(1 point) Let V = R². For (₁, ₂), (1, ₂) EV and a ER define vector addition by (₁, 2) (₁,₂)=(1+1-3, ₂+¹+3) and scalar mu

Post by **answerhappygod** » Wed Jul 06, 2022 11:50 am

: 1 Point Let V R For 1 Ev And A Er Define Vector Addition By 2 1 1 3 3 And Scalar Mu 1 (27.35 KiB) Viewed 9 times

(1 point) Let V = R². For (₁, ₂), (1, ₂) EV and a ER define vector addition by (₁, 2) (₁,₂)=(1+1-3, ₂+¹+3) and scalar multiplication by a (₁, ₂):= (au₁-3a +3, au₂ +3a-3). It can be shown that (V, BB, EI) is a vector space over the scalar field R. Find the following the sum (8,3) (-5,-8)=( the scalar multiple: -8E (8,3)-( the zero vector Oy ( the additive inverse of (x, y): El(x, y)=(