# affine cone造句

## 例句與造句

- This is the
*affine cone*over the projective quadric " S ". - The cone may have multiple branches, each one an
*affine cone*over a simple closed curve in the projective tangent space. - The dual curve is a curve in the projective tangent space at the point, and the
*affine cone*over this curve is the Monge cone. - Geometrically, this definition means that the degree of " X " is the multiplicity of the vertex of the
*affine cone*over " X ". - :If no seven points out of are co-conic, then the vector space of cubic homogeneous polynomials that vanish on ( the
*affine cones*of ) ( with multiplicity for double points ) has dimension two. - It's difficult to find
*affine cone*in a sentence. 用*affine cone*造句挺難的 - :If no seven points out of lie on a non-degenerate conic, and no four points out of lie on a line, then the vector space of cubic homogeneous polynomials that vanish on ( the
*affine cones*of ) has dimension two. - Since will always contain the whole line through on account of B閦out's theorem, the vector space of cubic homogeneous polynomials that vanish on ( the
*affine cones*of ) is isomorphic to the vector space of quadratic homogeneous polynomials that vanish ( the affine cones of ), which has dimension two. - Since will always contain the whole line through on account of B閦out's theorem, the vector space of cubic homogeneous polynomials that vanish on ( the affine cones of ) is isomorphic to the vector space of quadratic homogeneous polynomials that vanish ( the
*affine cones*of ), which has dimension two.