Suppose that two qubits are prepared in the entangled state |Φ ⟩AB, |Φ ⟩AB = √1 (|00⟩AB |11⟩AB). Show that multiplying qubit A by an operator M is exactly the same as multiplying qubit B by the operator MT (where the MT is the transpose of the matrix M). That is, show that (MâΔI)|Φ ⟩AB =(IâΔMT)|Φ ⟩AB for any 2×2 operator M.