GCD: GCD and LCM Integer Functions

View source: R/gcd.R

GCD, LCMR Documentation

GCD and LCM Integer Functions

Description

Greatest common divisor and least common multiple

Usage

GCD(n, m)
LCM(n, m)

mGCD(x)
mLCM(x)

Arguments

n, m

integer scalars.

x

a vector of integers.

Details

Computation based on the Euclidean algorithm without using the extended version.

mGCD (the multiple GCD) computes the greatest common divisor for all numbers in the integer vector x together.

Value

A numeric (integer) value.

Note

The following relation is always true:

n * m = GCD(n, m) * LCM(n, m)

See Also

extGCD, coprime

Examples

GCD(12, 10)
GCD(46368, 75025)  # Fibonacci numbers are relatively prime to each other

LCM(12, 10)
LCM(46368, 75025)  # = 46368 * 75025

mGCD(c(2, 3, 5, 7) * 11)
mGCD(c(2*3, 3*5, 5*7))
mLCM(c(2, 3, 5, 7) * 11)
mLCM(c(2*3, 3*5, 5*7))

numbers documentation built on Nov. 23, 2022, 9:06 a.m.