a bin of 50 parts contains five that are defective. a sample of three parts is selected at random without placement.
a. determine the probability that at least two parts in the sample are defective.
b. given that at least two parts in the sample are defective, what is the probability that all three are defective
a bin of 50 parts contains five that are defective. a sample of three parts is...
A bin of 50 parts contains 5 that are defective. A sample of 10 parts is selected at random, without replacement. (a) How many different samples of size 10 are there that contain at least three defective parts? (b) How many ways to obtain a sample of 10 parts from the bin of 50? (c) What is the probability of obtaining at least three defectives in a sample of 10 parts?
A shipment of 50 parts contains 12 defective parts. Suppose 3 parts are selected at random, without replacement, from the shipment. What is the probability that at least one part is defective? 0.5696 0.5610 0.1435 0.0427
7. A lot of 100 semiconductor chips contains 10 that are defective. Three are selected, at random, without replacement, from the lot. (a) Determine the probability that the first chip selected is defective (b) Determine the probability that the second chip selected is defective. (c) Determine the probability that all three chips selected are defective. (d) Given that the second chip selected is defective, determine the (conditional) probability that all three chips selected are defective.
A batch of 536 containers for frozen orange juice contains 6 that are defective. Two are selected, at random, without replacement from the batch. a) What is the probability that the second one selected is defective given that the first one was defective? Round your answer to five decimal places (e.g. 98.76543). b) What is the probability that both are defective? Round your answer to seven decimal places (e.g. 98.7654321). c) What is the probability that both are acceptable? Round...
In a production facility ., a batch of three hundred products contains eight that are defective. Two are selected from batch, at random, without replacement * What is the probability that the second one selected is defective given that the firstone was defective? *What is the probability that both are def ective? *What is the probability that both are acceptable?
Five percent (0.05) of the parts produced by a machine are defective. Twenty(20) parts are selected at random for study. A. what is the probability that more than 4 parts are defective? B. what is the probability that exactly 3 parts are defective? C. what is the expected number of defective parts in the sample? D. What is the variance and standard deviation of defective parts in the sample?
Paragraph 2-114. A lot of 100 semiconductor chips contains 10 that are defective. (a) Two are selected, at random, without replacement, from the lot. Determine the probability that the second chip selected is defective (b) Three are selêcted, at random, without replacement, from the lot. Determine the probability that all are defective.
A shipment of 40 parts contains 12 defective parts. Suppose 3 parts are selected at random, without replacement, from the shipment. What is the probability that exactly 2 parts are not defective?
3. A day's production of 850 manufactured parts contains 50 parts that do not meet customer requirements. Three parts are selected randomly without replacement from the batch. What is the probability that first two parts are defective and the third is not defective?
2-108. + A batch of 500 containers for frozen orange juice contains 5 that are defective. Two are selected, at random, with out replacement from the batch. (a) What is the probability that the second one selected is defective given that the first one was defective? (b) What is the probability that both are defective? (c) What is the probability that both are acceptable? Three containers are selected, at random, without replace- ment, from the batch. given that the first...