Let A and B be two prime �-rings. Let � : A ! B be a bijective and satisfies �(A •� P •� P) = �(A) •� �(P) •� �(P), for all A 2 A and P 2 {I, P1, I − P1} where P1 is a projection in A. The operation •� between two arbitrary elements S and T in A is defined as S •� T = ST +�TS� for � 2 {−1, 1}. Then, if �(I) is projection, we show that � is additive.
