primitive polynomial मीनिंग इन हिंदी

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An irreducible element in is either an irreducible element in or an irreducible primitive polynomial.
If is not, it is a primitive polynomial ( because it is irreducible ).
A consequence is that factoring polynomials over the rationals is equivalent to factoring primitive polynomials over the integers.
This defines a factorization of " p " into the product of an integer and a primitive polynomial.
That lemma says that if the polynomial factors in, then it also factors in as a product of primitive polynomials.
This implies that a primitive polynomial is irreducible over the rationals if and only if it is irreducible over the integers.
If " R " is a GCD domain, then the set of primitive polynomials in is closed under multiplication.
Over a unique factorization domain the same theorem is true, but is more accurately formulated by using the notion of primitive polynomial.
A primitive polynomial is a polynomial over a unique factorization domain, such that 1 is a greatest common divisor of its coefficients.
A primitive polynomial must have a non-zero constant term, for otherwise it will be divisible by " x ".