Final answer:
Without specific mass and velocity values for each object, we cannot rank the objects by their momentum. In physics, momentum is determined by the product of mass and velocity, and accurate data is essential for such calculations.
Step-by-step explanation:
To rank the objects by their momentum, we need to consider the definition of momentum. Momentum is directly proportional to an object's mass and velocity, as given by the equation p = mv, where p stands for momentum, m is mass, and v is velocity. The more massive an object is or the faster it moves, the more momentum it has.
However, the information provided does not specify the mass or velocity of the objects in question, which is necessary to accurately rank them by momentum. In physics problems like this, one would normally be provided with the mass and velocity of each object in order to solve the problem. Without this information, we cannot confidently assign a ranking to the objects. In professional practice, it's critical to have all necessary data before reaching a conclusion.
It is also worth noting that if two objects have different masses but the same momentum, the one with the smaller mass must have a higher velocity. Similarly, if two objects have the same kinetic energy, the one with the smaller mass will have a larger momentum since kinetic energy is given by the equation KE = 0.5mv2. This information stems from the understanding of physics concepts such as momentum and kinetic energy discussed in critical thinking items relating to linear momentum, force, and impulse.