Complete the following probability table. (Round Prior Probability and Posterior Probability answers to 2 decimal places and Joint Probability answers to 4 decimal places.) Prior Probabilities...

Extracted text: Complete the following probability table. (Round Prior Probability and Posterior Probability answers to 2 decimal places and Joint Probability answers to 4 decimal places.) Prior Probabilities Conditional Probabilities Joint Probability Posterior Probabilities P(B) 0.67 P(A| B) 0.29 P(AN B) 0.52 P(AN B^c) P(B | A) P(B^c | A) P(B^c) P(A BAc) %3D %3D %3D Total P(A) Total %3D


Extracted text: The State Police are trying to crack down on speeding on a particular portion of the Massachusetts Turnpike. To aid in this pursuit, they have purchased a new radar gun that promises greater consistency and reliability. Specifically, the gun advertises ±one-mile-per-hour accuracy 83% of the time; that is, there is a 0.83 probability that the gun will detect a speeder, if the driver is actually speeding. Assume there is a 3% chance that the gun erroneously detects a speeder even when the driver is below the speed limit. Suppose that 80% of the drivers drive below the speed limit on this stretch of the Massachusetts Turnpike. a. What is the probability that the gun detects speeding and the driver was speeding? (Round your answer to 4 decimal places.) Probability b. What is the probability that the gun detects speeding and the driver was not speeding? (Round your answer to 4 decimal places.) Probability c. Suppose the police stop a driver because the gun detects speeding. What is the probability that the driver was actually driving below the speed limit? (Round your answer to 4 decimal places.) Probability