| 1. | Vectors can be added to other vectors according to vector algebra.
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| 2. | The inner and exterior products are associated with familiar concepts from standard vector algebra.
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| 3. | The pragmatic temper of the times set aside the four-dimensional source of vector algebra.
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| 4. | There are several other examples where the use of vector algebra simplifies standard problems.
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| 5. | A generic approach using vector algebra for tracing of a boundary can be found at.
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| 6. | For the case of the and fields, the transformations cannot be obtained as directly using vector algebra.
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| 7. | Not only this, but Hamilton had in a sense invented the cross and dot products of vector algebra.
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| 8. | The formalism of "'dyadic algebra "'is an extension of vector algebra to include the dyadic product of vectors.
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| 9. | Vector algebra uses the cross product, while geometric algebra uses the exterior product ( and the geometric product ).
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| 10. | The addition here is the vector addition of vector algebra and the resulting velocity is usually represented in the form
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