例句與造句

1. It is now easy to check that this line is the Pascal line.
2. It states that if a hexagon is inscribed in a circle ( or conic ) then the three intersection points of opposite sides lie on a line ( called the Pascal line ).
3. For a hexagon with vertices lying on a conic we have the Pascal line and, in the special case where the conic is a pair of lines, we have the Pappus line.
4. If six unordered points are given on a conic section, they can be connected into a hexagon in 60 different ways, resulting in 60 different instances of Pascal's theorem and 60 different Pascal lines.
5. If exactly one pair of opposite sides of the hexagon are parallel, then the conclusion of the theorem is that the " Pascal line " determined by the two points of intersection is parallel to the parallel sides of the hexagon.
6. It's difficult to find pascal line in a sentence. 用pascal line造句挺難的
7. Its Pascal line contains three 4-dimensional subspaces : 1234 of spin ( weak interaction and electromagnetism )  the spacetime of physics, the light cone 1456 and the nuclear rotor 2356 of WIGRIS ( figure 6 roll mill ).
8. Pascal's theorem follows by taking the 8 points as the 6 points on the hexagon and two of the points ( say, and in the figure ) on the would-be Pascal line, and the ninth point as the third point ( in the figure ).
9. If two pairs of opposite sides are parallel, then all three pairs of opposite sides form pairs of parallel lines and there is no Pascal line in the Euclidean plane ( in this case, the line at infinity of the extended Euclidean plane is the Pascal line of the hexagon ).
10. If two pairs of opposite sides are parallel, then all three pairs of opposite sides form pairs of parallel lines and there is no Pascal line in the Euclidean plane ( in this case, the line at infinity of the extended Euclidean plane is the Pascal line of the hexagon ).
11. In projective geometry, "'Pascal's theorem "'( also known as the "'Hexagrammum Mysticum Theorem "') states that if six arbitrary points are chosen on a extended if necessary ) meet in three points which lie on a straight line, called the "'Pascal line "'of the hexagon.
12. A degenerate case of Pascal's theorem ( four points ) is interesting; given points on a conic, the intersection of alternate sides,,, together with the intersection of tangents at opposite vertices and are collinear in four points; the tangents being degenerate'sides', taken at two possible positions on the'hexagon'and the corresponding Pascal line sharing either degenerate intersection.
13. Pascal's theorem states that if six arbitrary points are chosen on a conic section ( i . e ., ellipse, parabola or hyperbola ) and joined by line segments in any order to form a hexagon, then the three pairs of opposite sides of the hexagon ( extended if necessary ) meet in three points which lie on a straight line, called the Pascal line of the hexagon.
14. *Pascal's theorem ( also known as the Hexagrammum Mysticum Theorem ) states that if an arbitrary six points are chosen on a conic section ( i . e ., ellipse, parabola or hyperbola ) and joined by line segments in any order to form a hexagon, then the three pairs of opposite sides of the hexagon ( extended if necessary ) meet in three points which lie on a straight line, called the Pascal line of the hexagon.