Much much force is needed to push a container with wheels that weighs 250 pounds
You need to provide more information
Is it accelerating? At what rate?
Is it uphill? How steep?
is there friction? What coefficient?
There probably is negligible friction, since there are wheels.
To determine the amount of force needed to push a container with wheels weighing 250 pounds, you need to understand the concept of force and the factors affecting it. Force is the physical quantity that causes an object to accelerate or decelerate. In this case, the force needed to push the container will depend on various factors, such as the coefficient of friction between the wheels and the surface, the angle of inclination (if any), and the desired acceleration or deceleration.
Let's assume you are pushing the container on a flat, horizontal surface with no external forces acting on it. In this case, the force needed to overcome the resistance due to friction can be calculated using the equation:
Force = Weight * Coefficient of Friction
The coefficient of friction is a dimensionless value that represents the roughness between the two surfaces in contact. However, since you haven't specified the coefficient of friction, we will assume a conservative value of 0.6 for a typical scenario.
So, the force needed to push the container can be calculated as follows:
Force = 250 pounds * 0.6
Force = 150 pounds
Therefore, to push a container with wheels weighing 250 pounds on a flat surface with a coefficient of friction of 0.6, you would need to exert a force of 150 pounds.