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Examples of computer clip art, from Openclipart. Clip art (also clipart, clip-art) is a type of graphic art.Pieces are pre-made images used to illustrate any medium. Today, clip art is used extensively and comes in many forms, both electronic and printed.
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Original file (SVG file, nominally 909 × 223 pixels, file size: 32 KB) This is a file from the Wikimedia Commons . Information from its description page there is shown below.
Diagram of a cast metal sort.a face, b body or shank, c point size, 1 shoulder, 2 nick, 3 groove, 4 foot.. In professional typography, [a] the term typeface is not interchangeable with the word font (originally "fount" in British English, and pronounced "font"), because the term font has historically been defined as a given alphabet and its associated characters in a single size.
A holomorphic line bundle is a rank one holomorphic vector bundle. By Serre's GAGA , the category of holomorphic vector bundles on a smooth complex projective variety X (viewed as a complex manifold) is equivalent to the category of algebraic vector bundles (i.e., locally free sheaves of finite rank) on X .
If E is a complex vector bundle, then the conjugate bundle ¯ of E is obtained by having complex numbers acting through the complex conjugates of the numbers. Thus, the identity map of the underlying real vector bundles: ¯ = is conjugate-linear, and E and its conjugate E are isomorphic as real vector bundles.
Also, a line bundle L is big if and only if it has a positive tensor power which is the tensor product of an ample line bundle A and an effective line bundle B (meaning that (,)). [42] Finally, a line bundle is big if and only if its class in N 1 ( X ) {\displaystyle N^{1}(X)} is in the interior of the cone of effective divisors.
The Euler class, in turn, relates to all other characteristic classes of vector bundles. For closed Riemannian manifolds , the Euler characteristic can also be found by integrating the curvature; see the Gauss–Bonnet theorem for the two-dimensional case and the generalized Gauss–Bonnet theorem for the general case.