A025431 -id:A025431 - cp's OEIS frontend

A295801 Numbers that have exactly four representations as a sum of seven positive squares.

37, 40, 42, 46, 48, 49, 50, 52, 53, 62, 65

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295694.

A295802 Numbers that have exactly five representations as a sum of seven positive squares.

Original entry on oeis.org

45, 54, 57, 60

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295695.

A295803 Numbers that have exactly six representations as a sum of seven positive squares.

Original entry on oeis.org

67, 71, 83

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295696.

A295804 Numbers that have exactly seven representations as a sum of seven positive squares.

Original entry on oeis.org

55, 58, 63, 64, 74, 75, 80, 89

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295697.

A295805 Numbers that have exactly eight representations as a sum of seven positive squares.

Original entry on oeis.org

61, 66, 72, 73, 76, 77, 84, 86, 92

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295698.

A295806 Numbers that have exactly nine representations as a sum of seven positive squares.

Original entry on oeis.org

69, 78, 81

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295699.

A295807 Numbers that have exactly ten representations as a sum of seven positive squares.

Original entry on oeis.org

70, 91, 107

Offset: 1

Robert Price, Nov 27 2017

It appears that this sequence is finite and complete. See the von Eitzen link for a proof for the 5 positive squares case.

E. Grosswald, Representations of Integers as Sums of Squares. Springer-Verlag, New York, 1985, p. 86, Theorem 1.

H. von Eitzen, in reply to user James47, What is the largest integer with only one representation as a sum of five nonzero squares? on stackexchange.com, May 2014
D. H. Lehmer, On the Partition of Numbers into Squares, The American Mathematical Monthly, Vol. 55, No. 8, October 1948, pp. 476-481.

Cf. A025431, A287166, A295700.

cp's OEIS Frontend

A295801 Numbers that have exactly four representations as a sum of seven positive squares.

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A295802 Numbers that have exactly five representations as a sum of seven positive squares.

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A295803 Numbers that have exactly six representations as a sum of seven positive squares.

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A295804 Numbers that have exactly seven representations as a sum of seven positive squares.

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A295805 Numbers that have exactly eight representations as a sum of seven positive squares.

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A295806 Numbers that have exactly nine representations as a sum of seven positive squares.

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A295807 Numbers that have exactly ten representations as a sum of seven positive squares.

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