Is it possible to calculate an expression $P(C_1,C_2,C_3|L_1,L_2,L_3)$ if I know only the individual $P(C_x)$ and all combinations of $P(C_x|L_y)$? How would I do that? Thanks!
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1You need to know something about which events are independent of each other, too. – mjqxxxx Nov 04 '13 at 17:02
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Does your notation mean "probability of $C_1$ and $C_2$" or "probability of $C_1$ or $C_2$" (same for the conditions)? – Daniel Robert-Nicoud Nov 04 '13 at 17:02
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@mjqxxxx Yes, the $L's$ are independent. And the $C's$ are dependent on the outcome of the $L's$. – Rob Nov 05 '13 at 08:24
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@DanielRobert-Nicoud Sorry, I can see that my notation here looks creative. I mean and. – Rob Nov 05 '13 at 08:25
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I would really appreciate any help on this. @mjqxxxx ? – Rob Nov 11 '13 at 10:00