Answer:
[tex] 2.5523\times 10^{11} atoms/seconds [/tex]is the activity, measured in of a 50 mg sample of 90-Sr.
Explanation:
Half life of the 90-Sr ,[tex]t_{1/2}= 28.8 years[/tex]
Activity coefficient of the 90-Sr = [tex]\lambda [/tex]
[tex]\lambda =\frac{0.693}{28.8 years}=0.0240625 year^{-1}[/tex]
Mass of 90-Sr = 50 mg = 0.050 g
Molecular mass of 90-Sr = 90 g/mol
Moles of 90-Sr =[tex]\frac{0.050 g}{90 g/mol}=0.0005555 mol[/tex]
Number of atom in 0.0005555 moles of 90-Sr:
[tex]0.0005555 mol\times 6.022\times 10^{23} mol^{-1}=3.3455\times 10^{20} atoms[/tex]
[tex]\lambda =0.0240625 year^{-1}=\frac{0.0240625}{3.154\times 10^7 s}=7.6292\times 10^{-10} s^{-1}[/tex]
1 year = [tex]3.154\times 10^7 seconds[/tex]
Activity measured in atoms per seconds:
= Number of atoms × [tex]\lambda [/tex]
[tex]=3.3455\times 10^{20} atoms\times 7.6292\times 10^{-10} s^{-1}[/tex]
[tex]=2.5523\times 10^{11} atoms/s[/tex]
