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12 April, 14:52

Every chemical element goes through natural exponential decay, which means that over time its atoms fall apart. The speed of each element's decay is described by its half-life, which is the amount of time it takes for the number of radioactive atoms of this element to be reduced by half. The half-life of the isotope dubnium-263 is 29 seconds. A sample of dubnium-263 was first measured to have 1024 atoms. After t seconds, there were only 32 atoms of this isotope remaining. Write an equation in terms of t that models the situation.

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  1. 12 April, 15:26
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    An equation that models the problem is 1024x (1/2) ^t/29=32
  2. 12 April, 18:19
    0
    t = ln (N/N°) / (-0.0239)

    Explanation:

    The decay law is represented as

    N = N°e^-kt

    Where N is the final number of atom,

    N° is the initial number of atoms

    k is the decay constant

    t is the half-life.

    From the above we have,

    N/N° = e^-kt

    take ln of both sides

    ln (N/N°) = - kt

    t = ln (N/N°) / -k

    At half life, N/N° = 1/2

    Therefore, t = (ln 1/2) / -k

    t = - 0.693/-k

    But t = 29 sec

    29 = - 0.693/-k

    k = 0.0239 s^-1

    Therefore,

    The formula will be

    t = ln (N/N°) / (-0.0239)
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