Answer:
6 billion years.
Step-by-step explanation:
According to the decay law, the amount of the radioactive substance that decays is proportional to each instant to the amount of substance present. Let be the amount of and be the amount of after years.
Then, we obtain two differential equations
where and are proportionality constants and the minus signs denotes decay.
Rearranging terms in the equations gives
Now, the variables are separated, and appear only on the left, and appears only on the right, so that we can integrate both sides.
which yields
,
where and are constants of integration.
By taking exponents, we obtain
Hence,
,
where and .
Since the amounts of the uranium isotopes were the same initially, we obtain the initial condition
Substituting 0 for in the general solution gives
Similarly, we obtain and
The relation between the decay constant and the half-life is given by
We can use this fact to determine the numeric values of the decay constants and . Thus,
and
Therefore,
We have that
Hence,
Solving for yields , which means that the age of the universe is about 6 billion years.