In an summer camp there are a total of 28 students out of which 7 play hockey, 32 students play tennis and 5 students play neither tennis nor hockey. How many student plays both hockey and tennis?
(7 - x) + x + (32 - x) + 5 = 28 44 - x = 28 -x = -16 x = 16
(7 - x) + x + (32 - x) + 5 = 28
44 - x = 28
-x = -16
x = 16
1297 MCQ for effective preparation of the test of Overlapping Sets of Word Problems section.
Read the MCQ statement: In an summer camp there are a total of 28 students out of which 7 play hockey, 32 students play tennis and 5 students play neither tennis nor hockey. .... h hockey and tennis?, keenly and apply the method you have learn through the video lessons for Overlapping Sets to give the answer. Record your answer and check its correct answer and video explanation for MCQ No. 329-13096.