The cube in the given image experiences a centripetal acceleration towards the center of rotation. Centripetal acceleration is always directed towards the center of rotation and is perpendicular to the velocity of the object. In this case, the cube's velocity is tangential to the circle, so the centripetal acceleration is directed towards the center of the circle.
The cube in the given image is moving in a circular path at a constant speed. This means that the cube is experiencing a centripetal acceleration towards the center of rotation.
Centripetal acceleration is the acceleration that keeps an object moving in a circular path. It is directed towards the center of rotation and is perpendicular to the velocity of the object. The magnitude of the centripetal acceleration is given by the following formula:
a_c = v^2 / r
where:
a_c is the centripetal acceleration
v is the velocity of the object
r is the radius of the circle
In the given image, the cube is moving in a circle with radius r. The velocity of the cube is tangential to the circle. Therefore, the centripetal acceleration of the cube is directed towards the center of the circle.