The half-life of a substance is how long it takes for half of the substance to decay or become harmless (for certain radioactive materials). The half-life of a substance is 37 years and there is an amount equal to 202 grams now. What is the expression for the amount A(t) that remains after t years, and what is the amount of the substance remaining (rounded to the nearest tenth) after 100 years?

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erinna erinna · Answer 1 · 2019-12-18T14:00:45+01:00

Answer:

31.0 grams.

Step-by-step explanation:

According to the given information

Half-life of a substance = 37 years

Initial amount = 202 gram

The exponential function for half-life of a substance is

[tex]A(t)=A_0(0.5)^{\frac{t}{h}}[/tex]

where, A₀ is initial amount, t is time and h is half life.

Substitute A₀=202 and h=37 in the above function.

[tex]A(t)=202(0.5)^{\frac{t}{37}}[/tex]

We need to find the amount of the substance remaining after 100 years.

Substitute t=100 in the above function.

[tex]A(100)=202(0.5)^{\frac{100}{37}}[/tex]

[tex]A(100)=31.0282146[/tex]

Round the answer to the nearest tenth.

[tex]A(100)\approx 31.0[/tex]

Therefore, the amount of the substance remaining after 100 years is 31.0 grams.