Abstract: A ring R is called a left ML-ring if a or 1-a is left morphic for every a∈R.Left morphic rings and local rings are left ML-rings but conversely is not true.Let R i(i∈I) be rings.It is shown that ∏ i∈I R i is a left ML-ring if and only if there exists i 0 ∈I such that R i 0 is a left ML-ring and for each i∈I- i 0 ,R i is a left morphic ring.Moreover,if n≥2 and n = ∏ s i = 1 p r i i is a prime power decomposition of n,then Z n ∝Z n is a left ML-ring if and only if r i 1 for at most one valu...