Mathematics, 07.03.2020 03:11 sairaanwar67
Three microcontrollers are needed to operate a specific type of robot. Such a robot stops working whenever one or more microcontrollers fail. On competition day, the probability
that a microcontroller fails is equal to (1/2), independently of other microcontrollers.
(a) 1 pt – What is the probability that a robot with 3 microcontrollers works on competition day?
(b) 1 pt – What is the probability that exactly one microcontroller has failed given that the robot is not working?
(c) 1.5 pt – If the team starts the day with four microcontrollers and one robot, what is the probability that they can find a suitable configuration for the robot to work on competition day?
(d) 1.5 pt – Suppose that 2 robots, each with 3 microcontrollers, are brought to a competition site. Upon initial testing, both robots are not working. What is the probability that the team is able to reshuffle the microcontrollers to make one robot work?
Answers: 3
Mathematics, 21.06.2019 19:10, brownzackery71
Girardo is using the model below to solve the equation . girardo uses the following steps: step 1 add 4 negative x-tiles to both sides step 2 add 1 negative unit tile to both sides step 3 the solution is which step could be adjusted so that gerardo's final step results in a positive x-value? in step 1, he should have added 4 positive x-tiles to both sides. in step 1, he should have added 3 negative x-tiles to both sides. in step 2, he should have added 4 negative unit tiles to both sides. in step 2, he should have added 1 positive unit tile to both sides.
Answers: 2
Mathematics, 21.06.2019 20:00, Queenashley3232
Combine like terms to make a simpler expression 3z+z
Answers: 2
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