From the y-intercept: [latex]A_0=500[/latex]. Use the second point to solve for [latex]r[/latex]: [latex]500e^{5r}=402 ;\Rightarrow; e^{5r}=\frac{402}{500} ;\Rightarrow; r=\frac{1}{5}\ln!\Big(\frac{402}{500}\Big)\approx -0.095.[/latex] Model: [latex]A(t)=500e^{-0.095t}[/latex]. (Equivalently, [latex]A(t)=500,(e^{-0.095})^{t}\approx 500(0.909)^{t}[/latex].)

1. Read the asymptote (ambient temperature): [latex]T_s=10[/latex].
2. Read the initial temperature: [latex]T_0=80\Rightarrow A=T_0-T_s=70[/latex].
3. Use the point [latex](20,30)[/latex] to solve for [latex]k[/latex]:

\begin{align}
30 &= 10 + 70e^{20k} \\
20 &= 70e^{20k} \\
e^{20k} &= \frac{2}{7} \\
20k &= \ln\left(\frac{2}{7}\right) \\
k &= \frac{1}{20}\ln\left(\frac{2}{7}\right) \\
k &\approx -0.0627
\end{align}

Model: [latex]\displaystyle T(t)=70e^{-0.0627t}+10.[/latex]