<P> In other words: the matrix product is the description in coordinates of the composition of linear functions . </P> <P> Given two finite dimensional vector spaces V and W, the tensor product of them can be defined as a (2, 0) - tensor satisfying: </P> <Dl> <Dd> V ⊗ W (v, m) = V (v) W (w), ∀ v ∈ V ∗, ∀ w ∈ W ∗, (\ displaystyle V \ otimes W (v, m) = V (v) W (w), \ forall v \ in V ^ (*), \ forall w \ in W ^ (*),) </Dd> </Dl> <Dd> V ⊗ W (v, m) = V (v) W (w), ∀ v ∈ V ∗, ∀ w ∈ W ∗, (\ displaystyle V \ otimes W (v, m) = V (v) W (w), \ forall v \ in V ^ (*), \ forall w \ in W ^ (*),) </Dd>

What is the product of the numbers from 1 to 5