In: Statistics and Probability
The joint probability distribution of the number X of cars and the number Y of buses per signal cycle at a proposed left-turn lane is displayed in the accompanying joint probability table.
y | ||||
p(x, y) |
0 | 1 | 2 | |
x | 0 | 0.015 | 0.010 | 0.025 |
1 | 0.030 | 0.020 | 0.050 | |
2 | 0.075 | 0.050 | 0.125 | |
3 | 0.090 | 0.060 | 0.150 | |
4 | 0.060 | 0.040 | 0.100 | |
5 | 0.030 | 0.020 | 0.050 |
(a) What is the probability that there is exactly one car and
exactly one bus during a cycle?
(b) What is the probability that there is at most one car and at
most one bus during a cycle?
(c) What is the probability that there is exactly one car during a
cycle? Exactly one bus?
P(exactly one car) | = |
P(exactly one bus) | = |
(d) Suppose the left-turn lane is to have a capacity of five cars
and one bus is equivalent to three cars. What is the probability of
an overflow during a cycle?
(e) Are X and Y independent rv's? Explain.
Yes, because p(x, y) = pX(x) · pY(y).Yes, because p(x, y) ≠ pX(x) · pY(y). No, because p(x, y) = pX(x) · pY(y).No, because p(x, y) ≠ pX(x) · pY(y).