Answer:
the answer is 31.9 years
Step-by-step explanation:
initial mass, [tex]M_{0}[/tex] = 150 gram
half life, [tex]t_{half\hspace{0.1cm}life}[/tex] = 32 years
new mass = half of initial mass = M = 0.5[tex]M_{0}[/tex]
formula , M = [tex]M_{0}[/tex] [tex]e^{\frac{\ln\frac{1}{2}}{t_{half} }\times x }[/tex] where x is the number of years required.
therefore 0.5 [tex]M_{0}[/tex] = [tex]M_{0}[/tex] [tex]e^{\frac{\ln\frac{1}{2}}{t_{half} }\times x } = M_{0} e^{-0.0217x}[/tex]
therefore -0.0217 x = [tex]\ln{0.5} = -0.693[/tex]
therefore x = [tex]\frac{-0.693}{-0.0217}[/tex] = 31.942
