For rounding each number of tickets to the nearest thousand, the equations would be:
1. 6,382 rounded to 6,000
2. 7,819 rounded to 8,000
3. 9,258 rounded to 9,000
So, when estimating the total number of tickets sold by rounding each number to the nearest thousand, the equations would be (x + y + z).
Let's go step by step.
**Given numbers:**
- 6,382
- 7,819
- 9,258
**Step 1: Round each number to the nearest thousand.**
1. For 6,382: The hundreds digit is 3, which is less than 500, so rounding down to the nearest thousand gives 6,000.
2. For 7,819: The hundreds digit is 8, which is greater than 500, so rounding up to the nearest thousand gives 8,000.
3. For 9,258: The hundreds digit is 2, which is less than 500, so rounding down to the nearest thousand gives 9,000.
**Step 2: Write the equations.**
Let x, y, and z represent the rounded values for 6,382, 7,819, and 9,258 respectively.
The equations would be:
x = 6,000
y = 8,000
z = 9,000
So, when estimating the total number of tickets sold by rounding each number to the nearest thousand, the equations would be (x + y + z).
The probable question can be:
For estimating the total number of tickets sold, which equation would you use if each number of tickets were rounded to the nearest thousand?
Given numbers:
- 6,382
- 7,819
- 9,258