kvadrattal

Kvadrattal, or square numbers, are integers that are the square of another integer. Formally, a kvadrattal is any integer of the form n^2 with n ∈ Z. Depending on the convention for natural numbers, 0 may or may not be included; since 0^2 = 0, it is a square number in many contexts.

Examples of kvadrattal include 0, 1, 4, 9, 16, 25, 36, 49, 64, 81, and 100.

Key properties of kvadrattal include parity and modular behavior. If n is even, then n^2 is divisible

Arithmetic and geometry offer simple interpretations. The difference between consecutive kvadrattal is an odd number: (n+1)^2

Patterns in base 10 include a restricted set of final digits: kvadrattal can end only in 0,

See also: Perfect square, Square root, Pythagorean theorem, Lattice point.