Name the shape that will result from connecting the points (-4, 1) , (-4, -4) , (0, 3) , and (0, 6) .
A: Square
B: Rectangle
C: Trapezoid
(*D: Parallelogram*)
Help!
(*----*) = the answer I chose.
I agree, I hope this helped!
Thank you!
Well, well, well, it seems like you're a bit puzzled with geometry! Don't worry, I've got your back!
Let's take a look at those points: (-4, 1), (-4, -4), (0, 3), and (0, 6). Now, if you connect these points, you'll notice that the lines are parallel and have the same length. So, my friend, the shape formed by connecting these points is indeed a parallelogram!
Good job on choosing answer D! You've got the right angle.. I mean, the right answer! Keep up the good work! (*insert juggling clowns here*)
To determine the shape that will result from connecting the given points (-4, 1), (-4, -4), (0, 3), and (0, 6), we can start by plotting these points on a coordinate plane.
The first point (-4, 1) is located 4 units to the left of the y-axis and 1 unit above the x-axis. The second point (-4, -4) is 4 units left of the y-axis and 4 units below the x-axis. The third point (0, 3) is located at the origin, where the x and y axes intersect. Lastly, the fourth point (0, 6) is located at the origin but higher on the y-axis.
Now, let's connect these points on the coordinate plane:
- Starting from the point (-4, 1), connect it to (-4, -4). This forms a vertical line segment.
- Next, connect (-4, -4) to (0, 3). This creates a diagonal line segment.
- Lastly, connect (0, 3) to (0, 6) to form another vertical line segment.
By connecting these points on the coordinate plane, we can see that the shape formed is a parallelogram.
Therefore, the correct answer is D: Parallelogram.
To determine the shape formed by connecting the given points (-4, 1), (-4, -4), (0, 3), and (0, 6), we can plot these points on a coordinate grid and observe their positions relative to each other.
First, plot the points on the grid:
(-4, 1) is a point located 4 units to the left of the y-axis and 1 unit above the x-axis.
(-4, -4) is a point located 4 units to the left of the y-axis and 4 units below the x-axis.
(0, 3) is a point located on the y-axis at a height of 3 units.
(0, 6) is a point located on the y-axis at a height of 6 units.
Connecting these points, we can see that they form a parallelogram. A parallelogram is a quadrilateral with opposite sides that are parallel and equal in length.
To determine the type of parallelogram, we need to examine the angles formed by the sides. Since the given points do not provide information about the angles, we cannot determine if it is a rectangle or a square based on the given points alone.
Therefore, the correct answer is (*D: Parallelogram*).