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2. Waring's problem - Wikipedia

   en.wikipedia.org/wiki/Waring's_problem

   In number theory, Waring's problem asks whether each natural number k has an associated positive integer s such that every natural number is the sum of at most s natural numbers raised to the power k. For example, every natural number is the sum of at most 4 squares, 9 cubes, or 19 fourth powers. Waring's problem was proposed in 1770 by Edward ...

3. Square number - Wikipedia

   en.wikipedia.org/wiki/Square_number

   A non-negative integer is a square number when its square root is again an integer. For example, =, so 9 is a square number. A positive integer that has no square divisors except 1 is called square-free. For a non-negative integer n, the n th square number is n 2, with 0 2 = 0 being the zeroth one. The concept of square can be extended to some ...

4. Goldbach's conjecture - Wikipedia

   en.wikipedia.org/wiki/Goldbach's_conjecture

   The Pillai sequence tracks the numbers requiring the largest number of primes in their greedy representations. [31] Similar problems to Goldbach's conjecture exist in which primes are replaced by other particular sets of numbers, such as the squares: It was proven by Lagrange that every positive integer is the sum of four squares.

5. Difference of two squares - Wikipedia

   en.wikipedia.org/wiki/Difference_of_two_squares

   If two numbers (whose average is a number which is easily squared) are multiplied, the difference of two squares can be used to give you the product of the original two numbers. For example: 27 × 33 = ( 30 − 3 ) ( 30 + 3 ) {\displaystyle 27\times 33=(30-3)(30+3)}

6. Legendre's three-square theorem - Wikipedia

   en.wikipedia.org/wiki/Legendre's_three-square...

   Pierre de Fermat gave a criterion for numbers of the form 8a + 1 and 8a + 3 to be sums of a square plus twice another square, but did not provide a proof. [1] N. Beguelin noticed in 1774 [2] that every positive integer which is neither of the form 8n + 7, nor of the form 4n, is the sum of three squares, but did not provide a satisfactory proof. [3]

7. Jacobi's four-square theorem - Wikipedia

   en.wikipedia.org/wiki/Jacobi's_four-square_theorem

   In number theory, Jacobi's four-square theorem gives a formula for the number of ways that a given positive integer n can be represented as the sum of four squares (of integers). History [ edit ]

8. Sum of two squares theorem - Wikipedia

   en.wikipedia.org/wiki/Sum_of_two_squares_theorem

   Therefore, the theorem states that it is expressible as the sum of two squares. Indeed, 2450 = 7 2 + 49 2. The prime decomposition of the number 3430 is 2 · 5 · 7 3. This time, the exponent of 7 in the decomposition is 3, an odd number. So 3430 cannot be written as the sum of two squares.

9. Hilbert's seventeenth problem - Wikipedia

   en.wikipedia.org/wiki/Hilbert's_seventeenth_problem

   A result of Albrecht Pfister [8] shows that a positive semidefinite form in n variables can be expressed as a sum of 2 n squares. [9] Dubois showed in 1967 that the answer is negative in general for ordered fields. [10] In this case one can say that a positive polynomial is a sum of weighted squares of rational functions with positive ...