. Two Cities A And B Have A Total Number Of 1000 Birds. The Ratio Of Birds In City A To City B Is 3:5. In Ene Season, 250 Birds Migrated From City A To City B. Find The New Ratio Of Birds In Both Cities.​

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Introduction

In this article, we will delve into a fascinating mathematical problem involving the migration of birds between two cities, A and B. The problem presents a classic example of a ratio and proportion problem, which requires us to apply mathematical concepts to find the new ratio of birds in both cities after a significant migration event.

The Initial Situation

Let's assume that the total number of birds in both cities is 1000. The ratio of birds in city A to city B is given as 3:5. This means that for every 3 birds in city A, there are 5 birds in city B. We can represent this ratio as a fraction: 3/5.

Representing the Initial Situation Mathematically

To represent the initial situation mathematically, we can use the following equation:

A/B = 3/5

where A is the number of birds in city A and B is the number of birds in city B.

The Migration Event

In one season, 250 birds migrated from city A to city B. This means that the number of birds in city A decreased by 250, while the number of birds in city B increased by 250.

Representing the Migration Event Mathematically

Let's represent the number of birds in city A after the migration as A' and the number of birds in city B after the migration as B'. We can write the following equations:

A' = A - 250 B' = B + 250

Finding the New Ratio

We are asked to find the new ratio of birds in both cities after the migration. To do this, we need to find the values of A' and B' and then calculate the new ratio A'/B'.

Calculating the New Ratio

First, let's find the initial values of A and B. Since the ratio of birds in city A to city B is 3:5, we can write:

A/B = 3/5 A = 3x B = 5x

where x is a constant.

Since the total number of birds is 1000, we can write:

A + B = 1000 3x + 5x = 1000 8x = 1000 x = 125

Now that we have the value of x, we can find the initial values of A and B:

A = 3x = 3(125) = 375 B = 5x = 5(125) = 625

Now, let's find the new values of A' and B':

A' = A - 250 = 375 - 250 = 125 B' = B + 250 = 625 + 250 = 875

Finally, we can calculate the new ratio A'/B':

A'/B' = 125/875 = 1/7

Conclusion

In this article, we have solved a mathematical problem involving the migration of birds between two cities, A and B. We have represented the initial situation mathematically, calculated the new ratio of birds in both cities after the migration, and found the final answer.

Key Takeaways

  • The ratio of birds in city A to city B is 3:5.
  • 250 birds migrated from city A to city B.
  • The new ratio of birds in both cities is 1:7.

Further Reading

If you are interested in learning more about ratios and proportions, we recommend checking out the following resources:

  • Khan Academy: Ratios and Proportions
  • Math Open Reference: Ratios and Proportions
  • Wikipedia: Ratio (mathematics)

References

Introduction

In our previous article, we explored a fascinating mathematical problem involving the migration of birds between two cities, A and B. We represented the initial situation mathematically, calculated the new ratio of birds in both cities after the migration, and found the final answer. In this article, we will address some of the most frequently asked questions related to this problem.

Q&A

Q: What is the initial ratio of birds in city A to city B?

A: The initial ratio of birds in city A to city B is 3:5.

Q: How many birds migrated from city A to city B?

A: 250 birds migrated from city A to city B.

Q: What is the new ratio of birds in both cities after the migration?

A: The new ratio of birds in both cities is 1:7.

Q: How did you calculate the new ratio?

A: We first found the initial values of A and B using the ratio 3:5. Then, we calculated the new values of A' and B' after the migration. Finally, we calculated the new ratio A'/B'.

Q: What if the migration had been in the opposite direction, with 250 birds migrating from city B to city A?

A: If 250 birds had migrated from city B to city A, the new ratio of birds in both cities would be 7:1.

Q: Can you explain the concept of ratio and proportion in more detail?

A: A ratio is a comparison of two numbers, usually expressed as a fraction. A proportion is a statement that two ratios are equal. In this problem, we used the ratio 3:5 to represent the initial situation, and then used proportion to find the new ratio after the migration.

Q: How can I apply this concept to real-life situations?

A: Ratios and proportions are used in many real-life situations, such as cooking, building, and finance. For example, if you are making a recipe that calls for a 3:2 ratio of flour to sugar, you can use this concept to scale up or down the recipe.

Q: What are some common mistakes to avoid when working with ratios and proportions?

A: Some common mistakes to avoid include:

  • Not simplifying ratios
  • Not checking for equivalent ratios
  • Not using proportion to solve problems
  • Not considering the context of the problem

Conclusion

In this article, we have addressed some of the most frequently asked questions related to the great bird migration problem. We hope that this Q&A has provided you with a better understanding of the concept of ratio and proportion, and how it can be applied to real-life situations.

Key Takeaways

  • The initial ratio of birds in city A to city B is 3:5.
  • 250 birds migrated from city A to city B.
  • The new ratio of birds in both cities is 1:7.
  • Ratios and proportions are used in many real-life situations.
  • Common mistakes to avoid include not simplifying ratios, not checking for equivalent ratios, not using proportion to solve problems, and not considering the context of the problem.

Further Reading

If you are interested in learning more about ratios and proportions, we recommend checking out the following resources:

  • Khan Academy: Ratios and Proportions
  • Math Open Reference: Ratios and Proportions
  • Wikipedia: Ratio (mathematics)

References