Points to Remember:
- Calculate the total investment in districts A and B for both 1995 and 1996.
- Determine the difference in total investment between 1996 and 1995.
- Calculate the percentage increase in investment from 1995 to 1996.
Introduction:
This question requires a factual approach, focusing on calculating the percentage increase in total investment in districts A and B from 1995 to 1996. To answer this, we need data on the investment amounts in each district for both years. Without this data, a precise answer cannot be provided. This response will outline the calculation process assuming the necessary data is available.
Body:
1. Data Acquisition:
The first step is to obtain the investment figures for districts A and B for both 1995 and 1996. Let’s assume, for the purpose of illustration, that the data is as follows:
| Year | District A Investment | District B Investment | Total Investment (A+B) |
|—|—|—|—|
| 1995 | $10 million | $5 million | $15 million |
| 1996 | $12 million | $7 million | $19 million |
2. Calculating the Difference:
Next, we calculate the difference in total investment between 1996 and 1995:
Total Investment in 1996 – Total Investment in 1995 = $19 million – $15 million = $4 million
3. Calculating the Percentage Increase:
Finally, we calculate the percentage increase using the following formula:
Percentage Increase = [(Difference in Investment) / (Total Investment in 1995)] * 100
Percentage Increase = ($4 million / $15 million) * 100 = 26.67%
Conclusion:
Based on the illustrative data provided, the total investment in districts A and B was approximately 26.67% higher in 1996 compared to 1995. It is crucial to note that this result is entirely dependent on the accuracy and availability of the investment data for districts A and B. Without the actual figures, this calculation cannot be performed. To ensure accurate and reliable analysis in the future, maintaining comprehensive and readily accessible investment records is essential for informed decision-making and effective resource allocation. This emphasizes the importance of transparent and efficient data management in public finance.