Retry queues have been extensively studied in different contexts by various researches. Pioneering work on reprocess queues can be found in the work of Purohit et al (2005) and the survey papers of Arteljo (2000) Choi et al. (1992) considered an M/M/1 repeat queue system in which the repeat time has a general distribution and only the customer at the head of the queue is allowed to retry for the service. Since then there has been rapid growth in the literature on retrial queues. Armero et al. (1998) deals with the statistical analysis of block arrival queues. The focus of this investigation is on the usual measures of system performance in equilibrium. Rajagopalan et.al (2000) studied the stochastic modeling of a large class of finite repeat queue systems in a Markovian environment. Artalejo et al. (2000) considered single-server retry queues with bidirectional communication. In this investigation, the incoming calls are served at an illegal rate and the service is followed by an exponential rate and if the calls find the server busy, they join the retry orbit. Furthermore, he obtained asymptotic formulas for the joint stationary distribution and factorial moments. Purohit et al. (2005) analyze an M/M/1 retry queue with a constant retry rate, an unreliable server, and threshold-based recovery with state-dependent arrival rates. Any incoming client that finds the server busy enters the orbit of the new process. The retry policy is assumed to be independent of the number of customers in the orbit. The retry policy is assumed to be independent of the number of customers in the orbit. The retry policy is assumed to be independent of the number of customers in the orbit. In this active analysis that follows... half of the article... and Bhargava(2008): Bulk Arrival Retrial Queue with Unreliable Server and Priority Subscribers, International Journal of Operational Research, vol. 5, No 4, 242-259(2008)Gomez,Coural, Antonio(1999): Stochastic analysis of a retry queue on a single server with general retry times, Naval Research Logistics (NRL)46(5), pp 561 -581. ISSN 0894-069 (2012): M/M/1 new process queue with work holiday interruption under policy N, Cambridge Journal, vol.46, no.4, pp. 355-371. Artelejo, JR (1999 a): A classic bibliography of research on new process queuing, mathematics. Calculate. Model, vol. 30, pp 1-6Kumar, Raja (2006): On the tail of multiserver feedback retry with balking and control retry rate, Ann oper res(2006), 141:211-232.