 6²) * (7² + ... + 84²) * (85²).

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

363639

363639² = 132233322321, a square with 3 kinds of digits. Its digits are non-decreasing.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

364585

364585² = 132922222225, a square contains repeating digits.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

364728

364728² = 2158*2159*2160 + 2160*2161*2162 + 2162*2163*2164 + 2164*2165*2166 + ... + 2182*2183*2184.

Page of Squares : First Upload October 26, 2013 ; Last Revised October 26, 2013
by Yoshio Mimura, Kobe, Japan

364813

364813² = 133088524969, and 13308852496 = 115364², 9 = 3².

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

364980

364980² = 298³ + 299³ + 300³ + 301³ + ... + 857³.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

365124

365124² = 133315535376, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

365786

365786² = 133799397796, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

365966

365966² = 133931113156, a square with odd digits except the last digit 6.

Page of Squares : First Upload September 21, 2013 ; Last Revised September 21, 2013
by Yoshio Mimura, Kobe, Japan

366357

366357² is the sum of (26x + 23)² for x = 0,1,2,...,840.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

366667

366667² = 134444688889, a square whose digits are non-decreasing.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

366791

366791 is the 5th prime for which Legendre Symbol (a/366791) = 1 for a = 1,2,3,... 30.

366791 is the 1st prime for which Legendre Symbol (a/366791) = 1 for a = 1,2,3,... 36.

366791 is the 1st prime for which Legendre Symbol (a/366791) = 1 for a = 1,2,3,... 40.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

367392

367392² = 1686 * 1687 + 1688 * 1689 + 1690 * 1691 + 1692 * 1693 + ... + 9338 * 9339.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan

369385

The quadratic polynomial 369385X² - 1934000X + 2724544 takes the values 1077², 578², 497², 948², 1513², 2102² at X = 1, 2,..., 6.

Page of Squares : First Upload May 4, 2013 ; Last Revised May 4, 2013
by Yoshio Mimura, Kobe, Japan