Pierre de Fermat gave a criterion for numbers of the form 8
a + 1 and 8
a + 3 to be sums of a square plus twice another square, but did not provide a proof. N. Beguelin noticed in 1774 that every positive
integer which is neither of the form 8
n + 7, nor of the form 4
n, is the sum of three squares, but did not provide a satisfactory proof. In 1796
Gauss proved his
Eureka theorem that every positive integer
n is the sum of 3
triangular numbers; this is equivalent to the fact that 8
n + 3 is a sum of three squares. In 1797 or 1798
A.-M. Legendre obtained the first proof of his 3 square theorem. In 1813,
A. L. Cauchy noted that Legendre's theorem is equivalent to the statement in the introduction above. Previously, in 1801, Gauss had obtained a more general result, containing Legendre's theorem of 1797–8 as a corollary. In particular, Gauss counted the number of solutions of the expression of an integer as a sum of three squares, and this is a generalisation of yet another result of Legendre, whose proof is incomplete. This last fact appears to be the reason for later incorrect claims according to which Legendre's proof of the three-square theorem was defective and had to be completed by Gauss. With
Lagrange's four-square theorem and the
two-square theorem of Girard, Fermat and Euler, the
Waring's problem for
k = 2 is entirely solved. == Proofs ==