World Library  
Flag as Inappropriate
Email this Article

Elimination half-life

Article Id: WHEBN0001186868
Reproduction Date:

Title: Elimination half-life  
Author: World Heritage Encyclopedia
Language: English
Subject: Eicosanoid, Metoprolol, Guanfacine, 5-HT3 antagonist
Collection:
Publisher: World Heritage Encyclopedia
Publication
Date:
 

Elimination half-life

The biological half-life or elimination half-life of a substance is the time it takes for a substance (for example a metabolite, drug, signalling molecule, radioactive nuclide, or other substance) to lose half of its pharmacologic, physiologic, or radiologic activity, as per the MeSH definition. In a medical context, half-life may also describe the time it takes for the blood plasma concentration of a substance to halve (plasma half-life) its steady-state. The relationship between the biological and plasma half-lives of a substance can be complex depending on the substance in question, due to factors including accumulation in tissues, active metabolites, and receptor interactions.[1]

Biological half-life is an important pharmacokinetic parameter and is usually denoted by the abbreviation \scriptstyle t_\frac{1}{2}.[2]

While a radioactive isotope decays perfectly according to first order kinetics where the rate constant is fixed, the elimination of a substance from a living organism, into the environment, follows more complex kinetics. See the article rate equation.

Examples of biological half-lives

Water

The biological half-life of water in a human is about 7 to 14 days. It can be altered by behavior. Drinking large amounts of alcohol will reduce the biological half-life of water in the body.[3][4] This has been used to decontaminate humans who are internally contaminated with tritiated water (tritium). Drinking the same amount of water would have a similar effect, but many would find it difficult to drink a large volume of water. The basis of this decontamination method (used at Harwell) is to increase the rate at which the water in the body is replaced with new water.

Alcohol

The removal of ethanol (drinking alcohol) through oxidation by alcohol dehydrogenase in the liver from the human body is limited. Hence the removal of a large concentration of alcohol from blood may follow zero-order kinetics. Also the rate-limiting steps for one substance may be in common with other substances. For instance, the blood alcohol concentration can be used to modify the biochemistry of methanol and ethylene glycol. In this way the oxidation of methanol to the toxic formaldehyde and formic acid in the (human body) can be prevented by giving an appropriate amount of ethanol to a person who has ingested methanol. Note that methanol is very toxic and causes blindness and death. A person who has ingested ethylene glycol can be treated in the same way. Half life is also relative to the subjective metabolic rate of the individual in question.

Common prescription medications

Substance Biological Half-life
Adenosine <10 seconds
Norepinephrine 2 minutes
Oxaliplatin 14 minutes[5]
Salbutamol 1.6 hours
Zaleplon 1–2 hours
Morphine 2–3 hours
Methadone 15 hours to 3 days, in rare cases up to 8 days[6]
Buprenorphine 16–72 hours
Clonazepam 18–50 hours
Diazepam 20–100 hours (active metabolite, nordazepam 1.5–8.3 days)
Flurazepam 0.8–4.2 days (active metabolite, desflurazepam 1.75–10.4 days)
Donepezil 70 hours (approx.)
Fluoxetine 4–6 days (active lipophilic metabolite 4–16 days)
Dutasteride 5 weeks

Metals

The biological half-life of caesium in humans is between one and four months. This can be shortened by feeding the person prussian blue. The prussian blue in the digestive system acts as a solid ion exchanger which absorbs the caesium while releasing potassium ions.

For some substances, it is important to think of the human or animal body as being made up of several parts, each with their own affinity for the substance, and each part with a different biological half-life (physiologically-based pharmacokinetic modelling). Attempts to remove a substance from the whole organism may have the effect of increasing the burden present in one part of the organism. For instance, if a person who is contaminated with lead is given EDTA in a chelation therapy, then while the rate at which lead is lost from the body will be increased, the lead within the body tends to relocate into the brain where it can do the most harm.

  • Polonium in the body has a biological half-life of about 30 to 50 days.
  • Caesium in the body has a biological half-life of about one to four months.
  • Mercury (as methylmercury) in the body has a half-life of about 65 days.
  • Lead in bone has a biological half-life of about ten years.
  • Cadmium in bone has a biological half-life of about 30 years.
  • Plutonium in bone has a biological half-life of about 100 years.
  • Plutonium in the liver has a biological half-life of about 40 years.

Rate equations

First-order elimination

There are circumstances where the half-life varies with the concentration of the drug. Thus the half-life, under these circumstances, is proportional to the initial concentration of the drug A0 and inversely proportional to the zero-order rate constant k0 where:

t_\frac{1}{2} = \frac{0.5 A_{0}}{k_{0}} \,

This process is usually a logarithmic process - that is, a constant proportion of the agent is eliminated per unit time.[7] Thus the fall in plasma concentration after the administration of a single dose is described by the following equation:

C_{t} = C_{0} e^{-kt} \,

The relationship between the elimination rate constant and half-life is given by the following equation:

k = \frac{\ln 2}{t_\frac{1}{2}} \,

Half-life is determined by clearance (CL) and volume of distribution (VD) and the relationship is described by the following equation:

t_\frac{1}{2} = \frac{CL} \,

In clinical practice, this means that it takes 4 to 5 times the half-life for a drug's serum concentration to reach steady state after regular dosing is started, stopped, or the dose changed. So, for example, digoxin has a half-life (or t½) of 24–36 h; this means that a change in the dose will take the best part of a week to take full effect. For this reason, drugs with a long half-life (e.g., amiodarone, elimination t½ of about 58 days) are usually started with a loading dose to achieve their desired clinical effect more quickly.

Sample values and equations

Characteristic Description Example value Symbol Formula
Dose Amount of drug administered. 500 mg D Design parameter
Dosing interval Time between drug dose administrations. 24 h \tau Design parameter
Cmax The peak plasma concentration of a drug after administration. 60.9 mg/L C_\text{max} Direct measurement
tmax Time to reach Cmax. 3.9 h t_\text{max} Direct measurement
Cmin The lowest (trough) concentration that a drug reaches before the next dose is administered. 27.7 mg/L C_{\text{min}, \text{ss}} Direct measurement
Volume of distribution The apparent volume in which a drug is distributed (i.e., the parameter relating drug concentration to drug amount in the body). 6.0 L V_\text{d} = \frac{D}{C_0}
Concentration Amount of drug in a given volume of plasma. 83.3 mg/L C_{0}, C_\text{ss} = \frac{D}{V_\text{d}}
Elimination half-life The time required for the concentration of the drug to reach half of its original value. 12 h t_\frac{1}{2} = \frac{ln(2)}{k_\text{e}}
Elimination rate constant The rate at which a drug is removed from the body. 0.0578 h−1 k_\text{e} = \frac{ln(2)}{t_\frac{1}{2}} = \frac{CL}{V_\text{d}}
Infusion rate Rate of infusion required to balance elimination. 50 mg/h k_\text{in} = C_\text{ss} \cdot CL
Area under the curve The integral of the concentration-time curve (after a single dose or in steady state). 1,320 mg/L·h AUC_{0 - \infty} = \int_{0}^{\infty}C\, \operatorname{d}t
AUC_{\tau, \text{ss}} = \int_{t}^{t + \tau}C\, \operatorname{d}t
Clearance The volume of plasma cleared of the drug per unit time. 0.38 L/h CL = V_\text{d} \cdot k_\text{e} = \frac{D}{AUC}
Bioavailability The systemically available fraction of a drug. 0.8 f = \frac{AUC_\text{po} \cdot D_\text{iv}}{AUC_\text{iv} \cdot D_\text{po}}
Fluctuation Peak trough fluctuation within one dosing interval at steady state 41.8 % %PTF = \frac{C_{\text{max}, \text{ss}} - C_{\text{min}, \text{ss}}}{C_{\text{av}, \text{ss}}} \cdot 100
where
C_{\text{av},\text{ss}} = \frac{1}{\tau}AUC_{\tau, \text{ss}}
[]

See also

References

This article was sourced from Creative Commons Attribution-ShareAlike License; additional terms may apply. World Heritage Encyclopedia content is assembled from numerous content providers, Open Access Publishing, and in compliance with The Fair Access to Science and Technology Research Act (FASTR), Wikimedia Foundation, Inc., Public Library of Science, The Encyclopedia of Life, Open Book Publishers (OBP), PubMed, U.S. National Library of Medicine, National Center for Biotechnology Information, U.S. National Library of Medicine, National Institutes of Health (NIH), U.S. Department of Health & Human Services, and USA.gov, which sources content from all federal, state, local, tribal, and territorial government publication portals (.gov, .mil, .edu). Funding for USA.gov and content contributors is made possible from the U.S. Congress, E-Government Act of 2002.
 
Crowd sourced content that is contributed to World Heritage Encyclopedia is peer reviewed and edited by our editorial staff to ensure quality scholarly research articles.
 
By using this site, you agree to the Terms of Use and Privacy Policy. World Heritage Encyclopedia™ is a registered trademark of the World Public Library Association, a non-profit organization.
 


Copyright © World Library Foundation. All rights reserved. eBooks from Project Gutenberg are sponsored by the World Library Foundation,
a 501c(4) Member's Support Non-Profit Organization, and is NOT affiliated with any governmental agency or department.