Matches in DBpedia 2016-04 for { ?s ?p "In mathematics, Cramer's theorem on algebraic curves gives the necessary and sufficient number of points in the real plane falling on an algebraic curve to uniquely determine the curve in non-degenerate cases. This number is n(n + 3) / 2, where n is the degree of the curve. The theorem is due to Gabriel Cramer, who published it in 1750.For example, a line (of degree 1) is determined by 2 distinct points on it: only one line goes through those two points."@en }
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- Cramers_theorem_(algebraic_curves) comment "In mathematics, Cramer's theorem on algebraic curves gives the necessary and sufficient number of points in the real plane falling on an algebraic curve to uniquely determine the curve in non-degenerate cases. This number is n(n + 3) / 2, where n is the degree of the curve. The theorem is due to Gabriel Cramer, who published it in 1750.For example, a line (of degree 1) is determined by 2 distinct points on it: only one line goes through those two points.".
- Q20278711 comment "In mathematics, Cramer's theorem on algebraic curves gives the necessary and sufficient number of points in the real plane falling on an algebraic curve to uniquely determine the curve in non-degenerate cases. This number is n(n + 3) / 2, where n is the degree of the curve. The theorem is due to Gabriel Cramer, who published it in 1750.For example, a line (of degree 1) is determined by 2 distinct points on it: only one line goes through those two points.".