Let hh be the set of all points in the second quadrant in the plane v=ℝ2v=r2. that is, h={(x,y)∣x≤0,y≥0}h={(x,y)∣x≤0,y≥0}. is hh a subspace of the vector space vv?
No, [tex]H[/tex] is not a subspace of [tex]V[/tex]. A simple counter-example to the contrary: let [tex]h\in H[/tex] with [tex]h=(-1,0)[/tex]. However, scaling by -1 gives the vector [tex]-h=(1,0)[/tex] and [tex]-h\not\in H[/tex].
