k, 4 )
(0, 4)
Field A
Field C
(7, 3)
(0, 0)
- 4, 0 )
(0, - 3)
(3, 0)
Field B
(3, - 3)
1 acre =
4,840 sq yards
1. Count the number of squares inside Field A. This is the area of Square A in acres. Write it below: (1 point)
It is unclear from the given information how many squares are inside Field A.
To count the number of squares inside Field A, we need to determine the number of squares that fit within the boundaries of Field A. Here's how you can do it:
1. Look at the grid provided and identify the coordinates for the four corners of Field A: k, 4 in the top left, (0, 4) in the top right, (0, 0) in the bottom left, and -4, 0 in the bottom right.
2. Determine the width and height of Field A by subtracting the x-coordinates and y-coordinates of the corners:
Width = x-coordinate of the top right - x-coordinate of the top left
= 0 - (-4)
= 4
Height = y-coordinate of the top left - y-coordinate of the bottom left
= 4 - 0
= 4
3. Multiply the width and height to find the area of Field A (in square units):
Area = Width x Height
= 4 x 4
= 16 square units
4. Convert the area from square units to acres:
1 acre = 4,840 square yards
Divide the area in square units by the conversion factor:
Area in acres = Area in square units / 4,840
= 16 / 4,840
≈ 0.0033 acres
So, the area of Field A is approximately 0.0033 acres.