Read the passage below and solve these questions based on it:
There are 120 players, having a chest number 1 through 120, seated in a circular pattern in the same order. Since the selector is involved in game fixing, he tries to ensure that none of the right candidate for right game should go. For this to happen, he starts selecting the players in a very arbitrary way for four games namely shot-put, javelin throw, discus throw and sprint: Player numbered 1 is selected for sprint and after that, every 11th player is selected for sprint. The counting continues around the circle repeatedly until it ends at player number 1. Similarly, starting with player number 1, every 9th player is selected for shot–put, every 7th player for javelin throw and every 8th player for discus throw.
How many players are not selected for any of the four events?