Radioactivity formula using differential equations?

Question

After $12$ days, a $40$ gram substance decays to $9.3$ grams. If the decay rate is proportional to the amount of substance left, how much of the substance will be left after $37$ days?
I solved it using the formula $y=ce^{-kt}$. I used $-k$ instead of $k$ because it is a decay function. I found $k$ by plugging in $(12, 9.3)$, then used that $k$ to find $y$ when $t = 37$. For -k, I got -ln(9.3/40), and so the equation would be y=40e^(-37(ln(9.3/40)/12)). However I got $89$ for y, which was incorrect, so can someone please point out where I made a mistake? Thank you in advance!

alex.jordan · Answer

There is some confusion with that negative sign in the exponent.
If you are using $-k$ as the coefficient in the exponent, then you are expecting $k$ itself to be positive. You say you found $-k$ to be $-ln(9.3/40)$, which would mean $k$ was $ln(9.3/40)$. But $ln(9.3/40)$ is negative, despite the lack of a negative sign in that expression. Really, $-k=ln(9.3/40)$, so where you wrote
$$y=40e^{-37(ln(9.3/40)/12)}$$
it should be
$$y=40e^{37(ln(9.3/40)/12)}approx0.445$$

Also you say you got $89$ for $y$. This is (very close to) what I get if I put that negative sign back in and omit the $40$ at the front, so two issues:
$$e^{-37(ln(9.3/40)/12)}approx89.85$$
Maybe this is what happened. Maybe with a little rounding error too.

SarGe · Answer

$$y=40(e^{-kt})\ 
k=frac{1}{12}lnleft(frac{40}{9.3}right)\ 
(y) _{t=37}=40(e^{-frac{1}{12}lnleft(frac{40}{9.3}right) 37})\ 
y=40left(frac{9.3}{40}right) ^{frac{37}{12}}$$
My calculations give $y=0.445$.

user577215664 · Answer

$$y=ce^{-kt}$$
The constant $k$ is not correct:
$$ 9.3=40e^{-12k}$$
$$k=-dfrac 1 {12}ln left( dfrac  {9.3}{40} right)$$
So that you have:
$$y=40e^{-37k}$$
$$y=40e^{dfrac {37} {12}ln left( dfrac  {9.3}{40} right)}$$
$$y=40left( dfrac  {9.3}{40} right)^{dfrac {37} {12}}$$

Radioactivity formula using differential equations?

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