A small town is represented on a graph in coordination of the post office are(2,3) which other building is in the same quadrant
To determine which other building is in the same quadrant as the post office in the given graph, we need to understand the concept of quadrants on a coordinate plane.
A coordinate plane is divided into four quadrants labeled as I, II, III, and IV. The signs of the x-coordinate (horizontal axis) and y-coordinate (vertical axis) determine the quadrant in which a point lies.
Here's a brief explanation of each quadrant:
- Quadrant I: The x-coordinate is positive (+), and the y-coordinate is positive (+).
- Quadrant II: The x-coordinate is negative (-), and the y-coordinate is positive (+).
- Quadrant III: The x-coordinate is negative (-), and the y-coordinate is negative (-).
- Quadrant IV: The x-coordinate is positive (+), and the y-coordinate is negative (-).
Now, let's consider the given coordinates of the post office, which are (2,3). The x-coordinate is 2, which is positive, and the y-coordinate is 3, which is also positive. Therefore, the post office is located in Quadrant I.
To determine which other building is in the same quadrant as the post office, you would need to provide the coordinates of the other buildings in the town. Once you have the coordinates of another building, you can analyze its quadrant using the same logic explained above. If the coordinates also place it in Quadrant I, then it will be in the same quadrant as the post office.
So, in order to identify which other building is in the same quadrant as the post office, you would need to provide additional coordinate values for the buildings in the town.
To determine which other building is in the same quadrant as the post office, we need to look at the signs of the coordinates.
In the first quadrant, both x and y are positive. In the second quadrant, x is negative while y is positive. In the third quadrant, both x and y are negative. In the fourth quadrant, x is positive while y is negative.
Given that the post office is located at (2,3), both x and y are positive. Therefore, any other building with positive values for both coordinates will be in the same quadrant as the post office.