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:''This page is about the primitive function. For system limits, see [[LIMIT ERROR]] and [[Maximum rank]].'' | :''This page is about the primitive function. For system limits, see [[LIMIT ERROR]] and [[Maximum rank]].'' | ||
{{Built-in|Maximum|⌈}}, '''Max''', '''Greater of''', or '''Larger of''' is a [[dyadic]] [[scalar function]] which returns the [[Greater than|larger]] of its two [[argument]]s. The name "Maximum" is sometimes also used for the Maximum [[Reduce]] < | {{Built-in|Maximum|⌈}}, '''Max''', '''Greater of''', or '''Larger of''' is a [[dyadic]] [[scalar function]] which returns the [[Greater than|larger]] of its two [[argument]]s. The name "Maximum" is sometimes also used for the Maximum [[Reduce]] <syntaxhighlight lang=apl inline>⌈/</source>, which returns the largest element of a [[vector]] (this usage is related to the [[wikipedia:maximum|maximum]] of a function). Maximum is paired with [[Minimum]], and shares the glyph <syntaxhighlight lang=apl inline>⌈</source> with the [[Ceiling]] function. It is not subject to [[comparison tolerance]], since the result will be exactly equal to one argument, and there is no reason to choose a smaller argument even if the two arguments are [[tolerant comparison|tolerantly]] equal. As a [[Boolean function]], Maximum is identical to [[Or]]. | ||
== Examples == | == Examples == | ||
Line 7: | Line 7: | ||
Maximum finds the larger of two numbers: | Maximum finds the larger of two numbers: | ||
< | <syntaxhighlight lang=apl> | ||
2.4 ⌈ 1.9 | 2.4 ⌈ 1.9 | ||
2.4 | 2.4 | ||
</source> | </source> | ||
Maximum [[Reduce]] finds the largest [[element]] in a [[vector]]: | Maximum [[Reduce]] finds the largest [[element]] in a [[vector]]: | ||
< | <syntaxhighlight lang=apl> | ||
⌈/ 4 3 2 7 5 1 3 | ⌈/ 4 3 2 7 5 1 3 | ||
7 | 7 | ||
</source> | </source> | ||
The [[index]] of this element can be found with [[Index Of]], but is also the [[First]] element of the [[Grade Down]] of the vector. | The [[index]] of this element can be found with [[Index Of]], but is also the [[First]] element of the [[Grade Down]] of the vector. | ||
< | <syntaxhighlight lang=apl> | ||
{⍵⍳⌈/⍵} 4 3 2 7 5 1 3 | {⍵⍳⌈/⍵} 4 3 2 7 5 1 3 | ||
4 | 4 | ||
Line 24: | Line 24: | ||
</source> | </source> | ||
Reducing over an empty axis yields the smallest representable number, as that is the identity element for Maximum. This value is usually < | Reducing over an empty axis yields the smallest representable number, as that is the identity element for Maximum. This value is usually <syntaxhighlight lang=apl inline>¯∞</source> (for dialects that support [[infinity|infinities]]) or <syntaxhighlight lang=apl inline>¯1.797693135E308</source> (with 64-bit [[float]]s) or <syntaxhighlight lang=apl inline>¯1E6145</source> (with 128-bit [[decimal float]]s). | ||
== External links == | == External links == |
Revision as of 21:15, 10 September 2022
- This page is about the primitive function. For system limits, see LIMIT ERROR and Maximum rank.
⌈
|
Maximum (⌈
), Max, Greater of, or Larger of is a dyadic scalar function which returns the larger of its two arguments. The name "Maximum" is sometimes also used for the Maximum Reduce <syntaxhighlight lang=apl inline>⌈/</source>, which returns the largest element of a vector (this usage is related to the maximum of a function). Maximum is paired with Minimum, and shares the glyph <syntaxhighlight lang=apl inline>⌈</source> with the Ceiling function. It is not subject to comparison tolerance, since the result will be exactly equal to one argument, and there is no reason to choose a smaller argument even if the two arguments are tolerantly equal. As a Boolean function, Maximum is identical to Or.
Examples
- See also Minimum#examples.
Maximum finds the larger of two numbers: <syntaxhighlight lang=apl>
2.4 ⌈ 1.9
2.4 </source> Maximum Reduce finds the largest element in a vector: <syntaxhighlight lang=apl>
⌈/ 4 3 2 7 5 1 3
7 </source> The index of this element can be found with Index Of, but is also the First element of the Grade Down of the vector. <syntaxhighlight lang=apl>
{⍵⍳⌈/⍵} 4 3 2 7 5 1 3
4
⊃⍒ 4 3 2 7 5 1 3
4 </source>
Reducing over an empty axis yields the smallest representable number, as that is the identity element for Maximum. This value is usually <syntaxhighlight lang=apl inline>¯∞</source> (for dialects that support infinities) or <syntaxhighlight lang=apl inline>¯1.797693135E308</source> (with 64-bit floats) or <syntaxhighlight lang=apl inline>¯1E6145</source> (with 128-bit decimal floats).
External links
Documentation
- Dyalog
- APLX
- J Dictionary, NuVoc
- BQN