- 2.1 Using MathML Presentation Tags
- 2.2 Using MathML Content Tags
- 2.3 Mixing Both Types of Markup Element

This section introduces the basic features of MathML markup. It gives a number of examples of basic MathML expressions, introducing the use of presentation tags, content tags, and mixed markup. Note that in strict SGML parlance the building blocks of document structure are "elements" containing data; the beginning and end of the contained data are marked off by begin and end "tags". The first example below is the MROW element, with begin tag <MROW> and end tag </MROW>. Some elements contain no data by definition, and so there is only one tag associated. The first example below of a contentless element is POWER, occurring at the start of section 2.2, with the tag <POWER/>.

The intention of this section is to give a brief overview of how MathML works in practice. It is not intended as a full tutorial, or as a reference, but merely as a way of rapidly conveying some of the possibilities of MathML.

**Markup:**

<MROW> <MROW> <MSUP> <MI>x</MI> <MN>2</MN> </MSUP> <MO>+</MO> <MROW> <MN>4</MN> <MO>⁢</MO> <MI>x</MI> </MROW> <MO>+</MO> <MN>4</MN> </MROW> <MO>=</MO> <MN>0</MN> </MROW>There are two important things to note here. The first is that there are two kinds of MathML elements -- those that contain data like MI, MN and MO, and those that only contain other nested MathML elements like MSUP and MROW. The second is the use of nested MROW elements to denote terms, in this case the left-hand side of the equation functioning as an operand of "=". Typing data and marking terms greatly facilitate things like spacing for visual rendering, voice rendering, and line breaking, as well as automatic processing by external applications.

The elements that contain data declare the type of the data. For example, the <MI> tag indicates an identifier, or variable, while the <MN> tag indicates a number. All of the type tags have two-letter names.

The other tags denote layout schema like scripts, fractions or rows.
In general each schema must contain a prescribed number of subexpressions
in a specific order. The MSUP schema, for example, expects exactly two
subexpressions, of which the first is the base, and the second is the superscript.
**Notation:**

**Markup:**

<MROW> <MI>x</MI> <MO>=</MO> <MFRAC> <MROW> <MROW> <MO>-</MO> <MI>b</MI> </MROW> <MO>±</MO> <MSQRT> <MROW> <MSUP> <MI>b</MI> <MN>2</MN> </MSUP> <MO>-</MO> <MROW> <MN>4</MN> <MO>⁢</MO> <MI>a</MI> <MO>⁢</MO> <MI>c</MI> </MROW> </MROW> </MSQRT> </MROW> <MROW> <MN>2</MN> <MO>⁢</MO> <MI>a</MI> </MROW> </MFRAC> </MROW>Notice that the plus/minus sign is given by a special named entity ±. MathML provides a very comprehensive list of entity names for mathematical symbols. In addition to the mathematical symbols needed for screen and print rendering, MathML provides symbols to facilitate audio rendering. For audio rendering, it is important to be able to automatically determine whether

<MROW> <MI>z</MI> <MROW> <MF>(</MF> <MROW> <MI>x</MI> <MO>+</MO> <MI>y</MI> </MROW> <MF>)</MF> </MROW> </MROW>means "z times the quantity x plus y" or "z of x plus y". The entities ⁢ and ⁡ provide a way for authors to directly encode the distinction for audio renderers. For instance, in the first case ⁢ should be inserted after the line containing the z. MathML also introduces entities like ⅆ which represents a "differential d" which renders with slightly different spacing in print, and is usually rendered as "with respect to" in speech. Unless content tags, or some other mechanism, are used to eliminate the ambiguity, authors should always use these entities, in order to make their documents more accessible.

**Markup:**

<MROW> <MI>A</MI> <MO>=</MO> <MROW> <MF>[</MF> <MTABLE> <MTR> <MTD><MI>x</MI></MTD> <MTD><MI>y</MI></MTD> </MTR> <MTR> <MTD><MI>z</MI></MTD> <MTD><MI>w</MI></MTD> </MTR> </MTABLE> <MF>]</MF> </MROW> </MROW>This example introduces several more elements, including the MF fence tags. Most elements have a number of attributes that control the details of their screen and print rendering. For example, there are several attributes for the fence element that control whether a fence should stretch at all, whether it should stretch symmetrically, and so on. The attributes for entities are set to default values determined by a dictionary. The W3C HTML Math working group plans to release a proposal for a standard MathML dictionary by September, 1997. (See appendix C.)

**Notation:**

**Markup:**

<EXPR> <EXPR> <EXPR> <MI>x</MI> <POWER/> <MN>2</MN> </EXPR> <PLUS/> <EXPR> <MN>4</MN> <TIMES/> <MI>x</MI> </EXPR> <PLUS/> <MN>4</MN> </EXPR> <E/> <MN>0</MN> </EXPR>Note that MathML content tags are typically contained within an EXPR element. The EXPR element denotes a semantically meaningful expression. Although MathML syntax does not prohibit <EXPR> tags from containing purely notational presentation markup, as a convention, authors should only use <EXPR> tags when the contents have an unambiguous mathematical meaning.

Another important feature of the MathML content elements is that many
of them are empty. In XML, an empty element's tag is of
the form < ... />. Many of the empty content elements play the role
of standard infix operators. To make the order of operations explicit,
and to determine the scope of certain operators, the <EXPR> and </EXPR>
tags function like parentheses.

**Notation:**
**Markup:**

<EXPR> <MI>x</MI> <E/> <EXPR> <EXPR> <EXPR> <MO>-</MO> <MI>b</MI> </EXPR> <MO>±</MO> <MSQRT> <EXPR> <EXPR> <MI>b</MI> <POWER/> <MN>2</MN> </EXPR> <MINUS/> <EXPR> <MN>4</MN> <TIMES/> <MI>a</MI> <TIMES/> <MI>c</MI> </EXPR> </EXPR> </MSQRT> </EXPR> <OVER/> <EXPR> <MN>2</MN> <TIMES/> <MI>a</MI> </EXPR> </EXPR> </EXPR>Although mixing presentation and content tags provides an easy way of giving a relatively unambiguous coding of moderately complicated content, there are situations where this strategy is unsatisfactory. In the preceding example, the author has indicated that the denominator of the fraction is "2 times a". However, the author has no explicit control over how a particular renderer represents the operator "times" on the screen. Typically, it will just be rendered as juxtaposition of symbols, but if the author wants it to be rendered with a multiplication sign, another MathML construction is required.

The W3C HTML Math Working group plans to make a proposal specifying an extension mechanism for MathML which provides authors with a way of specifying how a content tag should render using style sheets. However, situations will still remain where an author needs a way of directly specifying presentation markup, while also providing additional semantic information directly to specific renderers. An example might consist of presentation mark up for a function together with additional data intended for displaying its graph in a 3D graphics environment.

For these situations, MathML provides the SEMANTICS tag:
**Notation:**

**Markup:**

<SEMANTICS> <MROW> <MSUBSUP> <MO>∫</MO> <MN>0</MN> <MI>t</MI> </MSUBSUP> <MFRAC> <MROW> <MO>ⅆ</MO> <MI>x</MI> </MROW> <MI>x</MI> </MFRAC> </MROW> <EXPR> <INT> <LOWLIMIT> <MN>0</MN> </LOWLIMIT> <UPLIMIT> <MI>t</MI> </UPLIMIT> <EXPR> <MN>1</MN> <OVER/> <MI>x</MI> </EXPR> <BVAR>x</BVAR> </INT> </EXPR> </SEMANTICS>The SEMANTICS element expects two children. The first child consists of presentation markup. The second child can contain arbitrary semantic markup. In this example, the second child is composed of MathML content elements. However, in principle, the second child could be an OpenMath expression, a computer algebra expression, or even a C program. An attribute of the SEMANTICS element can be used to specify the type of encoding.