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I have a bag of toys. 10% of the toys are balls. 10% of the toys are blue.

If I draw one toy at random, what're the odds I'll draw a blue ball?

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    I asked this question because I was trying to answer this question: http://math.stackexchange.com/questions/246621/how-do-you-ask-a-probability-question-why-do-you-need-to-specify-that-a-coin-is. Now I need to figure out how to assign points to the three correct answers to this question. :-/2012-11-28

3 Answers 3

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Since it is not entirely clear from the question, I will assume every toy has an equal probability of being blue. So we are assuming the unlikely proposition that no correlation (positive or otherwise) exists between color and type-of-toy. Otherwise, could very well be that 10% of the toys are neon-green balls (tennis balls, e.g.) and 10% of the toys are blue blocks, in which case you have 0% probability that you'll draw a blue ball.

We know $10$% $ = 0.1$ of the toys are balls, and $10$% $= 0.1$ of these balls are blue.

Then $10$% of ($10$%) of the toys are blue balls.

So the probability of drawing a blue ball is $0.1 \times 0.1 = 0.01$.

This equates to a $0.01 \times 100$% = $1$% probability of drawing a blue ball.


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Assuming that the balls are not any more or less likely to be blue that other toys, the object drawn has a $.1$ chance of being a ball and a $.1$ chance of being blue. So the chance of it being a blue ball is $.01$.

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If the "blueness" is uniformly distributed. We have S Toys

From wich $0.1 \mathbf S$ are Balls.
$P(X)= \frac {0.1S}S=0.1$

$0,1 \mathbf S$ are Blue toys.
$P(Y)=\frac {0.1S}S=0.1$

If you want Blue ball you have
$P(XY)=P(X)\cdot P(Y) = 0.1 \times 0.1 = 0.01 = 1 $%