Given u=⟨−1,2,0⟩\mathbf{u} = \langle -1, 2, 0 \rangleu=⟨−1,2,0⟩ and v=⟨2,1,3⟩\mathbf{v} = \langle 2, 1, 3 \ranglev=⟨2,1,3⟩, find u×v\mathbf{u} \times \mathbf{v}u×v.
⟨6,3,−5⟩\langle 6, 3, -5 \rangle⟨6,3,−5⟩
⟨−6,−3,5⟩\langle -6, -3, 5 \rangle⟨−6,−3,5⟩
⟨6,−3,−5⟩\langle 6, -3, -5 \rangle⟨6,−3,−5⟩
⟨−6,3,5⟩\langle -6, 3, 5 \rangle⟨−6,3,5⟩