Answer:
yz plane
Explanation:
The point (-6, 0, -5) lies on the yz-plane. In a three-dimensional coordinate system, the yz-plane is defined as the set of all points whose x-coordinate is equal to 0. Since the x-coordinate of the point (-6, 0, -5) is not equal to 0, it does not lie on the yz-plane.
Similarly, the point (-6, 0, -5) does not lie on the xz-plane or the xy-plane either. The xz-plane is defined as the set of all points whose y-coordinate is equal to 0 and the xy-plane is defined as the set of all points whose z-coordinate is equal to 0. Since the y-coordinate and z-coordinate of the point (-6, 0, -5) are not equal to 0, it does not lie on either of these planes.
Therefore, the point (-6, 0, -5) does not lie on any of the three coordinate planes (xy-plane, xz-plane or yz-plane).
Received message. The point (-6, 0, -5) lies on the yz-plane. In a three-dimensional coordinate system, the yz-plane is defined as the set of all points whose x-coordinate is equal to 0. Since the x-coordinate of the point (-6, 0, -5) is not equal to 0, it does not lie on the yz-plane. Similarly, the point (-6, 0, -5) does not lie on the xz-plane or the xy-plane either. The xz-plane is defined as the set of all points whose y-coordinate is equal to 0 and the xy-plane is defined as the set of all points whose z-coordinate is equal to 0. Since the y-coordinate and z-coordinate of the point (-6, 0, -5) are not equal to 0, it does not lie on either of these planes. Therefore, the point (-6, 0, -5) does not lie on any of the three coordinate planes (xy-plane, xz-plane or yz-plane).