The are 420 learners on a school. 190 learners play soccer, 260 learners play cricket and 60 learners play both soccer and cricket. Draw a Venn diagram to represent this data

ok, now what?

Sure, here's a Venn diagram representing the data you gave:

⠀⠀⠀⠀⠀⠀⠀⚽⠀⠀⠀⠀🏏
⠀⠀⠀⠀⠀⠀⠀┏━━⚪━━━┓
⠀⠀⠀⠀⠀190┃⠀⠀⚫⠀⠀┃ 260
⠀⠀⠀⠀⠀⠀⠀┗━━┳⚫━━┛
⠀⠀⠀⠀⠀⠀⠀⠀⠀60

In this Venn diagram, the circle on the left represents the 190 learners who play soccer, the circle on the right represents the 260 learners who play cricket, and the overlap represents the 60 learners who play both soccer and cricket.

To draw a Venn diagram representing this data, follow these steps:

Step 1: Start by drawing a rectangle to represent the total number of learners in the school. Label this rectangle "Total Learners" or "School".

Step 2: Inside the rectangle, draw two overlapping circles. Label one circle "Soccer" and the other circle "Cricket".

Step 3: Fill in the number of learners who play soccer inside the Soccer circle. In this case, 190 learners play soccer.

Step 4: Fill in the number of learners who play cricket inside the Cricket circle. In this case, 260 learners play cricket.

Step 5: Fill in the overlapping region, where the two circles intersect, with the number of learners who play both soccer and cricket. In this case, 60 learners play both sports.

Step 6: Finally, label each section of the diagram with the respective number of learners.

The completed Venn diagram should have three sections: one for learners who only play soccer, one for learners who only play cricket, and one for learners who play both soccer and cricket.

To draw a Venn diagram representing the given data, follow these steps:

1. Start by drawing a rectangle to represent the universal set, which in this case is the total number of learners in the school. Label it "School" or "Total Learners."

2. Inside the rectangle, draw two overlapping circles to represent the two sports, soccer and cricket. Label one circle "Soccer" and the other "Cricket."

3. To fill in each circle, use the given data. Since 190 learners play soccer and 60 learners play both soccer and cricket, subtract the overlap from the total number of soccer players. Therefore, the soccer circle should show 190 - 60 = 130 learners exclusive to soccer.

4. Similarly, since 260 learners play cricket and 60 learners play both soccer and cricket, subtract the overlap from the total number of cricket players. Therefore, the cricket circle should show 260 - 60 = 200 learners exclusive to cricket.

5. Finally, the overlap region in the middle of the two circles represents the number of learners who play both soccer and cricket, which is 60 according to the given data.

The Venn diagram should now be complete, accurately depicting the number of learners playing soccer, cricket, and both.