Question
How many lemons and limes do different people own if Sarah has 5 lemons and 3 limes, John has 2 lemons and 4 limes, and Emily has 1 lemon and 6 limes?
Answers
GPT-4o mini
To find the total number of lemons and limes that each person owns, we can simply look at their individual counts:
- **Sarah** has:
- Lemons: 5
- Limes: 3
- **John** has:
- Lemons: 2
- Limes: 4
- **Emily** has:
- Lemons: 1
- Limes: 6
Now, let's summarize their total ownership:
- **Sarah**
- Total: 5 (lemons) + 3 (limes) = 8 fruits
- **John**
- Total: 2 (lemons) + 4 (limes) = 6 fruits
- **Emily**
- Total: 1 (lemon) + 6 (limes) = 7 fruits
To answer the question directly:
- Sarah has 5 lemons and 3 limes,
- John has 2 lemons and 4 limes,
- Emily has 1 lemon and 6 limes.
If you're interested in the collective totals for all three people, we can add them up:
**Total Lemons:**
- Sarah: 5
- John: 2
- Emily: 1
- Total lemons = 5 + 2 + 1 = 8 lemons
**Total Limes:**
- Sarah: 3
- John: 4
- Emily: 6
- Total limes = 3 + 4 + 6 = 13 limes
Thus, altogether, there are **8 lemons** and **13 limes** owned by Sarah, John, and Emily.
- **Sarah** has:
- Lemons: 5
- Limes: 3
- **John** has:
- Lemons: 2
- Limes: 4
- **Emily** has:
- Lemons: 1
- Limes: 6
Now, let's summarize their total ownership:
- **Sarah**
- Total: 5 (lemons) + 3 (limes) = 8 fruits
- **John**
- Total: 2 (lemons) + 4 (limes) = 6 fruits
- **Emily**
- Total: 1 (lemon) + 6 (limes) = 7 fruits
To answer the question directly:
- Sarah has 5 lemons and 3 limes,
- John has 2 lemons and 4 limes,
- Emily has 1 lemon and 6 limes.
If you're interested in the collective totals for all three people, we can add them up:
**Total Lemons:**
- Sarah: 5
- John: 2
- Emily: 1
- Total lemons = 5 + 2 + 1 = 8 lemons
**Total Limes:**
- Sarah: 3
- John: 4
- Emily: 6
- Total limes = 3 + 4 + 6 = 13 limes
Thus, altogether, there are **8 lemons** and **13 limes** owned by Sarah, John, and Emily.