the circles do not overlap at all.
Draw a circle on paper. Then draw a bazillion more circles, all the same exact size as the first circle, and stack all of them up in a stack on top of the first circle.
The question, as posed, makes little sense. All that they would find is the points of intersection of the circles! The question says nothing about the sizes of the circles - whether they are the same or whether they represent some measure of seismic transmissivity of the earth near (under) them.
Do a prime factorization of each number. Draw 3 overlapping circles. Place the factors into each circle: note: some will go into the overlapping sections of the circles. All those numbers in the overlapping section of ALL circles will form the GCF. Multiply those in that overlapping section and that equals the GCF.
Because all circles are similar.
step 1- draw a circle at the top. step 2- draw a circle at the bottom. step 3-draw two circles at the left and right of the top and bottom circles. step 4-draw a black circle in the middle of all those circles. small tip- you're better to do those 4 circles in red or orange.
You draw a rectangle for the universe of all things in your set and then you draw circles inside the rectangle for each set. If the sets have a non-zero intersections, than you draw and overlap of the circles to show that. So the venn diagram consists of overlapping circles. The combined area of the circles is the union. By the universe, I mean all possible things that you are dealing with. For example, If you are looking at a school, that would be the universe. Maybe one set is students taking chemistry and one is students taking math. Those are two circles. They probably overlap and the overlap is the intersection. The union is the students taking both. The rectangle represents all students in the school.
the circles do not overlap at all.
The circumference of all the five circles should pass through a common point. It will looks like a sunflower.
Without speaking to that baby, I believe that the baby saw a page at some time in his young life and liked what he saw, so the baby draws the circles in each corner, prior to drawing more on the page - OR - the baby loves circles. After all, it is one of the basic shapes in our universe.
He wants to draw your attention to himself.
To draw a liquid, depict particles that are close together but can move past each other. For a solid, show particles tightly packed in a regular pattern. To draw a gas, illustrate particles that are far apart and move freely in all directions.
Draw a circle on paper. Then draw a bazillion more circles, all the same exact size as the first circle, and stack all of them up in a stack on top of the first circle.
The question, as posed, makes little sense. All that they would find is the points of intersection of the circles! The question says nothing about the sizes of the circles - whether they are the same or whether they represent some measure of seismic transmissivity of the earth near (under) them.
you draw 2 over lapping circles. then 2 lines ontop of them verticly 3 inches away, 8 inches long then draw a semi circle ontop of them. then show your parents and say "LOOK WHAT I DREW!"
Keep compass the same size. Draw circle one. Draw circle two with the center on the edge of circle one. Draw circle three centered on one of the points of intersection between circle one and two. Now the area in between the all three circles where the points of circles intersect should join to make an equalateral triangle. Connect with your straight edge.
Do a prime factorization of each number. Draw 3 overlapping circles. Place the factors into each circle: note: some will go into the overlapping sections of the circles. All those numbers in the overlapping section of ALL circles will form the GCF. Multiply those in that overlapping section and that equals the GCF.