# I. Elegant XSLT code

**One can often find examples of beautiful XSLT code, especially when XSLT is used as a functional programming language**.

For examples see **this article** on **FXSL 2.0** -- the Functional Programming library for XSLT 2.0.

As an FP language XSLT is also a **declarative language**. This, among other things means that one declares, specifies existing relationships.

Such **a definition often does not need any additional code to produce a result -- it itself is its own implementation, or an executable definition or executable specification**.

**Here is a small example**.

**This XPath 2.0 expression defines** the "*Maximum Prime Factor of a natural number*":

```
if(f:isPrime($pNum))
then $pNum
else
for $vEnd in xs:integer(floor(f:sqrt($pNum, 0.1E0))),
$vDiv1 in (2 to $vEnd)[$pNum mod . = 0][1],
$vDiv2 in $pNum idiv $vDiv1
return
max((f:maxPrimeFactor($vDiv1),f:maxPrimeFactor($vDiv2)))
```

**To pronounce it in English**, the maximum prime factor of a number `pNum`

is the number itself, if `pNum`

is prime, otherwise if `vDiv1`

and `vDiv2`

are two factors of `pNum`

, then the maximum prime factor of `pNum`

is the bigger of the maximum prime factors of `vDiv1`

and `vDiv2`

.

**How do we use this to actually calculate** the Maximum Prime Factor in XSLT? **We simply wrap up the definition above** in an `<xsl:function>`

and ... get the result!

```
<xsl:function name="f:maxPrimeFactor" as="xs:integer">
<xsl:param name="pNum" as="xs:integer"/>
<xsl:sequence select=
"if(f:isPrime($pNum))
then $pNum
else
for $vEnd in xs:integer(floor(f:sqrt($pNum, 0.1E0))),
$vDiv1 in (2 to $vEnd)[$pNum mod . = 0][1],
$vDiv2 in $pNum idiv $vDiv1
return
max((f:maxPrimeFactor($vDiv1),f:maxPrimeFactor($vDiv2)))
"/>
</xsl:function>
```

**We can, then, calculate the MPF for any natural number**, for example:

`f:maxPrimeFactor(600851475143)`

= 6857

As for efficiency, well, **this transformation takes just 0.109 sec**.

**Other examples of both ellegant and efficient XSLT code**: