Web7. In a class of 35 students 17 have taken Mathematics, 10 have taken Mathematics but not Economics. Find the number of students who have taken both Mathematics and Economics and the number of students who have taken Economics but not Mathematics, if it is given that each student has taken either Mathematics or Economics or both. ( Ans. 7, 18 ) 8. WebJun 7, 2014 · In a class of 35 students, 17 have taken maths, 10 have taken maths but not economics. Find the number of students who have taken both maths and economics and …
In a class of 35 students, 17 have taken maths, 10 have taken …
WebApr 20, 2024 · Step-by-step explanation: Total Math: 17 students Math without economics: 10 Math and economics: 17-10=7 students Who took economics without math: 35-17=18 students. The number of students who have taken both Mathematics and Economics is 7 and the number of students who have taken Economics but not Mathematics is 18. WebMay 31, 2016 · Expert-Verified Answer. 60 people found it helpful. santy2. The students taking mathematics are 17. That means there are 18 students (35-17) who are not taking … bitscape review
5. In a class of 35 students, 17 have taken Mathem - Gauthmath
WebQ.2) In a class of 35 students 17 have taken mathematics, 10 have taken mathematics but not economics. Find the number of students who have taken economics but not n mathematics, if it is given that each student has taken either maths or economics or both. Sol.2) Let A → set of students taken mathematics Web3. In a class of 35 students, 17 have taken mathematics, 10 have taken mathematics but not physics. Find the number of students who have taken both mathematics and physics and the number of students who have taken physics but not mathematics, if it is given that each student has taken either mathematics or physics or both. WebIf each student has taken atleast one subject, find the number of students who have taken i) Biology but not Mathematics ii) Both mathematics and biology Medium Solution Verified by Toppr class = 25 T=M+B+B where M = students taken maths only B = students taken Biology only B = students taken both. 8 = maths only (M) 12=M+B ∴M+B−M=B=12−8=4 bits carte