Suppose a shop opens at 10am. People start arriving at 9 am and queue in front of the shop. The arrivals follow a non-ho
Posted: Mon Nov 15, 2021 10:07 am
Suppose a shop opens at 10am. People start arriving at 9 am and
queue in front of the shop. The arrivals follow a non-homogeneous
Poisson process with rate function λ(t) = 25t^2 (t = 0 refers to 9
am and t = 1 to 10 am).
Find the distribution of the number of people waiting in
front of the shop when the shop opens?
queue in front of the shop. The arrivals follow a non-homogeneous
Poisson process with rate function λ(t) = 25t^2 (t = 0 refers to 9
am and t = 1 to 10 am).
Find the distribution of the number of people waiting in
front of the shop when the shop opens?