Half-life: Difference between revisions
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The average lifetime arises when using the number ''e'', rather than 1/2, as the base value in an exponential decay equation: | The average lifetime arises when using the number ''e'', rather than 1/2, as the base value in an exponential decay equation: | ||
:<math>C_1 = C_0 \ e^{-\frac{\Delta t}{t_{avg}}}</math> | :<math>C_1 = C_0 \ e^{-\frac{\Delta t}{t_{avg}}}</math>[[Category:Suggestion Bot Tag]] |
Latest revision as of 06:00, 25 August 2024
For any reactant subject to first-order decomposition, the amount of time needed for one half of the substance to decay is referred to as the half-life of that compound. Although the term is often associated with radioactive decay, it also applies equally to chemical decomposition, such as the decomposition of azomethane (CH3N=NCH3) into methane and nitrogen gas. Many compounds decay so slowly that it is impractical to wait for half of the material to decay to determine the half-life. In such cases, a convenient fact is that the half-life is 693 times the amount of time required for 0.1% of the substance to decay. Using the value of the half-life of a compound, one can predict both future and past quantities.
Note: The approximation is used in this article.
Mathematics
The future concentration of a substance, C1, after some passage of time , can easily be calculated if the present concentration C0 and the half-life th are known:
For a reaction is the first-order for a particular reactant A, and first-order overall, the chemical rate constant for the reaction k is related to the half-life by this equation:
Average Lifetime
For a substance undergoing exponential decay, the average lifetime tavg of the substance is related to the half-life via the equation
- .
The average lifetime arises when using the number e, rather than 1/2, as the base value in an exponential decay equation: