QUESTION IMAGE
Question
- ema cut three rectangles from wood for a birdhouse. how do their areas compare? explain.
rectangle a: 4 ft (length) and 4 ft (width)
rectangle b: 8 ft (length) and 2 ft (width)
rectangle c: 16 ft (length) and 1 ft (width)
- how can you find the area of the rectangle? explain. what is the area?
(there is a grid - like image for the rectangle in question 14)
Question 13
Step1: Calculate Area of Rectangle A
The formula for the area of a rectangle is \( \text{Area} = \text{length} \times \text{width} \). For Rectangle A, length = 4 ft and width = 4 ft. So, \( 4 \times 4 = 16 \) square feet.
Step2: Calculate Area of Rectangle B
For Rectangle B, length = 8 ft and width = 2 ft. Using the area formula, \( 2 \times 8 = 16 \) square feet.
Step3: Calculate Area of Rectangle C
For Rectangle C, length = 16 ft and width = 1 ft. Using the area formula, \( 1 \times 16 = 16 \) square feet.
Step4: Compare the Areas
All three rectangles have an area of 16 square feet. So, their areas are equal.
Step1: Determine Length and Width
To find the area of a rectangle, we first need to determine its length and width. If the rectangle is on a grid, we can count the number of grid squares along the length and the width. Let's assume (from typical grid problems) that the length is \( l \) (number of squares along the longer side) and width is \( w \) (number of squares along the shorter side).
Step2: Apply Area Formula
The formula for the area of a rectangle is \( \text{Area} = l \times w \). Multiply the length and the width to get the area.
Step3: Example Calculation (if grid has length 8 and width 3)
Suppose the length of the rectangle is 8 grid units and the width is 3 grid units. Then, \( \text{Area} = 8 \times 3 = 24 \) square units (or square feet, inches, etc., depending on the grid scale).
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The areas of Rectangle A, Rectangle B, and Rectangle C are equal (each is 16 square feet) because when we calculate the area of each rectangle using the formula \( \text{Area} = \text{length} \times \text{width} \), we get \( 4\times4 = 16 \), \( 2\times8 = 16 \), and \( 1\times16 = 16 \) square feet.