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A meteorologist observes cloud conditions to predict rain. On a given day, 40\(\pourcent\) of the time the sky is cloudy, and 60\(\pourcent\) of the time it is clear. The probability of rain given a cloudy sky is 0.75, and the probability of rain given a clear sky is 0.15.
Find the probability that it rains :
\(P(\text{Rain}) = \)
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\({x}^{2}\)
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