Answer:
Probability that an international flight leaving the US is delayed in departing given that the flight is a transpacific flight is 0.2105.
Step-by-step explanation:
We are given that the probability that an international flight leaving the United States is delayed in departing (event D) is 0.25. The probability that an international flight leaving the United States is a transpacific flight (event P) is 0.57. The probability that an international flight leaving the U.S. is a transpacific flight and is delayed in departing is 0.12.
Let the probability that an international flight leaving the United States is delayed in departing = P(D) = 0.25
Probability that an international flight leaving the United States is a transpacific flight = P(P) = 0.57
Probability that an international flight leaving the U.S. is a transpacific flight and is delayed in departing = = 0.12
Now, the probability that an international flight leaving the US is delayed in departing given that the flight is a transpacific flight is given by = P(D/P)
As we know that the conditional probability is given by;
P(A/B) =
Similarly, P(D/P) =
=
= 0.2105
<em>Hence, the required conditional probability is 0.2105.</em>
First, solve for y
4y+3≤y+6
3y+3<span>≤6
3y</span><span>≤3
y</span><span>≤1
the third picture is the correct graph</span>
Answer:
63=7 80=8 52=7 112=10 864=29 396=19 800=28 7200=84
Step-by-step explanation:
now all you have to do is find factors which shouldn't be that hard
Answer:
The answer is -86
Step-by-step explanation:
-7 squared is 49
49 × 2 = 98
12-98= -86