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2. Difference of two squares - Wikipedia

   en.wikipedia.org/wiki/Difference_of_two_squares

   The formula for the difference of two squares can be used for factoring polynomials that contain the square of a first quantity minus the square of a second quantity. For example, the polynomial can be factored as follows: = (+) = (+) (+) As a second example, the first two terms of + can be factored as (+) (), so we have:

3. Congruum - Wikipedia

   en.wikipedia.org/wiki/Congruum

   Additionally, multiplying a congruum by a square number produces another congruum, whose progression of squares is multiplied by the same factor. All solutions arise in one of these two ways. [ 1 ] For instance, the congruum 96 can be constructed by these formulas with m = 3 {\displaystyle m=3} and n = 1 {\displaystyle n=1} , while the congruum ...

4. Squaring the square - Wikipedia

   en.wikipedia.org/wiki/Squaring_the_square

   The smallest square s 1 in R is surrounded by larger, and therefore higher, cubes. Hence the upper face of the cube on s 1 is divided into a perfect squared square by the cubes which rest on it. Let s 2 be the smallest square in this dissection. By the claim above, this is surrounded on all 4 sides by squares which are larger than s 2 and ...

5. Sylvester's sequence - Wikipedia

   en.wikipedia.org/wiki/Sylvester's_sequence

   Each row of k squares of side length 1/k has total area 1/k, and all the squares together exactly cover a larger square with area 1. Squares with side lengths 1/1807 or smaller are too small to see in the figure and are not shown. In number theory, Sylvester's sequence is an integer sequence in which each term is the product of the previous ...

6. Centered square number - Wikipedia

   en.wikipedia.org/wiki/Centered_square_number

   All centered square numbers and their divisors have a remainder of 1 when divided by 4. Hence all centered square numbers and their divisors end with digit 1 or 5 in base 6, 8, and 12. Every centered square number except 1 is the hypotenuse of a Pythagorean triple (3-4-5, 5-12-13, 7-24-25, ...). This is exactly the sequence of Pythagorean ...

7. Small Latin squares and quasigroups - Wikipedia

   en.wikipedia.org/wiki/Small_Latin_squares_and...

   Latin squares and finite quasigroups are equivalent mathematical objects, although the former has a combinatorial nature while the latter is more algebraic.The listing below will consider the examples of some very small orders, which is the side length of the square, or the number of elements in the equivalent quasigroup.