There are 500 students in a school 220 like science subject 180 like maths and 40 like both maths and science. find tge number of students who like science but not maths
Answers
The number of students who like science but not math is 180.
Step-by-step explanation:
We are given that there are 500 students in a school 220 like science subject 180 like math and 40 like both math and science.
Let the number of students who like science subject = n(S) = 220
Number of students who like math subject = n(M) = 180
Number of students who like both math and science subject = n() = 40
Now, it is given that the number of students who like science subject is 220 but among these students there must be some students who like math also.
And the number of students who like both math and science is 40.
This means that if we subtract those students who like both science and math from the given number of students who like science subject, then we will get those students who like science but not math.
SO, number of students who like science but not math = n(S) - n()
= 220 - 40
= 180 students.
Answer:
Step-by-step explanation:
There are 500 students in the school.
220 students like science subject.
180 students like math subject.
40 students like both science and math.
To find the number of students who like:
• Science but not math: we can use the following equation: (Number of students who like science) - (Number of students who like both science and math) = 220 - 40 = 180
• Math but not science: we can use the following equation: (Number of students who like math) - (Number of students who like both math and science) = 180 - 40 = 140
• Either math or science: we can use the following equation: (Number of students who like math) + (Number of students who like science) - (Number of students who like both math and science) = 180 + 220 - 40 = 360