Intermediate Algebra

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Half-Life

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Intermediate Algebra

Definition

Half-life is the time it takes for a radioactive substance to decay to half of its original amount. It is a fundamental concept in exponential functions and is widely used in various fields, including nuclear physics, chemistry, and biology.

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5 Must Know Facts For Your Next Test

  1. The half-life of a radioactive substance is independent of the initial amount of the substance.
  2. The amount of a radioactive substance remaining after a certain number of half-lives can be calculated using the exponential decay formula.
  3. Half-life is used to determine the rate of radioactive decay and to estimate the age of geological and archaeological samples.
  4. The concept of half-life is essential in understanding the behavior of radioactive materials and their applications in various industries, such as nuclear power and medical imaging.
  5. The half-life of a radioactive substance is a constant value that is unique to that particular isotope and does not change under normal conditions.

Review Questions

  • Explain how the concept of half-life is used to describe the exponential decay of radioactive substances.
    • The half-life of a radioactive substance is the time it takes for the amount of the substance to decrease to half of its original value. This exponential decay can be modeled using the formula $A(t) = A_0 \cdot 2^{-t/t_{1/2}}$, where $A(t)$ is the amount of the substance remaining at time $t$, $A_0$ is the initial amount, and $t_{1/2}$ is the half-life of the substance. By understanding the half-life of a radioactive material, scientists can predict the rate of decay and the remaining amount of the substance over time.
  • Describe how the concept of half-life is used to determine the age of geological and archaeological samples.
    • The half-life of radioactive isotopes is used in radiometric dating techniques to determine the age of various geological and archaeological samples. By measuring the ratio of the remaining radioactive isotope to its stable decay product, scientists can calculate the time since the sample was formed or last heated. This is possible because the rate of radioactive decay, and therefore the half-life of the isotope, is known and remains constant. The longer the half-life of the isotope, the older the sample can be dated, making half-life a crucial parameter in these dating methods.
  • Evaluate how the concept of half-life is applied in the field of nuclear power and medical imaging.
    • The half-life of radioactive isotopes is essential in the field of nuclear power and medical imaging. In nuclear power plants, the half-life of radioactive waste products determines the storage and disposal requirements, as the material becomes less radioactive over time. In medical imaging, radioactive tracers with specific half-lives are used to diagnose and monitor various medical conditions. The half-life of the tracer determines the time window for imaging, as the tracer's radioactivity decreases over time. By understanding and manipulating the half-life of radioactive substances, scientists and engineers can harness the benefits of radioactivity while minimizing the risks associated with it.

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