1 Answer

Yzt · Answer 1 · 2020-01-10T05:54:59+0000

Answer:

58.0 days

Explanation:

The equation for the radioactive decay is

$m(t)=m_0 ((1)/(2))^{-t/t_(1/2)}$

where

m(t) is the mass of the sample left at time t

m_0 is the initial mass of the sample

t_(1/2) is the half-life

For the phosporus-32 isotope in the problem, we have:

t_(1/2)=14.3 d (half-life in days)

m_0 = 50 mg is the initial mass

m(t)=3 mg is the mass at time t

Solving for t, we find the time needed for the sample to reduce to 3 mg:

$(m(t))/(m_0) = ((1)/(2))^{-t/t_(1/2)}\\t=-t_(1/2) ln_(1/2) ((m)/(m_0))=-(14.3) ln_(1/2) ((50)/(3))=58.0 d$

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