Graph and identify the coordinates of a rectangle with a length of at least 5 units and a width of at least 2 units. Each vertex of the rectangle must be in a different quadrant. Two of the points must have rational coordinates that are not integers.
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really keke?
she askes for help and you ask her "go see a tutor" on a website designed for help?
What you need to do is graph a triangle, which means you need to draw a triangle on a x and y graph. make sure your triangle is AT LEAST 5 units wide and a length of 2 units. make sure every point is in a different box. have two of the points not integers, so anything but integers. (integers: - and + ) I know Its super late though : (
I have the same thing!
To graph a rectangle with the given conditions, we need to find four points that satisfy the requirements.
1. Let's start by considering a rectangle with a length of 5 units and a width of 2 units. We can place the first vertex at the origin (0,0) since it is in Quadrant I and fulfills the requirement of having rational coordinates that are not integers.
2. For the second vertex, we can place it on the x-axis at (-5, 0). This point is in Quadrant II and meets the requirement of having rational coordinates that are not integers.
3. Now, we need to find the third vertex. It should be in a different quadrant, so let's place it in Quadrant III. We can choose (-5, -2) as the coordinates for this vertex, as it maintains the minimum width of 2 units.
4. Lastly, we need the fourth vertex to be in a different quadrant from the previous three. We can place it in Quadrant IV. One possible coordinate for this vertex could be (3, -2), as it satisfies the minimum length of 5 units.
Graphing these four points will give us a rectangle that meets all the given conditions.
The coordinates of the four vertices of the rectangle are as follows:
Vertex 1: (0, 0)
Vertex 2: (-5, 0)
Vertex 3: (-5, -2)
Vertex 4: (3, -2)