Advanced High-School Mathematics

(Tina Meador) #1

SECTION 6.2 Continuous Random Variables 359


onk. This says that during the game we don’t “age”; our probability
of dying at the next stage doesn’t increase with age (k).
We now turn this process into a continuous process, where we can
die at any timet≥0 and not just at integer times. We want the process
to enjoy essentially the same condition as the geometric, namely that
if X now denotes the present random variable, then the conditional
probability P(X = t+τ|X ≥ t) should depend on τ but not on t.
In analogy with the above, this conditional probability represents the
probability of living to timet+τ, given that we have already livedt
units of time.
We letf represent the density function ofX; the above requirement
says that


∫t+τ
∫t∞ f(s)ds
t f(s)ds

= function ofτ alone. (∗)

We denote byF an antiderivative off satisfyingF(∞) = 0.^18 There-
fore,


1 =

∫∞
0
f(s)ds = F(s)

∣∣
∣∣


0

=−F(0),

and soF(0) =−1.


Next, we can write (*) in the form

F(t+τ)−F(t)
−F(t)
= g(τ),

for some functiong. This implies that the quotient


F(t+τ)
F(t)

doesn’t

depend ont. Therefore, the derivative with respect totof this quotient
is 0:


F′(t+τ)F(t)−F(t+τ)F′(t)
F(t)^2

= 0,

forcing


(^18) Since
∫∞
0
f(s)ds= 1, we see thatFcannot be unbounded at∞.

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