Assume a box contains 2 red balls and 2 black balls. One black ball has been drawn and not replaced. What is the probability that the last two draws among the next three are both red?

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Prepare for the ASQ Certified Quality Technician Exam with our comprehensive exam resource. Study with interactive flashcards and multiple choice questions, each offering detailed hints and explanations. Get ready to excel in your certification journey!

Multiple Choice

Assume a box contains 2 red balls and 2 black balls. One black ball has been drawn and not replaced. What is the probability that the last two draws among the next three are both red?

After the initial black ball is drawn, three balls remain: two red and one black. To have the last two of the next three draws be red, the first draw of that trio must be the black ball. If the first draw is black, the remaining two balls are both red, so the second and third draws will both be red. The chance the first of the three draws is black is 1 out of 3, since there is one black ball among three. Therefore the probability that the last two draws are red is 1/3.

Assume a box contains 2 red balls and 2 black balls. One black ball has been drawn and not replaced. What is the probability that the last two draws among the next three are both red?

Prepare for the ASQ Certified Quality Technician Exam with our comprehensive exam resource. Study with interactive flashcards and multiple choice questions, each offering detailed hints and explanations. Get ready to excel in your certification journey!

Assume a box contains 2 red balls and 2 black balls. One black ball has been drawn and not replaced. What is the probability that the last two draws among the next three are both red?

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