exponential decay

Exponential decay occurs in the same way when the growth rate is negative.

It is expected that the system will experience exponential decay with time in the temperature of a body.

It would be an exponential decay process, once started.

Often the linear response takes the form of one or more exponential decays.

It is a characteristic unit for the exponential decay equation.

The main fact in the subcritical phase is "exponential decay".

In the early 20th century, radioactive materials were known to have characteristic exponential decay rates or half lives.

The emission in both curves then peaks at around 60 seconds before a long exponential decay.

In simple cases, an exponential decay is measured which is described by the time.

Exponential decay occurs in a wide variety of situations.

An overdamped system will simply return to equilibrium via an exponential decay.

Heat transfer experiments yield results whose best fit line are exponential decay curves.

The activity will be decrease in a time-dependent manner, usually following exponential decay.

It could be that there's an exponential decay.

A quantity is subject to exponential decay if it decreases at a rate proportional to its value.

Surprisingly, for short times they found a deviation from the exponential decay law in the survival probability.

The time required to do so is the so-called relaxation time; an exponential decay.

Radioactivity is one very frequent example of exponential decay.

The simplest approach is to treat the first order autocorrelation function as a single exponential decay.

Here we see that gives an exponential decay, as expected from the Beer-Lambert law.

Unstable quantum systems are predicted to exhibit a short time deviation from the exponential decay law.

This is the form of the equation that is most commonly used to describe exponential decay.

An exponential decay process can be described by any of the following three equivalent formulas:

The rate of exponential decay is evaluated explicitly.

This function property leads to exponential growth and exponential decay.