Difference between revisions of "GCD Command"
From GeoGebra Manual
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− | <noinclude>{{Manual Page}} | + | <noinclude>{{Manual Page|version=5.0}}</noinclude>{{command|cas=true|algebra}} |
− | + | {{Alternate Language|region=US|page_type=Command|US_version=GCD|non-US_version=HCF}} | |
− | + | ||
− | ; GCD | + | ;GCD( <Number>, <Number> ) |
− | ; GCD | + | :Calculates the greatest common divisor of the two numbers . |
+ | :{{example| 1=<div><code><nowiki>GCD(12, 15)</nowiki></code> yields ''3''.</div>}} | ||
+ | ;GCD( <List of Numbers> ) | ||
+ | :Calculates the greatest common divisor of the list of numbers. | ||
+ | :{{example| 1=<div><code><nowiki>GCD({12, 30, 18})</nowiki></code> yields ''6''.</div>}} | ||
+ | |||
+ | {{hint|In the [[File:Menu view cas.svg|link=|16px]] [[CAS View]] you can also use the following syntax:}} | ||
+ | ;GCD( <Polynomial>, <Polynomial> ) | ||
+ | :Calculates the greatest common divisor of the two polynomials. | ||
+ | :{{example| 1=<div><code><nowiki>GCD(x^2 + 4 x + 4, x^2 - x - 6)</nowiki></code> yields ''x + 2''.</div>}} | ||
+ | ;GCD( <List of Polynomials> ) | ||
+ | : Calculates the greatest common divisor of the list of polynomials. | ||
+ | :{{example| 1=<div><code><nowiki>GCD({x^2 + 4 x + 4, x^2 - x - 6, x^3 - 4 x^2 - 3 x + 18})</nowiki></code> yields ''x + 2''.</div>}} | ||
+ | |||
+ | {{note|See also [[LCM Command]] and [[ExtendedGCD Command]].}} |
Latest revision as of 09:34, 29 April 2023
This command differs among variants of English:
|
- GCD( <Number>, <Number> )
- Calculates the greatest common divisor of the two numbers .
- Example:
GCD(12, 15)
yields 3.
- GCD( <List of Numbers> )
- Calculates the greatest common divisor of the list of numbers.
- Example:
GCD({12, 30, 18})
yields 6.
Hint: In the CAS View you can also use the following syntax:
- GCD( <Polynomial>, <Polynomial> )
- Calculates the greatest common divisor of the two polynomials.
- Example:
GCD(x^2 + 4 x + 4, x^2 - x - 6)
yields x + 2.
- GCD( <List of Polynomials> )
- Calculates the greatest common divisor of the list of polynomials.
- Example:
GCD({x^2 + 4 x + 4, x^2 - x - 6, x^3 - 4 x^2 - 3 x + 18})
yields x + 2.
Note: See also LCM Command and ExtendedGCD Command.