If you plot the given points on the coordinate grid, they would be as follows:
- Point A (-7,6)
- Point B (-2,-6)
- Point C (10,-1)
- Point D (5,11)
You should plot these points on a coordinate plane and then draw lines to connect them in order: A to B, B to C, C to D, and D back to A. This will form the square ABCD.
However, if you carried out the plotting, you would actually notice that these points do not form a perfect square upon connecting them, because the sides will not be equal in length and the angles will not be all 90 degrees. Nevertheless, for the sake of this exercise, let's proceed under the assumption that the points do indeed form a square. We would need to use the distances between the points to find the length of a side of the square.
The distance between two points (x1, y1) and (x2, y2) is defined as:
\(d = \sqrt{(x2 - x1)^2 + (y2 - y1)^2}\)
Let's choose two adjacent points to calculate one side's length (AB, BC, CD, or DA). We'll calculate the distance between A and B.
\(AB = \sqrt{((-2) - (-7))^2 + ((-6) - 6)^2}\)
\(AB = \sqrt{(5)^2 + (-12)^2}\)
\(AB = \sqrt{25 + 144}\)
\(AB = \sqrt{169}\)
\(AB = 13\) feet
Since it's a square, all sides are equal, so the side length \(s\) of the square is 13 feet.
Now, we can use the area formula for a square:
Area \(A = s^2\)
Area \(= 13^2\)
Area \(= 169\) square feet
Therefore, under the assumption that these points form a square, the side length would be 13 feet, and the area of the square would be 169 square feet. However, please remember that in reality, these points do not form a square.
A square garden has the end points listed below. Plot and label these points on the grid:
(-7,6)
(-2,-6)
(10,-1)
(5,11)
2. Connect the points to create Square ABCD.
3. Use the Pythagorean Theorem to find the side length, s, of Square ABCD in feet.
S = ___feet
4. Use the formula, A=s^2. To find the area of Square ABCD
A = ___feet^2
3 answers
S=?
A=?
A=?
Based on the previous explanation, assuming that the points given do form a square (which they do not in reality), the calculations for the side length \( s \) and the area \( A \) of the square would be as follows:
Side length \( s \) = 13 feet
Area \( A \) = \( s^2 \) = \( 13^2 \) = 169 square feet
So, with the assumption:
\( S = 13 \) feet
\( A = 169 \) square feet
Side length \( s \) = 13 feet
Area \( A \) = \( s^2 \) = \( 13^2 \) = 169 square feet
So, with the assumption:
\( S = 13 \) feet
\( A = 169 \) square feet
1 answer