The half-life of Radium-226 is 1590 years. If a sample contains 500 mg, how many mg will remain after 2000 years? Preview mg Give your answer accurate to at least 2 decimal plac…

Question

asked Nov 1, 2020 111k views

1 Answer

Helene · Answer 1 · 2020-11-05T12:18:23+0000

Answer:

a_(n) =209.09 mg

Explanation:

given: material= radium

half life= 1590 years

initial mass
a_(0) =500mg

we know that to calculate the amount left we use

a_(n) =
a_(0)
$\left ( 0.5\right )^(n)$

n=(2000)/(1590) = 1.2578

therefore

a_(n) =
500*0.5^(1.2578)

a_(n) =209.09058407921 mg

a_(n) =209.09 mg amount left after 2000 years