Probability (m01q04)

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Re: Probability (m01q04) [#permalink]

10 Jan 2011, 09:22

petrifiedbutstanding wrote:

Can someone please tell me where I can find some good coaching on probability? An online course would be the best. If that isn't available, I'll settle for whatever is good.

LOL.. I would like to request the same thing....
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Re: Probability (m01q04) [#permalink]

01 Dec 2011, 01:02

are there any good books from where one can learn probability?

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Re: Probability (m01q04) [#permalink]

05 Dec 2011, 02:04

probability of not hitting the target = pro(1st cannon not hitting)*pro(2nd not hitting)*pro(3rd not hitting)
= .7*.6*.5
= .21
hence C
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Re: Probability (m01q04) [#permalink]

29 Nov 2012, 06:30

If A = the event that the 1st cannon hits the target
B = the event that the 2nd cannon hits the target
C = the event that the 3rd cannon hits the target

We need to find out P(A' * B' * C') where A' = the event that 1st cannon does not hit the target etc and '*' comes as we need the event A' AND B' AND C'.

As A, B, C are independent events, so is A', B', C' ; hence, P(A'*B'*C') = P(A')*P(B')*P(C') = (1-P(A))*(1-P(B))*(1-P(C)) = 0.7*0.6*0.5 = 0.21 (Ans)

So the correct choice is 'C'.

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Re: Probability (m01q04) [#permalink]

29 Nov 2012, 12:15

Getting right is given for each canon. Then getting wrong is 1- probability of getting right for each canon. Probability of happening each case is AND operation whereas either case is OR. If AND then multiply all the probabilities.
In this case probability of getting all wrong P is,
(1-0.3)*(1-0.4)*(1-0.5) =0.21

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Re: Probability (m01q04) [#permalink]

12 Mar 2013, 04:50

0.3, 0.4, and 0.5

This one is easy----

The probability of the guns not firing = .7,.6, .5

So the probability of gun 1 not firing AND gun 2 not firing AND gun 3 not firing = .7 *.6* .5= .21

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Re: Probability (m01q04) [#permalink]

12 Mar 2013, 05:55

can anyone post a good source for prob questions

Re: Probability (m01q04) [#permalink] 12 Mar 2013, 05:55

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Probability (m01q04)

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