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Sagot :
Answer:
a)39.37 mg
b) 20 hours
Step-by-step explanation:
Half-Life N(t)=No(12)th N= final amount No= initial amount t= time h= half-life Iodine-123 is sometimes used in thyroid scans and has a half-life of 15 hours.
a) How much of a 250 mg sample would remain after 40 hours (round to hundredths)?
We are to find N(t)
N(t) = No (1/2)^t/t½
No = 250mg
t = 40 hours
t½ = 15 hours
N(t) = 250 (1/2)^40/15
N(t) = 39.372532809215 mg
Approximately = 39.37 mg
b) How much time does it take for 250 mg to decay to 100 mg (round to the nearest hour)? Use logarithms to solve it algebraically.
We are to find time t
t = t½ (In Nt/No)/- In 2
t = 15 × (In 100/250)/ -In2
t = 19.82892142331 hours
Approximately = 20 hours
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