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Answer :
The probability of the spinner landing on the blue section and then drawing a green pen is calculated as the product of the probabilities of each independent event, resulting in a combined probability of 1/8.
The probability of the spinner stopping at the blue section and then drawing a green pen involves calculating the likelihood of two independent events occurring in succession.
Since there are 2 blue sections out of 6 total sections on the spinner, the probability (P) of landing on blue is 1/3.
Considering there are 3 green pens among a total of 8 pens (1 red + 2 pink + 3 green + 2 white), the probability of selecting a green pen is 3/8.
To find the combined probability of both events happening, we multiply their individual probabilities:
P(blue section and green pen) = P(blue section) * P(green pen) = (1/3)*(3/8) = (1/8)
The probability of the spinner landing on blue followed by drawing a green pen is 1/8.
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Rewritten by : Brahmana