Half-life

Half-life (symbol $t½$) is the time required for a quantity (of substance) to reduce to half of its initial value. The term is commonly used in nuclear physics to describe how quickly unstable atoms undergo radioactive decay or how long stable atoms survive. The term is also used more generally to characterize any type of exponential (or, rarely, non-exponential) decay. For example, the medical sciences refer to the biological half-life of drugs and other chemicals in the human body. The converse of half-life (in exponential growth) is doubling time.

The original term, half-life period, dating to Ernest Rutherford's discovery of the principle in 1907, was shortened to half-life in the early 1950s. Rutherford applied the principle of a radioactive element's half-life in studies of age determination of rocks by measuring the decay period of radium to lead-206.

Half-life is constant over the lifetime of an exponentially decaying quantity, and it is a characteristic unit for the exponential decay equation. The accompanying table shows the reduction of a quantity as a function of the number of half-lives elapsed.

Probabilistic nature


A half-life often describes the decay of discrete entities, such as radioactive atoms. In that case, it does not work to use the definition that states "half-life is the time required for exactly half of the entities to decay". For example, if there is just one radioactive atom, and its half-life is one second, there will not be "half of an atom" left after one second.

Instead, the half-life is defined in terms of probability: "Half-life is the time required for exactly half of the entities to decay on average". In other words, the probability of a radioactive atom decaying within its half-life is 50%.

For example, the accompanying image is a simulation of many identical atoms undergoing radioactive decay. Note that after one half-life there are not exactly one-half of the atoms remaining, only approximately, because of the random variation in the process. Nevertheless, when there are many identical atoms decaying (right boxes), the law of large numbers suggests that it is a very good approximation to say that half of the atoms remain after one half-life.

Various simple exercises can demonstrate probabilistic decay, for example involving flipping coins or running a statistical computer program.

Formulas for half-life in exponential decay
An exponential decay can be described by any of the following four equivalent formulas: $$\begin{align} N(t) &= N_0 \left(\frac {1}{2}\right)^{\frac{t}{t_{1/2}}} \\ N(t) &= N_0 2^{-\frac{t}{t_{1/2}}} \\ N(t) &= N_0 e^{-\frac{t}{\tau}} \\ N(t) &= N_0 e^{-\lambda t} \end{align}$$ where
 * $N0$ is the initial quantity of the substance that will decay (this quantity may be measured in grams, moles, number of atoms, etc.),
 * $N(t)$ is the quantity that still remains and has not yet decayed after a time $1/1$,
 * $t½$ is the half-life of the decaying quantity,
 * $1/8$ is a positive number called the mean lifetime of the decaying quantity,
 * $1/16$ is a positive number called the decay constant of the decaying quantity.

The three parameters $t½$, $1/32$, and $1/64$ are directly related in the following way:$$t_{1/2} = \frac{\ln (2)}{\lambda} = \tau \ln(2)$$where $ln(2)$ is the natural logarithm of 2 (approximately 0.693).

Half-life and reaction orders
In chemical kinetics, the value of the half-life depends on the reaction order:

Zero order kinetics
The rate of this kind of reaction does not depend on the substrate concentration, $[A]$. Thus the concentration decreases linearly.


 * The integrated rate law of zero order kinetics is:

In order to find the half-life, we have to replace the concentration value for the initial concentration divided by 2: and isolate the time:This $t½$ formula indicates that the half-life for a zero order reaction depends on the initial concentration and the rate constant.

First order kinetics
In first order reactions, the rate of reaction will be proportional to the concentration of the reactant. Thus the concentration will decrease exponentially. as time progresses until it reaches zero, and the half-life will be constant, independent of concentration.

The time $t½$ for $[A]$ to decrease from $[A]0$ to $1⁄2[A]0$ in a first-order reaction is given by the following equation:It can be solved forFor a first-order reaction, the half-life of a reactant is independent of its initial concentration. Therefore, if the concentration of $A$ at some arbitrary stage of the reaction is $[A]$, then it will have fallen to $1⁄2[A]$ after a further interval of $1/128$ Hence, the half-life of a first order reaction is given as the following: $$t_{1/2} = \frac{\ln 2}{k}$$The half-life of a first order reaction is independent of its initial concentration and depends solely on the reaction rate constant, $n$.

Second order kinetics
In second order reactions, the rate of reaction is proportional to the square of the concentration. By integrating this rate, it can be shown that the concentration $[A]$ of the reactant decreases following this formula:

We replace $[A]$ for $1⁄2

[A]

0$ in order to calculate the half-life of the reactant $A$ and isolate the time of the half-life ($t½$):This shows that the half-life of second order reactions depends on the initial concentration and rate constant.

Decay by two or more processes
Some quantities decay by two exponential-decay processes simultaneously. In this case, the actual half-life $T½$ can be related to the half-lives $t1$ and $t2$ that the quantity would have if each of the decay processes acted in isolation: $$\frac{1}{T_{1/2}} = \frac{1}{t_1} + \frac{1}{t_2}$$

For three or more processes, the analogous formula is: $$\frac{1}{T_{1/2}} = \frac{1}{t_1} + \frac{1}{t_2} + \frac{1}{t_3} + \cdots$$ For a proof of these formulas, see Exponential decay § Decay by two or more processes.

Examples
There is a half-life describing any exponential-decay process. For example:
 * As noted above, in radioactive decay the half-life is the length of time after which there is a 50% chance that an atom will have undergone nuclear decay. It varies depending on the atom type and isotope, and is usually determined experimentally. See List of nuclides.
 * The current flowing through an RC circuit or RL circuit decays with a half-life of $ln(2)RC$ or $ln(2)L/R$, respectively. For this example the term half time tends to be used rather than "half-life", but they mean the same thing.
 * In a chemical reaction, the half-life of a species is the time it takes for the concentration of that substance to fall to half of its initial value. In a first-order reaction the half-life of the reactant is $ln(2)/λ$, where $1/2^{n}$ (also denoted as $100/2^{n}$) is the reaction rate constant.

In non-exponential decay
The term "half-life" is almost exclusively used for decay processes that are exponential (such as radioactive decay or the other examples above), or approximately exponential (such as biological half-life discussed below). In a decay process that is not even close to exponential, the half-life will change dramatically while the decay is happening. In this situation it is generally uncommon to talk about half-life in the first place, but sometimes people will describe the decay in terms of its "first half-life", "second half-life", etc., where the first half-life is defined as the time required for decay from the initial value to 50%, the second half-life is from 50% to 25%, and so on.

In biology and pharmacology
A biological half-life or elimination half-life is the time it takes for a substance (drug, radioactive nuclide, or other) to lose one-half of its pharmacologic, physiologic, or radiological activity. In a medical context, the half-life may also describe the time that it takes for the concentration of a substance in blood plasma to reach one-half of its steady-state value (the "plasma half-life").

The relationship between the biological and plasma half-lives of a substance can be complex, due to factors including accumulation in tissues, active metabolites, and receptor interactions.

While a radioactive isotope decays almost perfectly according to so-called "first order kinetics" where the rate constant is a fixed number, the elimination of a substance from a living organism usually follows more complex chemical kinetics.

For example, the biological half-life of water in a human being is about 9 to 10 days, though this can be altered by behavior and other conditions. The biological half-life of caesium in human beings is between one and four months.

The concept of a half-life has also been utilized for pesticides in plants, and certain authors maintain that pesticide risk and impact assessment models rely on and are sensitive to information describing dissipation from plants.

In epidemiology, the concept of half-life can refer to the length of time for the number of incident cases in a disease outbreak to drop by half, particularly if the dynamics of the outbreak can be modeled exponentially.