Question: Let V = R. For u, v E V and a E R define vector addition by u # v := u + U -

Let V = R. For u, v E V and a E R define vector addition by u # v := u + U - 1 and scalar multiplication by a Du := au - a + 1. It can be shown that (), #, [) is a vector space over R. Find the following:the sum: 5 the scalar multiple: -905 the zero vector: V the additive inverse of x: Ex

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