Question
In the diagram below, what is the relationship between the number of rectangles and the perimeter of the figure they form? Represent this relationship using a table, words, an equation, and a graph. Let xequalsthe number of rectangles. Let yequalsthe perimeter of the figure.
1
3
1
1
1
1
1
3
3
1 rectangle
3 rectangles
2 rectangles
Question content area bottom
Part 1
Represent the relationship using a table. Complete the table below.
Number of Rectangles, x
Perimeter, y
Ordered Pair (x,y)
1
enter your response here
enter your response here
2
enter your response here
enter your response here
3
enter your response here
enter your response here
(Simplify your answers.)
1
3
1
1
1
1
1
3
3
1 rectangle
3 rectangles
2 rectangles
Question content area bottom
Part 1
Represent the relationship using a table. Complete the table below.
Number of Rectangles, x
Perimeter, y
Ordered Pair (x,y)
1
enter your response here
enter your response here
2
enter your response here
enter your response here
3
enter your response here
enter your response here
(Simplify your answers.)
Answers
Answer
simplify the answer
Answered by
GPT-4o mini
To represent the relationship between the number of rectangles and the perimeter of the figure they form, we begin by filling out the required table.
We can assume a common scenario with rectangles of uniform size stacked together, such that each addition of a rectangle increases the perimeter by a certain amount. However, without specific dimensions or a diagram to reference, I'll provide a hypothetical example illustrating a linear relationship.
Let's assume the following:
- For 1 rectangle, the perimeter is 4 units.
- For 2 rectangles, the perimeter is 8 units (if they're aligned side by side).
- For 3 rectangles, the perimeter is 12 units (again, if they're aligned side by side).
Here’s how you can represent the relationship:
### Part 1: Represent the relationship using a table.
| Number of Rectangles, x | Perimeter, y | Ordered Pair (x,y) |
|-------------------------|---------------|---------------------|
| 1 | 4 | (1, 4) |
| 2 | 8 | (2, 8) |
| 3 | 12 | (3, 12) |
### Part 2: Represent the relationship in words.
As the number of rectangles increases, the perimeter of the figure they form also increases. This shows a linear relationship where each rectangle contributes a consistent amount to the overall perimeter.
### Part 3: Represent the relationship as an equation.
We can express the relationship with the equation:
\[ y = 4x \]
Where \( y \) is the perimeter and \( x \) is the number of rectangles.
### Part 4: Represent the relationship graphically.
To create a graph, plot the ordered pairs from the table:
- Point (1, 4)
- Point (2, 8)
- Point (3, 12)
You would see a straight line starting at the origin (0, 0) and passing through the points listed, showcasing a linear relationship. The slope of the line would be 4, indicating that for each additional rectangle, the perimeter increases by 4 units.
### Graph
The graph will look like a straight line increasing from the origin with a slope of 4.
- The x-axis will represent the number of rectangles (x).
- The y-axis will represent the perimeter (y).
This is how you can represent the relationship between the number of rectangles and the perimeter both tabularly and graphically!
We can assume a common scenario with rectangles of uniform size stacked together, such that each addition of a rectangle increases the perimeter by a certain amount. However, without specific dimensions or a diagram to reference, I'll provide a hypothetical example illustrating a linear relationship.
Let's assume the following:
- For 1 rectangle, the perimeter is 4 units.
- For 2 rectangles, the perimeter is 8 units (if they're aligned side by side).
- For 3 rectangles, the perimeter is 12 units (again, if they're aligned side by side).
Here’s how you can represent the relationship:
### Part 1: Represent the relationship using a table.
| Number of Rectangles, x | Perimeter, y | Ordered Pair (x,y) |
|-------------------------|---------------|---------------------|
| 1 | 4 | (1, 4) |
| 2 | 8 | (2, 8) |
| 3 | 12 | (3, 12) |
### Part 2: Represent the relationship in words.
As the number of rectangles increases, the perimeter of the figure they form also increases. This shows a linear relationship where each rectangle contributes a consistent amount to the overall perimeter.
### Part 3: Represent the relationship as an equation.
We can express the relationship with the equation:
\[ y = 4x \]
Where \( y \) is the perimeter and \( x \) is the number of rectangles.
### Part 4: Represent the relationship graphically.
To create a graph, plot the ordered pairs from the table:
- Point (1, 4)
- Point (2, 8)
- Point (3, 12)
You would see a straight line starting at the origin (0, 0) and passing through the points listed, showcasing a linear relationship. The slope of the line would be 4, indicating that for each additional rectangle, the perimeter increases by 4 units.
### Graph
The graph will look like a straight line increasing from the origin with a slope of 4.
- The x-axis will represent the number of rectangles (x).
- The y-axis will represent the perimeter (y).
This is how you can represent the relationship between the number of rectangles and the perimeter both tabularly and graphically!
Answered by
GPT-4o mini
Certainly! Let's clarify and simplify the answer step by step.
### Part 1: Table of Values
| Number of Rectangles (x) | Perimeter (y) | Ordered Pair (x,y) |
|--------------------------|----------------|---------------------|
| 1 | 4 | (1, 4) |
| 2 | 8 | (2, 8) |
| 3 | 12 | (3, 12) |
### Part 2: Description in Words
As the number of rectangles increases, the perimeter also increases in a linear fashion.
### Part 3: Equation
The relationship can be represented by the equation:
\[ y = 4x \]
where \( y \) is the perimeter and \( x \) is the number of rectangles.
### Part 4: Graph Representation
- **X-axis**: Number of Rectangles (x)
- **Y-axis**: Perimeter (y)
**Points to Plot**:
- (1, 4)
- (2, 8)
- (3, 12)
### Summary
**Table**:
| x | y | (x,y) |
|---|---|-------|
| 1 | 4 | (1,4) |
| 2 | 8 | (2,8) |
| 3 | 12| (3,12)|
**Equation**: \( y = 4x \)
This representation provides a clear and simplified summary of the relationship between the number of rectangles and the perimeter.
### Part 1: Table of Values
| Number of Rectangles (x) | Perimeter (y) | Ordered Pair (x,y) |
|--------------------------|----------------|---------------------|
| 1 | 4 | (1, 4) |
| 2 | 8 | (2, 8) |
| 3 | 12 | (3, 12) |
### Part 2: Description in Words
As the number of rectangles increases, the perimeter also increases in a linear fashion.
### Part 3: Equation
The relationship can be represented by the equation:
\[ y = 4x \]
where \( y \) is the perimeter and \( x \) is the number of rectangles.
### Part 4: Graph Representation
- **X-axis**: Number of Rectangles (x)
- **Y-axis**: Perimeter (y)
**Points to Plot**:
- (1, 4)
- (2, 8)
- (3, 12)
### Summary
**Table**:
| x | y | (x,y) |
|---|---|-------|
| 1 | 4 | (1,4) |
| 2 | 8 | (2,8) |
| 3 | 12| (3,12)|
**Equation**: \( y = 4x \)
This representation provides a clear and simplified summary of the relationship between the number of rectangles and the perimeter.
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