In a three-circle Venn diagram, you are comparing three things. The central space, where all three circles overlap, contains characteristics that all three things have. The spaces where only two circles overlap contains characteristics that those two things share, but do not have in common with the third thing. And the spaces where there is no overlap are reserved for characteristics that describe only the one thing, and neither of the two others.
I can't draw a venn diagram, but this will be close. 2 in the left circle, 24 in the intersection (the gcf), and 3 in the right circle. (2(24)3)=144 which is the LCM.
Using a Venn diagram for this problem is overkill, since 6 is a multiple of 3 and will automatically be the LCM of this problem. But if you insist... Put a 3 in the left circle and put a 6 in the space where the two circles intersect.
If you mean a Venn diagram, put 8 and 24 in the left circle, 9, 18 and 36 in the right circle, and 1, 2, 3, 4, 6, 12 in the space where they intersect.
yes
A venn diagram with 2 circles is comparing and contrasting two things while a venn diagram with three circles is comparing and contrasting two things to the same one subject instead of with each other.
There are more than 3 categories.
Put 2, 6, 14 and 42 in the right circle, put 1, 3, 7 and 21 in the space where the circles intersect.
Put 4, 8, 16 and 32 in the left circle. Put 3, 6, 9, 18, 27 and 54 in the right circle. Put 1 and 2 in the space where they intersect.
Draw three circles that touch in a shape of a circle. Draw two small circles in each big one and another in the intersection. It is supposed to be a Venn Diagram.
Draw a Venn diagram. Let circle 1 be the factors of 30, circle 2 be the factors of 40 and circle 3 be the factors of 48. Put the numbers 5 and 10 in the space where 1 and 2 intersect. Put the numbers 4 and 8 in the space where 2 and 3 intersect. Put the numbers 3 and 6 in the space where 1 and 3 intersect. Put the numbers 1 and 2 in the space where all three intersect. That leaves 15 and 30 in Circle 1, 20 and 40 in circle 2 and 12, 16, 24, 48 in circle 3. The GCF is 2.
Given the following Venn diagram, choose the correct set for .
A picture of a Venn diagram is in the related links. They are useful because they help you map out problems such as "If there are 3 students in math, 5 students in science and 6 students in total, how many are in both math and science?" To this, you can use the Venn diagram to reason that since there seem to be 8 students in total if math and science are separate, there must be 2 students in both classes.