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• Reciprocal_polynomial abstract "In the mathematical area of algebra, given a polynomial p with coefficients from an arbitrary field such as:we define the reciprocal polynomial, p* by:Essentially, the coefficients are written in reverse order.In the special case that the polynomial p has complex coefficients, that is,the conjugate reciprocal polynomial, p* given by,where denotes the complex conjugate of , is called the reciprocal polynomial when no confusion can arise.A polynomial is called self-reciprocal if .The coefficients of a self-reciprocal polynomial satisfy ai = an−i, and in this case p is also called a palindromic polynomial. In the conjugate reciprocal case, the coefficients must be real to satisfy the condition.".
• Reciprocal_polynomial wikiPageExternalLink ReciprocalPolynomial.html.
• Reciprocal_polynomial wikiPageID "1106042".
• Reciprocal_polynomial wikiPageRevisionID "596386267".
• Reciprocal_polynomial hasPhotoCollection Reciprocal_polynomial.
• Reciprocal_polynomial subject Category:Polynomials.
• Reciprocal_polynomial type Abstraction100002137.
• Reciprocal_polynomial type Function113783816.
• Reciprocal_polynomial type MathematicalRelation113783581.
• Reciprocal_polynomial type Polynomial105861855.
• Reciprocal_polynomial type Polynomials.
• Reciprocal_polynomial type Relation100031921.
• Reciprocal_polynomial comment "In the mathematical area of algebra, given a polynomial p with coefficients from an arbitrary field such as:we define the reciprocal polynomial, p* by:Essentially, the coefficients are written in reverse order.In the special case that the polynomial p has complex coefficients, that is,the conjugate reciprocal polynomial, p* given by,where denotes the complex conjugate of , is called the reciprocal polynomial when no confusion can arise.A polynomial is called self-reciprocal if .The coefficients of a self-reciprocal polynomial satisfy ai = an−i, and in this case p is also called a palindromic polynomial. ".
• Reciprocal_polynomial label "Polinomio recíproco".
• Reciprocal_polynomial label "Polynôme réciproque".
• Reciprocal_polynomial label "Reciprocal polynomial".
• Reciprocal_polynomial label "Reziprokes Polynom".
• Reciprocal_polynomial sameAs Reciproký_polynom.
• Reciprocal_polynomial sameAs Reziprokes_Polynom.
• Reciprocal_polynomial sameAs Polinomio_recíproco.
• Reciprocal_polynomial sameAs Polynôme_réciproque.
• Reciprocal_polynomial sameAs m.046gw0.
• Reciprocal_polynomial sameAs Q1422356.
• Reciprocal_polynomial sameAs Q1422356.
• Reciprocal_polynomial sameAs Reciprocal_polynomial.
• Reciprocal_polynomial wasDerivedFrom Reciprocal_polynomial?oldid=596386267.
• Reciprocal_polynomial isPrimaryTopicOf Reciprocal_polynomial.