kvadraturer

Kvadraturer, a term with roots in Latin meaning "squaring," refers to a historical geometric problem and, more broadly, to methods of approximating the area under a curve. The classical problem of squaring the circle, dating back to ancient Greece, was to construct a square with the same area as a given circle using only a compass and straightedge. This was famously proven impossible in 1882 by Ferdinand von Lindemann, who demonstrated that pi is a transcendental number, meaning it cannot be a root of any non-zero polynomial equation with rational coefficients.

Beyond this specific impossibility, "kvadraturer" also encompasses numerical methods used in calculus to approximate definite integrals.