A giant crane in Washington DC was tested by lifting a 2.232x10^6 kg load. Find the magnitude of the force needed to lift the load with a net acceleration of 0m/s^2
To find the magnitude of the force needed to lift the load with a net acceleration of 0 m/s^2, we can use Newton's second law of motion.
Newton's second law states that the force (F) acting on an object is equal to the mass (m) of the object multiplied by its acceleration (a). Mathematically, it can be represented by the equation:
F = m * a
In this case, the acceleration is given as 0 m/s^2. We are also given the mass of the load, which is 2.232 × 10^6 kg.
Therefore, substituting the given values into the equation, we have:
F = (2.232 × 10^6 kg) * (0 m/s^2)
Since the acceleration is 0 m/s^2, the force required to lift the load is also 0 N.
So, the magnitude of the force needed to lift the load with a net acceleration of 0 m/s^2 is 0 N.