Answer: D)0.205
Step-by-step explanation:
In binomial distribution, the probability of getting success in x trials is given by :-
[tex]P(X=x)=^nC_xp^x(1-p)^{n-x}[/tex]
, where n is the total number of trials , p is the probability of getting success in each trial .
Given : The probability that a component will fail is 0.2.
Let x be the number of components will stop working.
i.e. p=0.2
n=12
Since The machine will stop working if more than three components fail.
Then, the probability that the machine will stop working will be :-
[tex]P(X>3)=1-P(X\leq3)\\\\=1-[P(0)+P(1)+P(2)+P(3)][/tex]
[tex]=1-[^{12}C_0(0.2)^0(0.8)^{12}+^{12}C_1(0.2)^1(0.8)^{11}+^{12}C_2(0.2)^2(0.8)^{10}+^{12}C_3(0.2)^3(0.8)^{9}][/tex]
[tex]=1-[(1)(0.8)^{12}+(12)(0.2)(0.8)^{11}+\dfrac{12!}{2!10!}(0.2)^2(0.8)^{10}+\dfrac{12!}{3!9!}(0.2)^3(0.8)^{9}]\\\\=1-(0.068719476736+0.206158430208+0.283467841536+0.23622320128 )\\\\=1-0.79456894976\\\\=0.20543105024\approx0.205[/tex]
Hence, the probability that the machine will stop working is 0.205.
Thus , the correct answer is D)0.205
