quadrilateral QRST with Q (-4, -1), R(-1, 2), S(2, 2), and T(0,-4) in the line y=x. Where is Q
The point Q(-4, -1) is not on the line y=x.
The line y=x represents points where the x-coordinate is equal to the y-coordinate.
To find where Q(-4, -1) is on the line y=x, we need to solve the equation x = y.
Let's substitute -1 for y in the equation:
x = -1
Therefore, Q(-4, -1) is located at the point (-1, -1) on the line y=x.
To find the location of point Q, you need to determine its coordinates on the line y = x.
Given the coordinates of Q as (-4, -1), we can see that the x-coordinate is -4 and the y-coordinate is -1.
Since the line y = x represents a set of ordered pairs where the x-coordinate is always equal to the y-coordinate, the location of Q on the line y = x is at (-1, -1).
To determine where the point Q is on the line y=x, we can compare its coordinates.
The line y=x represents all the points where the x-coordinate is equal to the y-coordinate. Therefore, we need to find the point (x, x) that matches Q's coordinates (-4, -1).
By observation, we can see that Q does not lie on the line y=x.
Therefore, Q is not on the line y=x.