Traffic on Rosedale Road in Princeton, NJ, follows a Poisson process with rate6cars per minute. Adeer runs out of the woods and tries to cross the road. It takes the deer a rand…

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asked Jan 28, 2022 62.4k views

1 Answer

ZachP · Answer 1 · 2022-02-02T04:20:29+0000

Answer:

Explanation:

From the given information:

6 cars pass on the road per minute. This implies that per minute, we will have:

6/60 passes = 0.1 car passing the road per second

Thus, for 5 sec; we have:

5 × 0.1 = 0.5

Let assume X signifies to be a random variable which denote the no of cars in the next 5 minutes and which follows a Poisson distribution.

i.e.

$X \sim Poisson (0.5)$

$\text{P(collision occurs) = 1 - P(no car coming in the following 5 seconds)} \\ \\ =1 - P(X=0)$

= 1- ([e^(-0.5* 0.5^0)])/(0!)

= 1 - e^(-0.5)

= 1 - 0.6065

= 0.3935

However, the possibility of collision supposes the deer requires 2 seconds to cross the road can be computed as follows:

Suppose Y denote the arbitrary variable that addresses the no. of cars passing the road in 2 secs, then;

$Y \sim Poisson (0.2)$

$\text{P(collision occurs) = 1 - P(no car coming in the following 2 seconds)} \\ \\ =1 - P(Y=0)$

= 1- ([e^(-0.2* 0.2^0)])/(0!)

= 1 - e^(-0.2)

= 1 - 0.8187

= 0.1813