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Prime suspect (Posted on 2008-08-31) Difficulty: 3 of 5
You come into your professor's office to ask some questions shortly before 9:00 a.m. on Friday.

You find him lying on the floor of his office in a pool of chalk dust, dead.

You quickly call the police and their investigators take several measurements over the next hour, including:
1) the body temperature at 9:00 a.m. - 80 degrees.
2) the body temperature at 10:00 a.m. - 78 degrees
3) room temperature - 70 degrees (constant)

You realize that the police believe you to be a prime suspect, so you need an alibi. You know that you were studying with friends until 3:00 a. m., but you aren't sure if that is enough information. You need to know the time of death!

Assuming that the difference between body temperature and room temperature changes at a rate proportional to that difference, and that the normal body temperature is 98.6 degrees, how good is your alibi?

See The Solution Submitted by pcbouhid    
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re: solution (spoiler) | Comment 2 of 3 |
(In reply to solution (spoiler) by Daniel)

just thought I'd show how I got T(x)=k*a^x.  from the explanation dT/dx=-k*T  and solving this differential equation and rearranging k and the constant from integration you see that T(x)=k*a^x
  Posted by Daniel on 2008-08-31 13:52:25

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