Asked by Frank
in a class of 80 students,40 study physics, 48 study mathematics and 4 4 study chemistry. 20 study physics and mathematics. 24 study physics and chemistry and 32 study only two of the three subjects. if every student studies at least one of the three subjects, find
1 . the number of students who study all the three subjects.
2 . the number of students who study only mathematics and chemistry?
1 . the number of students who study all the three subjects.
2 . the number of students who study only mathematics and chemistry?
Answers
Answered by
Frank
I need solution for the question.
Answered by
mathhelper
If you are studying this topic , you must have learned about Venn diagrams.
Draw 3 overlapping circles.
label the intersection of all 3 as x
low look at the double courses
e.g. 20 study physics and math. That would be the intersection of
the physics and the math circles, which already contains an x
So label the part of physics and math but not chemistry as 20-x
continue likewise for the rest of the data.
You should have all the regions filled in.
Answers can now be written by simply looking at these regions.
Draw 3 overlapping circles.
label the intersection of all 3 as x
low look at the double courses
e.g. 20 study physics and math. That would be the intersection of
the physics and the math circles, which already contains an x
So label the part of physics and math but not chemistry as 20-x
continue likewise for the rest of the data.
You should have all the regions filled in.
Answers can now be written by simply looking at these regions.
Answered by
joebama
use calculator much faster than using this forum
unless you're trying to figure out how to do somehting
unless you're trying to figure out how to do somehting
Answered by
MIchel
i think icant do it
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