Difference between revisions of "Mod Command"

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<noinclude>{{Manual Page|version=4.0}}[[Category:Manual (official)|{{PAGENAME}}]]</noinclude>
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<noinclude>{{Manual Page|version=5.0}}</noinclude>{{command|cas=true|algebra}}
{{command|algebra}}
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;Mod( <Dividend Number>, <Divisor Number> )
; Mod[Integer a, Integer b]: Yields the remainder when integer ''a'' is divided by integer ''b''.
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:Yields the remainder when dividend number is divided by divisor number.
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:{{example|1=<code><nowiki>Mod(9, 4)</nowiki></code> yields ''1''.}}
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;Mod( <Dividend Polynomial>, <Divisor Polynomial> )
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:Yields the remainder when the dividend polynomial is divided by the divisor polynomial.
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:{{example|1=<code><nowiki>Mod(x^3 + x^2 + x + 6, x^2 - 3)</nowiki></code> yields ''4 x + 9''.}}
  
; Mod[Polynomial, Polynomial]: {{description}}
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{{note|1=<div>
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If you want a function to do this, you can define it yourself, e.g. <code>mod(x, y) = y (x / y - floor(x / y))</code>.
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</div>}}

Latest revision as of 12:00, 5 October 2017


Mod( <Dividend Number>, <Divisor Number> )
Yields the remainder when dividend number is divided by divisor number.
Example: Mod(9, 4) yields 1.
Mod( <Dividend Polynomial>, <Divisor Polynomial> )
Yields the remainder when the dividend polynomial is divided by the divisor polynomial.
Example: Mod(x^3 + x^2 + x + 6, x^2 - 3) yields 4 x + 9.


Note:

If you want a function to do this, you can define it yourself, e.g. mod(x, y) = y (x / y - floor(x / y)).

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