...of the curve formed by the intersection of the two surfaces. XV. OR PRIZE QUEST. (1703); by PASCAL. If the three pairs of opposite sides of a hexagon...conic section be produced to meet, the three points of section will be in a straight line ; required a demonstration without the aid of perspective, or any...

...the arrangement of this chapter the foundation of Pascal's theorem, next in the series. PROP. XIV. The three pairs of opposite sides of a hexagon inscribed in a conic section, being produced to meet, the three points of intersection will all be situated in one straight line....

...B(?-TV SC, and CY be a perpendicular from the centre upon the tangent at P, then PY = SC. 99. If the opposite sides of a hexagon inscribed in a conic section...produced to meet, the three points of intersection will lie in a straight line. In fig. 114, draw any diagonal MM', and let the pairs of opposite sides...

...the conic section at one of the angular points of the triangle, we fall upon Prob. 50. 100. If two pairs of opposite sides of a hexagon inscribed in a conic section be parallel to one another, the two remaining sides shall also be parallel to one another. Let MM' be...

...one plane ; or, making the statement for any plane section of the cone, the points of intersection of the three pairs of opposite sides, of a hexagon inscribed in a conic, lie in one straight line. EXAMPLES TO CHAPTER VII. 1 . On the vector of a point P in the plane Sap...

...one plane ; or, making the statement for any plane section of the cone, the points of intersection of the three pairs of opposite sides, of a hexagon inscribed in a conic, lie in one straight line. EXAMPLES TO CHAPTER VII. 1. On the vector of a point P in the plane Sap =...

...point (a/SyV which means the point whose trilincar co-ordinates are a, ft 7. 336. Pascal's Theorem, The three pairs of opposite sides of a hexagon inscribed in a conic intersect in points which all lie in one straight line. Let L = 0, M=0, N=0, R = 0, S=0, T = 0, be...

...plane ; or, making the statement for any plane section of the cone, that the points of intersection of the three pairs of opposite sides, of a hexagon inscribed in a curve, may always lie in one straight line, the curve must be a conic section. EXAMPLES TO CHAPTER...

...G) ЦIг + By + F) AB H represents the axes, as proved in Art. 303, Ex. 1. 342. Pascal's Tiieorem. The three pairs of opposite sides of a hexagon inscribed in a conic intersect in points which all lie in one straight line. since the conic is circumscribed about the...

...identity aSi - b$2 = c/Ss - dS± gives aS\ — 0/83 = bSz, — dS^&c. Cor. — The intersections of the three pairs of opposite sides of a hexagon inscribed in a conic lie on a right line. If ABCDEF be the hexagon, and we take for /Si, $2, $3, $4 the pairs of lines (AD,...