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The invention of Typography made it possible to devise a notice that could be reproduced in large numbers and distributed widely.
Typographical conventions in mathematical formulae provide uniformity across mathematical texts and help the readers of those texts to grasp new concepts quickly.
Mathematical notation includes letters from various alphabets, as well as special mathematical symbols. Letters in various fonts often have specific, fixed meanings in particular areas of mathematics. A mathematical article or a theorem in large numbers typically starts from the definitions of the introduced symbols, such as: "Let G = (V, E) be a graph with the vertex set V and edge set E...". Theoretically it is admissible to write "Let X = (a, q) be a graph with the vertex set a and edge set q..."; however, this would decrease readability, since the reader has to consciously memorize these unusual notations in a limited context.
Usage of subscripts and superscripts is also an important convention. In the early days of computers with limited graphical capabilities for text, subscripts and superscripts were represented with the help of additional notation. In particular, n₂ could be written as n² or n**2 (the latter borrowed from FORTRAN) and n2 could be written as n₂.
The rules of mathematical typography differ slightly from country to country; thus, American mathematical journals and books will tend to use slightly different conventions from those of European journals.
One advantage of mathematical notation is its modularity—it is possible to write extremely complicated formulae involving multiple levels of superscripting or subscripting, and multiple levels of fraction bars. However, it is considered poor style to set up a formula in such a way as to leave more than a certain number of levels; for example, in non-math publications
AX = Ω[tex]e^{x}[/tex] + a/ b +c/d
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