The change in density over time based on spatial curvature.

The change in velocity over time based on spatial curvature.

The change in pressure over time based on spatial curvature.

The change in temperature over time based on spatial curvature.

Inventing a new mathematical constant.

Creating a new type of differential equation.

Developing a method to control the solution space using sine waves.

Introducing the concept of temperature waves.

They are easy to visualize.

They have simple derivatives that fit the equation well.

They do not require boundary conditions.

They are the only functions that can solve the equation.

It scales down uniformly.

It scales up exponentially.

It oscillates randomly.

It remains constant.

A condition that describes the temperature at the endpoints over time.

A condition that describes the maximum temperature of the rod.

A condition that describes the average temperature of the rod.

A condition that describes the initial temperature distribution.

Higher frequency waves decay more quickly.

Lower frequency waves decay more quickly.

Frequency does not affect decay rate.

Higher frequency waves decay more slowly.

It determines the amplitude of the wave.

It determines the speed of wave propagation.

It determines the rate of exponential decay.

It determines the phase shift of the wave.