Air Bag Safety According to a 2000 study conducted by the Harvard School of Public Health, a child seated in the front seat who was wearing a seatbelt was 31% more likely to be killed in an accident if the car had an air bag that deployed than if it did not. 62 Let the sample space S be the set of all accidents involving a child seated in the front seat wearing a seatbelt. Let K be the event that the child was killed, and let D be the event that the air bag deployed. Fill in the missing terms and quantities: P ( _ _ | _ _ ) = _ _ × P ( _ _ | _ _ ) . [ HinT: When we say, “A is 31% more likely than B,” we mean that the probability of A is 1.31 times the probability of B.]
Air Bag Safety According to a 2000 study conducted by the Harvard School of Public Health, a child seated in the front seat who was wearing a seatbelt was 31% more likely to be killed in an accident if the car had an air bag that deployed than if it did not. 62 Let the sample space S be the set of all accidents involving a child seated in the front seat wearing a seatbelt. Let K be the event that the child was killed, and let D be the event that the air bag deployed. Fill in the missing terms and quantities: P ( _ _ | _ _ ) = _ _ × P ( _ _ | _ _ ) . [ HinT: When we say, “A is 31% more likely than B,” we mean that the probability of A is 1.31 times the probability of B.]
Solution Summary: The author explains that a child seared in the front seat was 31% more likely to be killed in an accident if the airbag deployed than it did not.
Air Bag Safety According to a 2000 study conducted by the Harvard School of Public Health, a child seated in the front seat who was wearing a seatbelt was 31% more likely to be killed in an accident if the car had an air bag that deployed than if it did not.62 Let the sample space S be the set of all accidents involving a child seated in the front seat wearing a seatbelt. Let K be the event that the child was killed, and let D be the event that the air bag deployed. Fill in the missing terms and quantities:
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. [HinT: When we say, “A is 31% more likely than B,” we mean that the probability of A is 1.31 times the probability of B.]
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