actory has 3 machines A1, A2 and A3. Based on experience in the probability of the machine being damaged when used for machines A1, A2 and A3, respectively, namely P(A1)=0,3, P(A2)=0.5 and 13)=0,2. If the A1 machine is damaged then the probability of buying a new machine is 0.8. If the machine is damaged A2 the probability of buying a new machine is 0.1 and if the machine A3 is damaged the bability of buying a new machine is 0.4. What are the chances (probability) of buying a new machine? 1. 0 0,37 2. O 0.24 3. O 0.01 4. O 0.08

actory has 3 machines A1, A2 and A3. Based on experience in the probability of the machine being damaged when used for machines A1, A2 and A3, respectively, namely P(A1)=0,3, P(A2)=0.5 and 13)=0,2. If the A1 machine is damaged then the probability of buying a new machine is 0.8. If the machine is damaged A2 the probability of buying a new machine is 0.1 and if the machine A3 is damaged the bability of buying a new machine is 0.4. What are the chances (probability) of buying a new machine? 1. 0 0,37 2. O 0.24 3. O 0.01 4. O 0.08

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.8: Probability

Problem 31E

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Question

PLEASE ANSWER ALL OF THIS QUESTION

In RW 012, Karang Setia Village, there are 20 residents who are very vulnerable to being infected with COVID -19, because they have diabetes and high blood pressure. The probability of a person being
infected with COVID-19 is 0.3. Determine the probability that there are 5 to 9 people infected with COVID-19.
1. O 0,2375
2. O 0,048
3. O 0,9520
4. O 0,7145

A factory has 3 machines A1, A2 and A3. Based on experience in the probability of the machine being damaged when used for machines A1, A2 and A3, respectively, namely P(A1)=0,3, P(A2)=0.5 and
P(A3)=0,2. If the A1 machine is damaged then the probability of buying a new machine is 0.8. If the machine is damaged A2 the probability of buying a new machine is 0.1 and if the machine A3 is damaged the
probability of buying a new machine is 0.4. What are the chances (probability) of buying a new machine?
1. O 0.37
2. O 0.24
3. O 0.01
4. O 0.08

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