Out of 800 boys in a school, 224 played cricket, 240 played hockey and 336 played basketball. Of the total, 64 played both basketball and hockey; 80 played cricket and basketball and 40 played cricket and hockey; 24 played all the three games. The number of boys who did not play any game is

Out of 1000 boys in a college, 220 played cricket, 250 played hockey and 350 played basketball. Of the total 80 played both basketball and hockey, 100 played cricket and basketball and 50 played cricket and hockey, 30 played all three games. The number of boys who play atleast one game is :

Out of 1000 boys in a school, 300 played cricket, 380 played hockey and 420 played basketball. Of the total, 120 played both basketball and hockey,100 played cricket and basketball, 70 played cricket and hockey and 56 played all the three games. If the probability of the number of boys who did not play any game is k, then 200k is equal to

Out of 800 students in a school ,125 played cricket , 220 played football and 300 played hockey of the total, 28 played both hockey and football , 70 played cricket and football and 32 played cricket and hockey, 26 played all the three games . What is the number of students who did not play any game?

In a group of players in a college,20 are in the basketball team,24 in the hockey team and 27 in the cricket team.If 12 play hockey and basketball,10 play cricket and basketball,14 play hockey and cricket and 7 play all the three games,then the total number of players in the group is (a) 42 (b) 43 (c) 45 (d) 49

Out of four friends A, B, C and D, A and B play football and cricket, B and C play cricket and hockey, A and D play basketball and football, C and D play hockey and basketball Who plays football, basketbal and hockey?

In a group of 200 students, 20 played cricket only, 36 plated tennis only, 40 played, hockey only, 8 played cricket and tennis, 20 played cricket and hockey, 28 played hockey and tennis and 80 played hockey. By Venn diagram, find the number of students who (i) played cricket (ii) played tennis (iii) did not played any of the above three games.