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- Polarization_identity abstract "In mathematics, the polarization identity is any one of a family of formulas that express the inner product of two vectors in terms of the norm of a normed vector space. Let denote the norm of vector x and the inner product of vectors x and y. Then the underlying theorem, attributed to Fréchet, von Neumann and Jordan, is stated as:In a normed space (V, ), if the parallelogram law holds, then there is an inner product on V such that for all .".
- Polarization_identity thumbnail Parallelogram_law.PNG?width=300.
- Polarization_identity wikiPageID "2047965".
- Polarization_identity wikiPageRevisionID "602397080".
- Polarization_identity hasPhotoCollection Polarization_identity.
- Polarization_identity subject Category:Abstract_algebra.
- Polarization_identity subject Category:Functional_analysis.
- Polarization_identity subject Category:Linear_algebra.
- Polarization_identity subject Category:Mathematical_identities.
- Polarization_identity subject Category:Norms_(mathematics).
- Polarization_identity subject Category:Vectors.
- Polarization_identity type Abstraction100002137.
- Polarization_identity type Attribute100024264.
- Polarization_identity type Cognition100023271.
- Polarization_identity type Concept105835747.
- Polarization_identity type Content105809192.
- Polarization_identity type Idea105833840.
- Polarization_identity type Identity104618070.
- Polarization_identity type MathematicalIdentities.
- Polarization_identity type Personality104617562.
- Polarization_identity type PsychologicalFeature100023100.
- Polarization_identity type Quantity105855125.
- Polarization_identity type Variable105857459.
- Polarization_identity type Vector105864577.
- Polarization_identity type Vectors.
- Polarization_identity comment "In mathematics, the polarization identity is any one of a family of formulas that express the inner product of two vectors in terms of the norm of a normed vector space. Let denote the norm of vector x and the inner product of vectors x and y. Then the underlying theorem, attributed to Fréchet, von Neumann and Jordan, is stated as:In a normed space (V, ), if the parallelogram law holds, then there is an inner product on V such that for all .".
- Polarization_identity label "Identité de polarisation".
- Polarization_identity label "Polarisationsformel".
- Polarization_identity label "Polarization identity".
- Polarization_identity label "Tożsamość polaryzacyjna".
- Polarization_identity sameAs Polarisationsformel.
- Polarization_identity sameAs Identité_de_polarisation.
- Polarization_identity sameAs Tożsamość_polaryzacyjna.
- Polarization_identity sameAs m.06hgk8.
- Polarization_identity sameAs Q1817177.
- Polarization_identity sameAs Q1817177.
- Polarization_identity sameAs Polarization_identity.
- Polarization_identity wasDerivedFrom Polarization_identity?oldid=602397080.
- Polarization_identity depiction Parallelogram_law.PNG.
- Polarization_identity isPrimaryTopicOf Polarization_identity.