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Thus, we deduce that (P+ Q)² > 4PQ. (28) difference equation bxn-k Xn+1 = Axn+ Bxn-k+Cxr-1+Dxn-o+ [dxn-k- exp-1] (1) n = 0, 1,2, ... where the coefficients A, B, C, D, b, d, e E (0,), while k,1 and o are positive integers. The initial conditions X-o,..., X_1,..., X_k, ….., X_1, Xo are arbitrary positive real numbers such that k<1< 0. Note that the special cases of Eq.(1) have been studied in [1] when B=C= D=0, and k= 0,1= 1, b is replaced by B=C=D=0, and k= 0, b is replaced by – b and in [33] when B = C = D = 0, 1 = 0 and in [32] when A= C= D=0, 1=0, b is replaced by – b. ••.) – b and in [27] when 6.

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Theorem 11.If 1,0 are even and k is odd positive integers, then Eq.(1) has prime period two solution if the condition (A+C+D) (3e– d) < (e+d) (1– B), (34) is valid, provided B< 1 and d (1– B) – e (A+C+D) > | 0. Proof.If 1,0 are even and k is odd positive integers, then Xn = Xn-1= Xn-o and xŋ+1 = Xn-k. that It follows from Eq. (1) БР P=(A+C+D)Q+BP (35) (e Q– dP)' and bQ Q= (A+C+D)P+BQ – (36) (еР — dQ) Consequently, we get b P+Q= (37) [d (1– B) – e (A+C+D)]' where d (1- B) – e (A+C+D) > 0, e b (A+C+D) PQ= (38) (e+d) [(1 – B) + K3] [d (1 – B) – e K3]? - (A+C+ D), provided B< 1. Substituting where K3 (37) and (38) into (28), we get the condition (34). Thus, the proof is now completed.O