Mechanical Energy Conservation and Losses

Why It Matters

Many JC mechanics problems are solved by deciding whether mechanical energy is conserved or whether non-conservative work must be included.

Mechanical energy is the sum of kinetic energy and potential energy:

E_{mech} = K + U

If only conservative forces do work, mechanical energy is conserved:

K_{i} + U_{i} = K_{f} + U_{f}

When non-conservative forces such as friction, drag, or an applied motor force do work, mechanical energy changes:

K_{i} + U_{i} + W_{nc} = K_{f} + U_{f}

where $W_{nc}$ is the total work done by non-conservative forces on the system.

An equivalent energy-accounting form is:

E_{initial} = E_{final} + E_{dissipated}

when mechanical energy is transferred into thermal energy, sound, or internal energy.

An ideal mechanical system assumes no dissipative losses. Typical examples include:

Real systems often lose useful mechanical energy through:

The phrase “energy loss” means loss from the mechanical or useful energy store, not loss from the universe.

Check whether the question states “smooth”, “frictionless”, or “air resistance negligible”.
Use force equations when acceleration or contact forces are needed.
Use energy equations when relating speeds and positions without time.
Do not assume mechanical energy is conserved if an engine, friction, or drag is doing work.