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there is 1/2 chance for 1st ball being red, and same 1/2 chance for 2nd ball being red.
So instead of simply adding up (8/12)*(4/11) + (4/12)*(8/11), you should do (1/2)(8/12)*(4/11)+ (1/2)(4/12)*(8/11) = 32/132
So instead of simply adding up (8/12)*(4/11) + (4/12)*(8/11), you should do (1/2)(8/12)*(4/11)+ (1/2)(4/12)*(8/11) = 32/132
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excuse me if this is a wrong answer, but can anyone tell me if this is right/wrong?
add up 8 red and 4 white = 12 total
Draw 1 (red): 8/12
Draw 2 (red): 7/11
P(red) = (8/12)*(7/11) = 56/132 - answer D
add up 8 red and 4 white = 12 total
Draw 1 (red): 8/12
Draw 2 (red): 7/11
P(red) = (8/12)*(7/11) = 56/132 - answer D
The guy way up there got it right (just added them incorrectly). No need to keep chiming in with wrong answers. The correct answer is A.
Wrong. There is not a 1/2 chance you'll draw a red ball when there are clearly DOUBLE the amount of red balls to start.
Wrong answer. The question asked for 1 of each. You solved for 2 reds.
Wrong. There is not a 1/2 chance you'll draw a red ball when there are clearly DOUBLE the amount of red balls to start.
Wrong answer. The question asked for 1 of each. You solved for 2 reds.
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Streetwolf. yup you are right. my mistake. no half half.
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This is from 2010.
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