Question
9 tiles as possible into each row. Then name the number of groups and the number of tiles in each group.
There are
2
groups.
There are
4
tiles in each row.
Step 2: Enter the division equation that represents the Array Model.
9
÷
4
=
2
Step 3: Label each part of the equation.
total number of tiles
÷
number of tiles in each group
=
number of groups
There are
2
groups.
There are
4
tiles in each row.
Step 2: Enter the division equation that represents the Array Model.
9
÷
4
=
2
Step 3: Label each part of the equation.
total number of tiles
÷
number of tiles in each group
=
number of groups
Answers
GPT-4o mini
It looks like you're working with an Array Model to represent a division problem. Let's break down each part clearly.
### Given:
- Total number of tiles: 9
- Number of tiles in each group: 4
- Number of groups: 2
### Step 1: Identify the groups and tiles per group
- **Number of groups:** 2
- **Tiles in each group:** 4
However, it seems like there's an inconsistency because if you have 9 tiles and are trying to divide them into groups of 4, you won't have an exact number of groups. Let's clarify:
When you divide 9 tiles among groups of 4, you can get only 2 full groups because 4 tiles in first group + 4 tiles in second group = 8 tiles, leaving you with 1 tile remaining.
### Step 2: The division equation
If we reconsider the problem based on this clarification, the division equation should represent the total number of tiles divided by the number of tiles in each full group:
\[ 9 \, \div \, 4 = 2 \quad \text{(with remainder 1)} \]
### Step 3: Label each part of the equation
- **Total number of tiles:** 9
- **Number of tiles in each group:** 4
- **Number of full groups:** 2 (with 1 tile remaining)
So, the labeled equation would be:
\[
9 \, \text{(total number of tiles)} \div 4 \, \text{(number of tiles in each group)} = 2 \, \text{(number of full groups)}
\]
In conclusion, if you're dividing 9 tiles into groups of 4, you can only form 2 full groups with 1 tile left over.
### Given:
- Total number of tiles: 9
- Number of tiles in each group: 4
- Number of groups: 2
### Step 1: Identify the groups and tiles per group
- **Number of groups:** 2
- **Tiles in each group:** 4
However, it seems like there's an inconsistency because if you have 9 tiles and are trying to divide them into groups of 4, you won't have an exact number of groups. Let's clarify:
When you divide 9 tiles among groups of 4, you can get only 2 full groups because 4 tiles in first group + 4 tiles in second group = 8 tiles, leaving you with 1 tile remaining.
### Step 2: The division equation
If we reconsider the problem based on this clarification, the division equation should represent the total number of tiles divided by the number of tiles in each full group:
\[ 9 \, \div \, 4 = 2 \quad \text{(with remainder 1)} \]
### Step 3: Label each part of the equation
- **Total number of tiles:** 9
- **Number of tiles in each group:** 4
- **Number of full groups:** 2 (with 1 tile remaining)
So, the labeled equation would be:
\[
9 \, \text{(total number of tiles)} \div 4 \, \text{(number of tiles in each group)} = 2 \, \text{(number of full groups)}
\]
In conclusion, if you're dividing 9 tiles into groups of 4, you can only form 2 full groups with 1 tile left over.