Question
Create and illustrate real world fraction problems such as Liam has 8 candies and gives away 1/2. how many does he have left?
Answers
GPT-4o mini
Sure! Let's create some real-world fraction problems similar to the one you mentioned.
### Problem 1: Liam's Candies
**Situation:** Liam has 8 candies and gives away 1/2 of them.
**Question:** How many candies does he have left?
**Solution:**
1. Calculate 1/2 of 8:
\[
\frac{1}{2} \times 8 = 4
\]
2. Subtract the number of candies given away from the total:
\[
8 - 4 = 4
\]
**Answer:** Liam has 4 candies left.
---
### Problem 2: Emma's Watermelon
**Situation:** Emma bought a watermelon that weighs 10 pounds. She cuts it into 1/4 pieces and shares 1/4 with her friends.
**Question:** How much watermelon does Emma have left?
**Solution:**
1. Calculate the weight of 1/4 of the watermelon:
\[
\frac{1}{4} \times 10 = 2.5 \text{ pounds}
\]
2. Subtract the amount shared from the total:
\[
10 - 2.5 = 7.5
\]
**Answer:** Emma has 7.5 pounds of watermelon left.
---
### Problem 3: Sam's Pizza
**Situation:** Sam orders a large pizza cut into 8 slices. He eats 3 slices, which is 3/8 of the pizza.
**Question:** What fraction of the pizza does he have left?
**Solution:**
1. Calculate the number of slices he has left:
\[
8 - 3 = 5
\]
2. Find the fraction of the pizza left:
\[
\frac{5}{8}
\]
**Answer:** Sam has 5/8 of the pizza left.
---
### Problem 4: Sarah's Books
**Situation:** Sarah has 12 books. She donates 1/3 of her books to a local library.
**Question:** How many books does she have left?
**Solution:**
1. Calculate 1/3 of 12:
\[
\frac{1}{3} \times 12 = 4
\]
2. Subtract the donated books from the total:
\[
12 - 4 = 8
\]
**Answer:** Sarah has 8 books left.
---
### Problem 5: Max's Juice
**Situation:** Max has a jug of juice that holds 16 ounces. He drinks 1/2 of it.
**Question:** How much juice does he have left?
**Solution:**
1. Calculate 1/2 of 16 ounces:
\[
\frac{1}{2} \times 16 = 8 \text{ ounces}
\]
2. Subtract the amount drunk from the total:
\[
16 - 8 = 8
\]
**Answer:** Max has 8 ounces of juice left.
---
These problems illustrate the concept of fractions within real-life contexts and require simple arithmetic to solve. Feel free to use them or modify them as needed!
### Problem 1: Liam's Candies
**Situation:** Liam has 8 candies and gives away 1/2 of them.
**Question:** How many candies does he have left?
**Solution:**
1. Calculate 1/2 of 8:
\[
\frac{1}{2} \times 8 = 4
\]
2. Subtract the number of candies given away from the total:
\[
8 - 4 = 4
\]
**Answer:** Liam has 4 candies left.
---
### Problem 2: Emma's Watermelon
**Situation:** Emma bought a watermelon that weighs 10 pounds. She cuts it into 1/4 pieces and shares 1/4 with her friends.
**Question:** How much watermelon does Emma have left?
**Solution:**
1. Calculate the weight of 1/4 of the watermelon:
\[
\frac{1}{4} \times 10 = 2.5 \text{ pounds}
\]
2. Subtract the amount shared from the total:
\[
10 - 2.5 = 7.5
\]
**Answer:** Emma has 7.5 pounds of watermelon left.
---
### Problem 3: Sam's Pizza
**Situation:** Sam orders a large pizza cut into 8 slices. He eats 3 slices, which is 3/8 of the pizza.
**Question:** What fraction of the pizza does he have left?
**Solution:**
1. Calculate the number of slices he has left:
\[
8 - 3 = 5
\]
2. Find the fraction of the pizza left:
\[
\frac{5}{8}
\]
**Answer:** Sam has 5/8 of the pizza left.
---
### Problem 4: Sarah's Books
**Situation:** Sarah has 12 books. She donates 1/3 of her books to a local library.
**Question:** How many books does she have left?
**Solution:**
1. Calculate 1/3 of 12:
\[
\frac{1}{3} \times 12 = 4
\]
2. Subtract the donated books from the total:
\[
12 - 4 = 8
\]
**Answer:** Sarah has 8 books left.
---
### Problem 5: Max's Juice
**Situation:** Max has a jug of juice that holds 16 ounces. He drinks 1/2 of it.
**Question:** How much juice does he have left?
**Solution:**
1. Calculate 1/2 of 16 ounces:
\[
\frac{1}{2} \times 16 = 8 \text{ ounces}
\]
2. Subtract the amount drunk from the total:
\[
16 - 8 = 8
\]
**Answer:** Max has 8 ounces of juice left.
---
These problems illustrate the concept of fractions within real-life contexts and require simple arithmetic to solve. Feel free to use them or modify them as needed!