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|definicija=A prime number (or prime integer, often simply called a "prime" for short) is a positive integer $p>1$ that has no positive integer divisors other than $1$ and $p$ itself. | |definicija=A prime number (or prime integer, often simply called a "prime" for short) is a positive integer $p>1$ that has no positive integer divisors other than $1$ and $p$ itself. | ||
|cite=Weisstein, Eric W. "Prime Number." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/PrimeNumber.html | |cite=Weisstein, Eric W. "Prime Number." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/PrimeNumber.html | ||
− | |napomena=More concisely, a prime number $p$ is a positive integer having exactly one positive divisor other than $1$. For example, the only divisors of $13$ are $1$ and $13$, making $13$ a prime number, while the number $24$ has divisors $1$, $2$, $3$, $4$, | + | |napomena=More concisely, a prime number $p$ is a positive integer having exactly one positive divisor other than $1$. For example, the only divisors of $13$ are $1$ and $13$, making $13$ a prime number, while the number $24$ has divisors $1$, $2$, $3$, $4$, $6$, $8$, $12$, and $24$ (corresponding to the factorization $24=2^3\cdot 3$), making $24$ not a prime number. Positive integers other than $1$ which are not prime are called composite numbers. |
|see_also=Almost Prime, Composite Number, Divisor, Full Reptend Prime, Good Prime, Home Prime, Irregular Prime, Primary, Prime Counting Function, Prime Factorization Algorithms, Prime Formulas, Prime Number Theorem, Prime Power Symbol, Prime Products, Prime Sums, Primorial, Probable Prime, Pseudoprime, Regular Prime, Semiprime, Smooth Number, Titanic Prime, Truncatable Prime, Twin Primes}} | |see_also=Almost Prime, Composite Number, Divisor, Full Reptend Prime, Good Prime, Home Prime, Irregular Prime, Primary, Prime Counting Function, Prime Factorization Algorithms, Prime Formulas, Prime Number Theorem, Prime Power Symbol, Prime Products, Prime Sums, Primorial, Probable Prime, Pseudoprime, Regular Prime, Semiprime, Smooth Number, Titanic Prime, Truncatable Prime, Twin Primes}} |
Trenutačna izmjena od 13:36, 7. veljače 2015.
Definicija: prirodni broj koji se ne može napisati kao umnožak dvaju prirodnih brojeva manjih od toga broja
Dopušteni nazivi: prim broj
Suprotnica: složeni broj
Engleske istovrijednice: prime number
Struna ID: 30063
Obrađivač: Pavle Goldstein
Faza obrade: zaključaj naziv
Vrsta riječi: imenica Rod: muški Broj: jednina
Cilj projekta "Hrvatsko nazivlje u matematici" je na jednom mjestu prikupiti i obraditi sve hrvatske nazive koji na izravan ili neizravan način imaju veze s matematikom. Ako želite na bilo koji način doprinijeti ostvarenju ciljeva ovog projekta, molim javite se voditelju projekta na adresu goran.igaly@math.hr
WMW naziv: prime number
WMW klasifikacija: Number Theory > Prime Numbers > Prime Number Properties >
WMW definicija: A prime number (or prime integer, often simply called a "prime" for short) is a positive integer \(p>1\) that has no positive integer divisors other than $1\( and \)p\( itself. '''WMW napomena:''' More concisely, a prime number \)p\( is a positive integer having exactly one positive divisor other than $1\). For example, the only divisors of $13\( are $1\) and $13\(, making $13\) a prime number, while the number $24\( has divisors $1\), $2\(, $3\), $4\(, \)6\(, \)8\(, $12\), and $24\( (corresponding to the factorization $24=2^3\cdot 3\)), making $24\( not a prime number. Positive integers other than $1\) which are not prime are called composite numbers.
WMW See also: Almost Prime, Composite Number, Divisor, Full Reptend Prime, Good Prime, Home Prime, Irregular Prime, Primary, Prime Counting Function, Prime Factorization Algorithms, Prime Formulas, Prime Number Theorem, Prime Power Symbol, Prime Products, Prime Sums, Primorial, Probable Prime, Pseudoprime, Regular Prime, Semiprime, Smooth Number, Titanic Prime, Truncatable Prime, Twin Primes
Izvor: Weisstein, Eric W. "Prime Number." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/PrimeNumber.html
Struna ID: 30063