Thus, the transmission coefficient is low, which calls for a large heating surface area.

The reflection coefficient is closely related to the transmission coefficient.

By studying films of varying thickness it has been noted that a rapidly growing transmission coefficient occurs, under the appropriate conditions.

Transition state theory requires a value of the transmission coefficient as a prefactor in the Eyring equation above.

The transmission coefficient is needed for host parasite models.

The transmission coefficient is defined in terms of the incident and transmitted probability current density j according to:

If the transmission coefficient is much less than 1, it can be approximated with the following formula:

The value of the transmission coefficient is inversely related to the quality of the line, circuit, channel or trunk.

And so the transmission coefficient is 1 and there is no reflection.

The transmission coefficient is always larger than zero, and approaches 1 as the potential step goes to infinity.