Answer:
The amount of phosphorus-32 left after 100.1 days is 9.3 g.
Step-by-step explanation:
Given:
Initial amount of Phosphorus-32 is, [tex]N_0=1200\ g[/tex]
Time period of decay is, [tex]t=100.1\ days[/tex]
Half life of the block is, [tex]t_{1/2}=14.3\ days[/tex]
Now, final amount left is, [tex]N=?[/tex]
We know that, the decay equation for a radioactive material is given as:
[tex]N=N_0e^{-kt}\\k\to decay\ constant[/tex]
The value of the decay constant is given as:
[tex]k=\frac{\ln 2}{t_{1/2}}\\\\k=\frac{0.693}{14.3}=0.0485[/tex]
Now, plug in all the given values and calculate 'N'. This gives,
[tex]N=(1200)e^{(-0.0485\times 100.1)}\\\\N=9.349\approx 9.3\ g[/tex]
Therefore, the amount of phosphorus-32 left after 100.1 days is 9.3 g
