# Probability of event

Here is a probability problem: you observe .5 cars on average passing in front of you every 5 minutes on a road. What is the probability of seeing at least 1 car in 10 minutes?

I'm trying to solve this in 2 ways. The first way is to say: P(no car in 5 minutes) = 1 - .5 = .5. P(no car in first 5 minutes and no car in second 5 minutes) = P(no car in first 5 minutes) * P(no car in second 5 minutes) by independence. Therefore P(at least 1 car in 10 minutes) = 1 - .5*.5 = .75.

However, if I try the same, with a Poisson distribution with rate lambda = .5 per unit of time, for 2 units of time, I get: P(at least 1 car in 2 units of time) = 1 - exp(-2*lambda) = .63.

Am I doing something wrong? If not, what explains the discrepancy?

Thanks!

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–  Kirk Woll May 18 '12 at 16:30
"P(no car in 5 minutes)" - I don't see how you could calculate this... –  Karoly Horvath May 18 '12 at 16:37
Yes, I'm realizing that now... I can only claim that E[n of cars in 5 minutes] = .5. –  Frank May 18 '12 at 16:40
Does that mean my first calculation is wrong, but the one based on Poisson is correct? –  Frank May 18 '12 at 16:42