Graph the relation. Find the domain and range.

{(-1,1/2),(-1/2,-1),(3/2,0),(2,3/2)}

I don't know how to do this type of problem could someone show me how to do it? I got like 6 more like this so knowing how to do this one would help greatly. Thank you!

To graph the relation, you need to plot the given points on a coordinate plane. Here are the steps to follow:

Step 1: Set up a coordinate plane by drawing the x-axis and y-axis. Label the axes appropriately.

Step 2: Plot each point from the given set of coordinates. For example:
- The point (-1, 1/2) has an x-coordinate of -1 and a y-coordinate of 1/2. Plot this point.
- The point (-1/2, -1) has an x-coordinate of -1/2 and a y-coordinate of -1. Plot this point.
- The point (3/2, 0) has an x-coordinate of 3/2 and a y-coordinate of 0. Plot this point.
- The point (2, 3/2) has an x-coordinate of 2 and a y-coordinate of 3/2. Plot this point.

Step 3: Connect the plotted points with a smooth curve or line.

Next, we will find the domain and range of the relation:

- The domain is the set of all x-coordinates in the relation. In this case, the x-coordinates are -1, -1/2, 3/2, and 2. Therefore, the domain is {-1, -1/2, 3/2, 2}.

- The range is the set of all y-coordinates in the relation. In this case, the y-coordinates are 1/2, -1, 0, and 3/2. Therefore, the range is {1/2, -1, 0, 3/2}.

I hope this helps! Let me know if you have any further questions.

To graph the given relation, we first plot the points on a coordinate plane. Let's mark the points:

(-1, 1/2)
(-1/2, -1)
(3/2, 0)
(2, 3/2)

Now, connect the dots to create a graph. Since we have four points, we should have a graph with four distinct points plotted. Make sure to label the points on the graph as well.

To find the domain, we need to determine all possible x-values. Looking at the x-coordinates of the given points, we see that the domain is the set of all x-values. In this case, the domain is {-1, -1/2, 3/2, 2}.

To find the range, we need to determine all possible y-values. Looking at the y-coordinates of the given points, we see that the range is the set of all y-values. In this case, the range is {1/2, -1, 0, 3/2}.

Remember, the domain represents all possible x-values, and the range represents all possible y-values of the relation.

just plot the points in the x-y plane

domain: all the x values
range: all the y values

review relations, domain, range