Answer:
A=152
K= -Ln(0.5)/14
Step-by-step explanation:
You can obtain two equations with the given information:
T(14 minutes) = 114◦C
T(28 minutes)=152◦C
Therefore, you have to replace t=14, T=114 and t=28, T=152 in the given equation:
[tex]114=190-Ae^{-14k} (I) \\152=190-Ae^{-28k}(II)[/tex]
Applying the following property of exponentials numbers in (II):
[tex]e^{a}.e^{b}=e^{a+b}[/tex]
Therefore [tex]e^{-28k}[/tex] can be written as [tex]e^{-14k}.e^{-14k}[/tex]
[tex]152=190-Ae^{-14k}.e^{14k}[/tex]
Replacing (I) in the previous equation:
[tex]152=190-76e^{-14k}[/tex]
Solving for k:
Subtracting 190 both sides, dividing by -76:
[tex]0.5=e^{-14k}[/tex]
Applying the base e logarithm both sides:
Ln(0.5)= -14k
Dividing by -14:
k= -Ln(0.5)/14
Replacing k in (I) and solving for A:
[tex]Ae^{-14(-Ln(0.5)/14)}=76\\Ae^{Ln(0.5)} =76\\A(0.5)=76[/tex]
Dividing by 0.5
A=152
