French mathematician who derived a geometrical theorem (now known as Brianchon's theorem) useful in the study of the properties of conic sections (conic section) (circles, ellipses, parabolas, and hyperbolas) and who was innovative in applying the principle of duality to geometry.

In 1804 Brianchon entered the École Polytechnique in Paris, where he became a student of the noted French mathematician Gaspard Monge (Monge, Gaspard, comte de Péluse). While still a student, he published his first paper, “Mémoire sur les surfaces courbes du second degré” (1806; “Memoir on Curved Surfaces of Second Degree”), in which he recognized the projective nature of a theorem of Blaise Pascal (Pascal, Blaise), and then proclaimed his own famous theorem: If a hexagon is circumscribed about a conic (all sides made tangent to the conic), then the lines joining the opposite vertices of the hexagon will meet in a single point. The theorem is the dual of Pascal's because its statement and proof can be obtained by systematically substituting the terms point with line and collinear with concurrent.

Brianchon graduated first in his class in 1808 and joined Napoleon (Napoleon I)'s armies as a lieutenant in the artillery. Though his courage and ability distinguished him in the field, particularly in the Peninsular War, the rigours of field service affected his health. In 1818 he gained a professorship in the Artillery School of the Royal Guard in Vincennes, where his mathematical work was slowly replaced by other interests.