There are four washing machines in an apartment complex: A, B, C, D. On any given day the probability that these machines break down is as follows

CoormaBak9

CoormaBak9

Answered question

2021-09-17

There are four washing machines in an apartment complex: A, B, C, D. On any given day the probability that these machines break down is as follows:
P(A) = 0.04, P(B) = 0.01, P(C) = 0.06, P(D) = 0.01 .
Assume that the functionality of each machine is independent of that of others. What is the probability that on a given day at least one machine will be working?

Answer & Explanation

Anonym

Anonym

Skilled2021-09-18Added 108 answers

Let A be first event that the washing machine not working, B be the second event that the washing machine not working, C be third event that the washing machine not working and D be fourth event that the washing machine not working.
From the given information, the P (4) = 0.04, P (B) =0.01, P (C) =0.06, P (D)=0.01 and all events are independent.
Step 2
Multiplication rule for independent events:
P(ABCD)=P(A)×P(B)×P(C)×P(D)
Then, the probability that at least one machine will be working is
P(At least one machine working)=1-P(None of them working)
=1P(ABCD)
=1P(A)×P(B)×P(C)×P(D)
(  Events are independent)
=1(0.04×0.01×0.06×0.01)
=1-0.00000024
=0.99999976
Thus, the probability that at least one machine will be working is 0.99999976 which is approximately 1
Jeffrey Jordon

Jeffrey Jordon

Expert2022-01-14Added 2605 answers

Answer is given below (on video)

Jeffrey Jordon

Jeffrey Jordon

Expert2022-08-23Added 2605 answers

Answer is given below (on video)

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