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Easy intro questions to be done when the students have seen the \"vector space axioms\" but not as axioms, just in the context of \\(\\mathbb{R}^n\\).

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give the negative of each of two vectors. One always has 5 entries, the other has a random number of entries.

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Let \\(u=\\var{u}\\) and \\(v=\\var{v}\\). Give the negatives of these vectors below.

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The negative of a vector just has the negative number in each entry.

\n

a) \\(-v=-\\var{v}=\\var{-v}\\)

\n

b) \\(-u=-\\var{u}=\\var{-u}\\)

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The negative of \\(v\\) is \\(-v = \\) [[0]]

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The negative of \\(u\\) is \\(-u = \\) [[0]]

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Simple scalar multiplication of a general vector with the important scalars 0, 1, -1. Just the variable name is randomised.

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Given any vector \\(\\var{v}\\in \\mathbb{R}^n\\):

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You can see the answers revealed above.

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Determine \\(0\\cdot \\var{v} = \\) [[0]]

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Determine \\(1\\cdot \\var{v} = \\) [[0]]

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Determine \\((-1)\\cdot \\var{v} = \\) [[0]]

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These are two questions to get you started on the vectorspace \\(\\mathbb{R}^n\\). If you don't find them fairly straightforward, you need to go over previous material again: in particular, vector addition and scalar multiplication.

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