OpenMath Content Dictionary: integer1

Canonical URL:
http://www.openmath.org/cd/integer1.ocd
CD Base:
http://www.openmath.org/cd
CD File:
integer1.ocd
CD as XML Encoded OpenMath:
integer1.omcd
Defines:
factorial, factorof, quotient, remainder
Date:
2004-03-30
Version:
3 (Revision 1)
Review Date:
2006-03-30
Status:
official


     This document is distributed in the hope that it will be useful, 
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     MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.

     The copyright holder grants you permission to redistribute this 
     document freely as a verbatim copy. Furthermore, the copyright
     holder permits you to develop any derived work from this document
     provided that the following conditions are met.
       a) The derived work acknowledges the fact that it is derived from
          this document, and maintains a prominent reference in the 
          work to the original source.
       b) The fact that the derived work is not the original OpenMath 
          document is stated prominently in the derived work.  Moreover if
          both this document and the derived work are Content Dictionaries
          then the derived work must include a different CDName element,
          chosen so that it cannot be confused with any works adopted by
          the OpenMath Society.  In particular, if there is a Content 
          Dictionary Group whose name is, for example, `math' containing
          Content Dictionaries named `math1', `math2' etc., then you should 
          not name a derived Content Dictionary `mathN' where N is an integer.
          However you are free to name it `private_mathN' or some such.  This
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  Author: OpenMath Consortium
  SourceURL: https://github.com/OpenMath/CDs
            

This CD holds a collection of basic integer functions.

This CD is intended to be `compatible' with the corresponding elements in Content MathML.


factorof

Role:
application
Description:

This is the binary OpenMath operator that is used to indicate the mathematical relationship a "is a factor of" b, where a is the first argument and b is the second. This relationship is true if and only if b mod a = 0.

Commented Mathematical property (CMP):
b is a factor of a iff remainder of a divided by b = 0
Formal Mathematical property (FMP):
factorof ( b , a ) remainder ( a , b ) = 0
Signatures:
sts


[Next: factorial] [Last: remainder] [Top]

factorial

Role:
application
Description:

The symbol to represent a unary factorial function on non-negative integers.

Commented Mathematical property (CMP):
factorial n = product [1..n]
Formal Mathematical property (FMP):
n ! = i = 1 n i
Signatures:
sts


[Next: quotient] [Previous: factorof] [Top]

quotient

Role:
application
Description:

The symbol to represent the integer (binary) division operator. That is, for integers a and b, quotient(a,b) denotes q such that a=b*q+r, with |r| less than |b| and a*r positive.

Commented Mathematical property (CMP):
for all a,b with a,b Integers | a = b * quotient(a,b) + remainder(a,b) and abs(remainder(a,b)) is less than abs(b) and a*remainder(a,b) >= 0
Formal Mathematical property (FMP):
a , b . a Z b Z a = b quotient ( a , b ) + remainder ( a , b ) | remainder ( a , b ) | < | b | a remainder ( a , b ) 0
Signatures:
sts


[Next: remainder] [Previous: factorial] [Top]

remainder

Role:
application
Description:

The symbol to represent the integer remainder after (binary) division. For integers a and b, remainder(a,b) denotes r such that a=b*q+r, with |r| less than |b| and a*r positive.

Commented Mathematical property (CMP):
for all a,b with a,b Integers | a = b * quotient(a,b) + remainder(a,b) and abs(remainder(a,b)) is less than abs(b) and a*remainder(a,b) >= 0
Formal Mathematical property (FMP):
a , b . a Z b Z a = b quotient ( a , b ) + remainder ( a , b ) | remainder ( a , b ) | < | b | a remainder ( a , b ) 0
Signatures:
sts


[First: factorof] [Previous: quotient] [Top]