Provide an explanation
Let V be the set of all ordered pairs of real numbers (u u2 ith u2 0. Consider the following addition and scalar multiplication operations on u (u1. un) and v (v1. vr (u1 v 1,4u2v2) v se the above operations for the following parts (a) Compute u v for u (8, 1) and v (-8, 8). (b) If the set V satisfies Axiom 4 of a vector space the existence of a zero vector what would be the zero vector (c) If u (-2,2), what would be the negative of the vector u referred to in Axiom 5 of a vector space? Don't forget to use your answer to part (b) here!)
la-bl satisfies la-bl
? suppose to be ε