Respuesta :
Answer
35°F
Step-by-step explanation:
[tex]T= C + (T_0 - C)e^{kt}[/tex]
C is the temperature of environment = 0°F
T_0 is the initial temperature of object = 102°F
t is the time period = 8
Plug in all the values and solve for k
[tex]T= 0 + (102 - 0)e^{k(8)}[/tex]
WE know T is 52.5°F after 8 minutes
solve for k
[tex]52.5= 102e^{8k}[/tex]
Divide both sides by 102
[tex]\frac{52.5}{102} = e^{8k}[/tex]
Take ln on both sides
[tex]ln\frac{52.5}{102} = lne^{8k}[/tex]
[tex]ln\frac{52.5}{102} = 8k[/tex]
Divide both sides by 8
k=-0.08302
[tex]T= 0 + (102 - 0)e^{k(t)}[/tex]
Now we find out T when t= 13
[tex]T= 0 + (102 - 0)e^{-0.08302(13)}[/tex]
T= 34.66°F
So T= 35°F
