Among the given points, only (-2, 0) is a solution to x = -2. This implies its unique position on the coordinate plane, aligning with the equation's criterion.
The equation x = -2 means that the x-coordinate of a point should be equal to -2. Let's evaluate each given point:
Point (-1, -5): The x-coordinate is -1, not -2, so this point is not a solution.
Point (6, 4): The x-coordinate is 6, not -2, so this point is not a solution.
Point (9, -2): The x-coordinate is 9, not -2, so this point is not a solution.
Point (-2, 0): The x-coordinate is -2, which satisfies the equation x = -2. This point is a solution.
The point (-2, 0) is the only one that satisfies the given equation. This implies that on the coordinate plane, this particular point lies on the vertical line where x is constantly equal to -2. The other points, not meeting the criteria, would be located elsewhere on the plane. The concept of solutions to equations on the coordinate plane helps pinpoint specific positions that satisfy mathematical conditions, providing a practical understanding of the points' relationships to the given equations.
The question probable may be:
Are any of the given points (-1, -5), (6, 4), (9, -2), (-2, 0) solutions to the equation x = -2? If so, which ones satisfy the condition, and what does this imply about their placement on the coordinate plane?