Question: Section 3.1 Vector Spaces: Problem 6 (1 point) Let V = R2. For (u1, u2), (v1, v2) E V and a E IR define vector

Section 3.1 Vector Spaces: Problem 6 (1 point) Let V = R2. For (u1, u2), (v1, v2) E V and a E IR define vector addition by (u1, (2) E (v1, V2) := (u1 + v1 - 3, u2 + v2 + 2) and scalar multiplication by a (u1, u2) := (au1 - 3a + 3, au2 + 2a - 2). It can be shown that (V, E, ) is a vector space over the scalar field . Find the following: the sum: (6, 4) EH (-4, -4) the scalar multiple: -6 0 (6,4)=. the zero vector: Ov = the additive inverse of (x, y): B(x, y) =0O redit on this

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