Which property correctly defines the determinant of a product?
det(AB)=det(A)+det(B)\det(AB) = \det(A) + \det(B)det(AB)=det(A)+det(B)
det(AB)=det(A)⋅det(B)\det(AB) = \det(A) \cdot \det(B)det(AB)=det(A)⋅det(B)
det(AB)=det(B)/det(A)\det(AB) = \det(B) / \det(A)det(AB)=det(B)/det(A)
det(AB)=∣det(A)∣⋅∣det(B)∣\det(AB) = |\det(A)| \cdot |\det(B)|det(AB)=∣det(A)∣⋅∣det(B)∣