1.Let A and B be events that Pr (A) = 0.6, Pr (A U B) = 0.8 and Pr (A|B) = 0.6
Find Pr (B).
2. Having a mean of 20 and standard deviation of 4 where X is the normal random variable and Z is the random variable with a standard normal distribution Find b such that Pr 9X .240 = Pr (Z < b)
3. On a multiple choice exam, each question will have 5 alternatives where only i given of which is correct. For each question, candidates gain 4 mark for a correct answer but Raoul is able to elimiate 2 of the incorrect answers from the alternatives given before guessing from those remaining. Given that the exam contains 24 questions, calaculate his explected total mark?
4. For a stnadard normal variable Z, Pr (0
Z c) = 0.3 and Pr (Z 
d) = 0.3 The value of Pr (Z d| c) is ___?
5. The random variable X us normally distributed with a mean of 10 and a variance of 4. If Pr (8 Z 12) = 1 - 2 Pr (Z c) where Zi is a stnadrad normal distribution then c is ___?
1. As you can see, Pr(A) = Pr (A|B) = 0.6 so they are independent.
Hence Pr(A) = Pr(A n B)/Pr(B)
or Pr(A)Pr(B) = Pr (A n B)
Pr(A) + Pr(B) - Pr(A n B) = Pr (A U B) , let Pr(B) = x
0.6 + x - 0.6x = 0.8
0.4x = 0.2
x = 0.5
so Pr(B) = 0.5
2. I'm assuming you're asking for Pr(X >24) = Pr (Z< b) find b.
Pr(Z<b) = Pr(Z >-b) by symmetry, so Pr(X>24) = Pr( >-b)
so finding the z-score...
(24-20)/4 = 1
so -b = 1
or b = -1 !!!
3. so really there are 3 options, so pr(correct) = 1/3, pr (incorrect) =2/3
im assuming, correct = +4 marks, incorrect = 0 marks
so expected, 24*(4*1/3) = 32 marks ... yeh im guessing this one? correct me if i'm wrong someone
4. so we're going to assume c>d from the info given
so Pr (Z>=d|=<c) = Pr(d=< Z =< c)/Pr(Z=< C)
drawing out the standard norm distr, you can see that
Pr(Z =< c) = 0.8
and Pr(Z=<d) = 0.7
so answer is 0.1/0.8 or 1/8
5. sd = 2
c = 12 from inspection? idk
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