Tony and Stark: A Fractional Apple Tale

In the fascinating world of mathematics, we often find solutions to intriguing real-life problems that involve fractions. Let's delve into a situation where Tony and Stark share apples.

Introduction to Tony and Stark's Apple Sharing Scenario

Imagine two siblings, Tony and Stark. Tony has 30 apples and Stark has 10 apples. In a peculiar twist, half of Stark's apples and one-third of Tony's apples are eaten. This raises an interesting question: how many apples remain? Let's break it down step by step.

Understanding the Problem

We start with the initial quantities of apples:

Tony has 30 apples. Stark has 10 apples.

Now, we need to determine how many apples are eaten:

Total Apples Eaten

Since half of Stark's apples are eaten, the number of apples eaten from Stark is:

10 apples ÷ 2 5 apples (101/2 5)

For Tony, one-third of his apples are eaten, which means:

30 apples ÷ 3 10 apples (301/3 10)

Total Apples Eaten

Adding the apples eaten from both Tony and Stark:

5 apples from Stark plus 10 apples from Tony equals a total of:

5 10 15 apples

Remaining Apples

Subtracting the total apples eaten from the initial quantities:

Initial apples: 30 (Tony) 10 (Stark) 40 apples Total apples eaten: 15 apples

40 - 15 25 apples remain

Conclusion

Through this mathematical exploration, we have discovered that there are 25 apples left after Tony and Stark have redistributed their shares. This problem showcases the practical application of fractions and provides a fun way to explore mathematical concepts.

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