1. 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

For example

(-1,-3/4) (4,-3/4) (4,3) (-1,3)

Is that correct jk good job

To graph a rectangle that meets the given conditions, you would need to follow these steps:

1. Start by drawing the coordinate axes, which consist of the x-axis (horizontal) and the y-axis (vertical), intersecting at the origin (0,0).

2. Locate a point (a vertex) that will be in Quadrant I (top right quadrant). Choose a point with rational coordinates that are not integers. Let's say you choose the point (3.5, 1).

3. Next, you need to find a point that will be in Quadrant II (top left quadrant) and make sure it forms a rectangle with the previous point. To do this, identify the width of the rectangle, which is at least 2 units. Let's say the width is 2 units. Subtract 2 units from the x-coordinate of the previous point. So, (3.5, 1) - (2, 0) = (1.5, 1). The point (1.5, 1) will be in Quadrant II.

4. Now, locate a point in Quadrant III (bottom left quadrant). Choose any x-coordinate less than 0 (negative) and with a rational value that is not an integer. Let's say you choose the point (-4.7, -1).

5. Finally, find the last point in Quadrant IV (bottom right quadrant) that forms a rectangle with the previous point. Add the width of the rectangle to the x-coordinate of the previous point. (-4.7, -1) + (2, 0) = (-2.7, -1). The point (-2.7, -1) will be in Quadrant IV.

By following these steps, you have graphed a rectangle with a length of at least 5 units and a width of at least 2 units, where each vertex is in a different quadrant, and two of the points have rational coordinates that are not integers.