where
is the activity at
. This equation shows exponential decay of radioactive nuclei. For example, if a source originally has a 1.00-mCi activity, it declines to 0.500 mCi in one half-life, to 0.250 mCi in two half-lives, to 0.125 mCi in three half-lives, and so on. For times other than whole half-lives, the equation
must be used to find
.
Phet explorations: alpha decay
Watch alpha particles escape from a polonium nucleus, causing radioactive alpha decay. See how random decay times relate to the half life.
Test prep for ap courses
A radioactive sample has N atoms initially. After 3 half-lives have elapsed, how many atoms remain?
When
decays, the product is
The half-life of this decay process is 1.78 ms. If the initial sample contains 3.4 x 10
17 parent nuclei, how many are remaining after 35 ms have elapsed? What kind of decay process is this (alpha, beta, or gamma)?
This must be alpha decay since 4 nucleons (2 positive charges) are lost from the parent nucleus. The number remaining is found from:
Half-life
is the time in which there is a 50% chance that a nucleus will decay. The number of nuclei
as a function of time is
where
is the number present at
, and
is the decay constant, related to the half-life by
One of the applications of radioactive decay is radioactive dating, in which the age of a material is determined by the amount of radioactive decay that occurs. The rate of decay is called the activity
:
The SI unit for
is the becquerel (Bq), defined by
is also expressed in terms of curies (Ci), where
The activity
of a source is related to
and
by
Since
has an exponential behavior as in the equation
, the activity also has an exponential behavior, given by
where
is the activity at
.
Conceptual questions
In a
-year-old rock that originally contained some
, which has a half-life of
years, we expect to find some
remaining in it. Why are
,
, and
also found in such a rock, even though they have much shorter half-lives (1600 years, 3.8 days, and 138 days, respectively)?
Does the number of radioactive nuclei in a sample decrease to
exactly half its original value in one half-life? Explain in terms of the statistical nature of radioactive decay.
Radioactivity depends on the nucleus and not the atom or its chemical state. Why, then, is one kilogram of uranium more radioactive than one kilogram of uranium hexafluoride?
Spontaneous radioactive decay occurs only when the decay products have less mass than the parent, and it tends to produce a daughter that is more stable than the parent. Explain how this is related to the fact that more tightly bound nuclei are more stable. (Consider the binding energy per nucleon.)