Answer :
- Convert the values in the third column to percentages by dividing by 100,000.
- Compare the calculated percentages to the given options.
- Identify the closest option to the calculated percentages.
- The correct answer is \boxed{A}
### Explanation
1. Analyzing the Problem
We are given a table with three columns and four options (A, B, C, D). Our goal is to determine which of the options best represents the data in the table. The third column contains values that are close to 100,000. The options A and C are percentages close to 100%, while option D is a small percentage, and option B is a large number. We need to analyze the third column to see which option is most appropriate.
2. Converting to Percentages
Let's examine the third column, which contains the values 99,883, 99,882, 99,880, 99,877, 99,873, 99,868, 99,685, 99,659, 99,629, 99,595, and 99,557. These values are all close to 100,000. Options A and C are percentages, so let's convert the values in the third column to percentages by dividing by 100,000. This gives us approximately 99.883%, 99.882%, 99.880%, 99.877%, 99.873%, 99.868%, 99.685%, 99.659%, 99.629%, 99.595%, and 99.557%.
3. Comparing with Option A
Now, let's compare these percentages to the given options. Option A is 99.87%. We can see that several values in the converted percentages are very close to this value. To determine which option is the closest, we can calculate the difference between each converted percentage and 99.87%. The closest value among the converted percentages is 99.87%.
4. Final Answer
After comparing the values in the third column to the options, we find that the values are closest to 99.87%. Therefore, option A is the most appropriate answer.
5. Conclusion
The correct answer is A. $99.87 \%$
### Examples
In quality control, you might have a target percentage of acceptable products. Analyzing a table of production data helps you quickly identify if the actual percentage of acceptable products is close to your target, ensuring your manufacturing process is on track.
- Compare the calculated percentages to the given options.
- Identify the closest option to the calculated percentages.
- The correct answer is \boxed{A}
### Explanation
1. Analyzing the Problem
We are given a table with three columns and four options (A, B, C, D). Our goal is to determine which of the options best represents the data in the table. The third column contains values that are close to 100,000. The options A and C are percentages close to 100%, while option D is a small percentage, and option B is a large number. We need to analyze the third column to see which option is most appropriate.
2. Converting to Percentages
Let's examine the third column, which contains the values 99,883, 99,882, 99,880, 99,877, 99,873, 99,868, 99,685, 99,659, 99,629, 99,595, and 99,557. These values are all close to 100,000. Options A and C are percentages, so let's convert the values in the third column to percentages by dividing by 100,000. This gives us approximately 99.883%, 99.882%, 99.880%, 99.877%, 99.873%, 99.868%, 99.685%, 99.659%, 99.629%, 99.595%, and 99.557%.
3. Comparing with Option A
Now, let's compare these percentages to the given options. Option A is 99.87%. We can see that several values in the converted percentages are very close to this value. To determine which option is the closest, we can calculate the difference between each converted percentage and 99.87%. The closest value among the converted percentages is 99.87%.
4. Final Answer
After comparing the values in the third column to the options, we find that the values are closest to 99.87%. Therefore, option A is the most appropriate answer.
5. Conclusion
The correct answer is A. $99.87 \%$
### Examples
In quality control, you might have a target percentage of acceptable products. Analyzing a table of production data helps you quickly identify if the actual percentage of acceptable products is close to your target, ensuring your manufacturing process is on track.
