Answer Happy

Let W be the set of all vectors of the form W = Span{u,v}. OA. W Span{s,t} B. W=s+t C. W Span{u,v} D. W=u+v 2t 5t 5s - 5t 3s Show that W is a subspace of R4 by finding vectors u and v such that Explain how this result shows that W is a subspace of R4. Choose the correct answer below. O A. Since s and t are in R and W = u + v, W is a subspace of R4 B. Sinces and t are in R and W = Span{u,v}, W is a subspace of R4. C. Since u and v are in R4 and W = u + v, W is a subspace of R4. O D. Since u and v are in R4 and W = Span{u,v}, W is a subspace of R4.