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What are the limitations of work-energy theorem?

What are the limitations of work-energy theorem?

Although this theorem can be used to solve different types of problems in physics yet it does not give complete information about the real cause of motion (i.e., dynamics of Newton’s second law of motion). It is called scalar form of Newton’s second law of motion.

What happens to the work done by friction?

Friction does negative work and removes some of the energy the person expends and converts it to thermal energy. The net work equals the sum of the work done by each individual force.

What’s the work-energy theorem?

The work-energy theorem states that the net work done by the forces on an object equals the change in its kinetic energy.

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Is Work energy theorem always applicable?

Work energy theorem is applicable for conservative as well as non-conservative forces.

Is Work energy theorem valid in non inertial frame?

Yes,work energy theorem is valid in non-inertial frames also. Only we’ve to take care of the pseudo forces & work done by them(fictitious work though).

Where energy goes when work is done against friction?

When you move something that has a resisting force, like friction, then not all the energy you put in (work done) goes to kinetic energy. Some of the energy is lost to friction and dissipated as heat. That is called work done against friction.

Where does the energy transferred to the work done by friction go?

thermal energy
Since the friction force is non-conservative, the work done is not stored as potential energy. All the work done by the friction force results in a transfer of energy into thermal energy of the box-floor system.

When can you use work-energy theorem?

In situations where the motion of an object is known, but the values of one or more of the forces acting on it are not known, you may be able to use the work-energy theorem to get some information about the forces.

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What happens to the energy of the one doing the work and to the object on which work is done?

When work is done on a system or object, energy is added to it. When work is done by a system or object, it gives some of its energy to something else. By applying a force on the ball over this distance, the hand is doing work on the ball, and the ball gains kinetic energy. This is what gives it speed.

Is the work kinetic energy theorem always true?

The work-energy principle is valid regardless of the presence of any non conservative forces. As long as you are using the work done by the resultant force (and resultant moment when involving rigid bodies) in the equation (or equivalently adding the work done by each force/moment), the work energy principle is valid.

Is work-energy theorem valid only for particles?

The work energy theorem is valid in any kind of forces.

Is the work energy theorem valid if there is friction?

With these definitions in mind, the work energy theorem states that the change in the KE is equal to the net work: Δ K E = F → n e t ⋅ d → C o M. This expression holds in general, including in cases of friction. So the work energy theorem is valid, even with friction.

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Why is the work done by friction negative in this problem?

In this problem, work done by friction will be negative because the force is applied in the opposite direction as the motion, and will decrease the initial energy, giving us a Final Energy result that is less than the initial energy because energy is lost to friction.

What is the work-energy theorem for constant force?

This expression is called the work-energy theorem, and it actually applies in general (even for forces that vary in direction and magnitude), although we have derived it for the special case of a constant force parallel to the displacement. The theorem implies that the net work on a system equals the change in the quantity 1 2mv2 1 2 m v 2.

How to use the kinetic energy theorem in physics?

Step-1: Draw the FBD of the object, thus identifying the forces operating on the object. Step-2: Finding the initial and final kinetic energy. Step-3: Equating the values according to the theorem. 4. How can we efficiently use this theorem?