As wavelength decreases, this property increases.

In the time-independent schrodinger equation, this term represents potential energy

A valid wavefunction must be this so total probability equals 1

an operator acting on a wavefunction may produce the same wavfunction multiplied by this quantity

This relationship connects wavelength and momentum

Planck proposed that electromagnetic energy is emitted in these discrete packets

For a free particle, the potential energy everywhere equals this

The interpretation connects wavefunctions to probability

These physical quantities can be measured experimentally

Quantum mechanics predicts that energy can only exist in these allowed values 

This classical theory incorrectly predicted infinite radiation intensity at short wavelength

According to de Brogile, particles exhibit this wave-like property

If a wavefunction changes sign, the probability density changes by this amount

operators associated with observables must possess this math. property

This phenomenon occurs when waves combine to produce reinforcement or cacellation