(1 point) Let V be the set of vectors in R with the following definition of addition and scalar multiplication Addition r1 x1 Scalar Multiplication: αΠDetermine which of the Vector Space Axioms are satisfied A1 . xç°y = yç° for any x and y in V A2. (xç°y)ç°z 9(yç°z) for any x, y and z in V A3. There exists an element 0V in V such that xç°0V= x for each x E V A4. For each x E V, there exists an element-x in V such that xç°(-x) = 0V AS, α Î (xç°y) = (α O x)ç°(α O y) for each scalar α and any x and y V A6. (α β) Î x-(α O x) (JO x) for any scalars α and β and any x e V A7. (αβ) Î x-αã(JO x) for any scalars α and β and any x E V A8. l Ox = x for all x E V