I want to check this problem also;
An elctronics store surveyed every 7th customer who came into the store for a week. Of the 350 people who responded
144 poeple watched movies on VHS tapes.
239 people watched movies on DVDs.
54 people watched movies both on VHS and DVDs.
Create a Venn diagram to reflect the above data, label the diagram clearly.
i. Of those surveyed, how many watched only VHS tapes?
ii. Of those surveyed, how many watched only DVDs?
iii. Of those surveyed, how many watched VHS tapes or DVDs, but not both?
iv. Of those surveyed, how many watched VHS tapes or DVDs, or both?
Please label the question subject correctly. It is not geometry.
We cannot provide labeled diagrams
ya geometry is dumb
To solve this problem, we can utilize the principles of set theory and Venn diagrams. Here are the steps to create the Venn diagram and find the answers to the given questions:
1. Draw a rectangle representing the entire set of surveyed customers. This rectangle represents the universal set of customers surveyed.
2. Divide this rectangle into two overlapping circles. Label one circle as "VHS" and the other as "DVD."
3. Within the "VHS" circle, label the portion where it overlaps with the "DVD" circle as "Both."
4. Write down the given information on the appropriate regions of the Venn diagram. It states that 144 people watch movies on VHS tapes, 239 people watch movies on DVDs, and 54 people watch movies on both VHS tapes and DVDs.
5. To find the missing values, calculate the values of each region on the Venn diagram step-by-step.
i. To find the number of people who watch only VHS tapes, subtract the number of people watching both from the total watching VHS tapes. In this case, the number would be: 144 - 54 = 90 people.
ii. To find the number of people who watch only DVDs, subtract the number of people watching both from the total watching DVDs. In this case, the number would be: 239 - 54 = 185 people.
iii. To find the number of people who watch VHS tapes or DVDs, but not both, add the number who watch only VHS tapes and the number who watch only DVDs. In this case, the number would be: 90 + 185 = 275 people.
iv. To find the number of people who watch VHS tapes or DVDs, or both, add the number watching only VHS tapes, the number watching only DVDs, and the number watching both. In this case, the number would be: 90 + 185 + 54 = 329 people.
By following these steps, you can create a Venn diagram representing the given data and find the answers to the questions about the number of people watching only VHS tapes, only DVDs, VHS tapes or DVDs but not both, and VHS tapes or DVDs, or both.