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eringoose274Lv1
6 Nov 2019
please explain.
Define/explain the following terms, and give a short example and non-example for each: Vector space, subspace, additive closure, additive identity, additive inverse, commutative property, associative property, distributive property, inherited properties, span of a set. True/False: Explain why the statement is true, or give a specific counter-example: Multiplication of vectors is defined for any vector space. We can divide by vectors in any vector space. We can subtract a vector in any vector space. If + = , then = - . A vector space must have a but might not have a . Any linear combination of two vectors from a subspace stays in that subspace. Show transcribed image text
please explain.
Define/explain the following terms, and give a short example and non-example for each: Vector space, subspace, additive closure, additive identity, additive inverse, commutative property, associative property, distributive property, inherited properties, span of a set. True/False: Explain why the statement is true, or give a specific counter-example: Multiplication of vectors is defined for any vector space. We can divide by vectors in any vector space. We can subtract a vector in any vector space. If + = , then = - . A vector space must have a but might not have a . Any linear combination of two vectors from a subspace stays in that subspace.
Show transcribed image text Beverley SmithLv2
6 Mar 2019