The vectors i=⟨1,0,0⟩\mathbf{i} = \langle 1,0,0 \ranglei=⟨1,0,0⟩, j=⟨0,1,0⟩\mathbf{j} = \langle 0,1,0 \ranglej=⟨0,1,0⟩, k=⟨0,0,1⟩\mathbf{k} = \langle 0,0,1 \ranglek=⟨0,0,1⟩ form a basis for R3\mathbb{R}^3R3. What is i×k\mathbf{i} \times \mathbf{k}i×k?
j\mathbf{j}j
−j-\mathbf{j}−j
k\mathbf{k}k
0\mathbf{0}0