Answer:
[tex]A^{-1}(t)=-\frac{ln(\frac{t}{300})}{0.013}[/tex]
Step-by-step explanation:
we have
[tex]A=300e^{-0.013t}[/tex]
Exchange the variables A for t and t for A
[tex]t=300e^{-0.013A}[/tex]
Isolate the variable A
[tex]\frac{t}{300}=e^{-0.013A}[/tex]
Apply ln (natural logarithm) both sides
[tex]ln(\frac{t}{300})=ln[e^{-0.013A}][/tex]
[tex]ln(\frac{t}{300})=(-0.013A)ln(e)[/tex]
Remember that
[tex]ln(e)=1[/tex]
[tex]ln(\frac{t}{300})=(-0.013A)[/tex]
[tex]A=-\frac{ln(\frac{t}{300})}{0.013}[/tex]
Let
[tex]A^{-1}(t)=A[/tex]
so
[tex]A^{-1}(t)=-\frac{ln(\frac{t}{300})}{0.013}[/tex]
