Prime suspect (Posted on 2008-08-31)

	Submitted by pcbouhid
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Nice work of Daniel and Dej Mar. Based on the assumption in the last phrase, the equation, using T for temperature and t for time is: dT/dt = -k*(T - 70) where k is the constant of proportionality. So: dT/(T - 70) = -k*dt Integrating both sides: ln(T - 70) = -k*t + constant T - 70 = A*e^(-k*t) where A = e^(constant) = constant At t = 9, T = 80 and at t = 10, T = 78. So, 10 = A*e^(-9*k) and 8 = A*e^(-10*k) Dividing these we have, 10/8 = e^(-9*k + 10*k) = e^k This gives k = ln(5/4) = 0.223 To find A, use 10 = A*e^(-9 * .223) = 0.1342*A So A = 10/.1342 = 74.5 The full equation is then: T = 70 + 74.5*e^(-.223*t) Normal body temperature is 98.6, so now we require the value of t for when T = 98.6: 98.6 - 70 = 74.5*e^(-.223*t) 28.6/74.5 = e^(-.223*t) .3839 = e^(-.223*t) ln(.3839) = -.223*t -.9574 = -.223t t = .9574/.223 t = 4.293 This corresponds to 4:17 a.m., so you need to think of someone who can prove what you were doing at 4:17 a.m.

	Subject	Author	Date
	Solution	Dej Mar	2008-08-31 22:11:26
	re: solution (spoiler)	Daniel	2008-08-31 13:52:25
	solution (spoiler)	Daniel	2008-08-31 13:22:02