| 1. | MMH uses single precision scalar products as its most basic operation.
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| 2. | A positive semi-definite scalar product has a signature, where.
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| 3. | (the dot represents the scalar product of the two vectors ).
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| 4. | If it holds, the scalar product is defined by the polarization identity:
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| 5. | This formula does not explicitly depend on the definition of the scalar product.
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| 6. | A negative definite scalar product has the signature.
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| 7. | Where the same calculation is expressed in terms of vector scalar product and magnitude.
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| 8. | A vector space equipped with a scalar product is called an inner product space.
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| 9. | For this reason, not every scalar product space is a normed vector space.
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| 10. | With N B and N G being the molarities 1-column scalar product.
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