Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10 P(e) = n(e)/n(s)
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10 P(e) = n(e)/n(s) 10 – 0.8
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10 P(e) = n(e)/n(s) 10 – 0.8 Answer is 9.2
[tex]\large\underline{\sf{Solution-}}[/tex]
We know,
By Binomial Distribution,
[tex] \boxed{ \bf \: P(r) = \:^n C_r {p}^{r} {q}^{n – r} }[/tex]
where,
and
Let’s solve the problem now!!
Here, given that
So,
Now,
We have to find the probability exactly 2 bombs will miss the target.
[tex]\bf :\longmapsto\:P(exactly \: 2 \: bombs \: miss \: the \: target)[/tex]
[tex] \: \: \bf \: = \: P(exactly \: 8 \: bombs \: hit \: the \: target)[/tex]
[tex] \: \: = \sf \: \:^{10} C_8 \: \times {(0.8)}^{8} \times {(0.2)}^{2} [/tex]
[tex] \: \: = \sf \: \dfrac{10 \times 9}{2 \times 1} \times {\bigg( \dfrac{8}{10} \bigg) }^{8} \times {\bigg( \dfrac{2}{10} \bigg) }^{2} [/tex]
[tex] \: \: = \sf \: 45 \times {\bigg(\dfrac{4}{5} \bigg) }^{8} \times {\bigg( \dfrac{1}{5} \bigg) }^{2} [/tex]
[tex] \: \: = \sf \: 45 \times \dfrac{ {4}^{8} }{ {5}^{8} } \times \dfrac{1}{ {5}^{2} } [/tex]
[tex] \: \: = \sf \: \dfrac{9 \times {2}^{16} }{ {5}^{9} } [/tex]
Additional Information :-
If the following conditions are satisfied, then X has a binomial distribution with parameters n and p, represented as B(n,p).
Answer:
Answer:Answer is 9.2
Answer:Answer is 9.2Step-by-step explanation:
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10 P(e) = n(e)/n(s)
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10 P(e) = n(e)/n(s) 10 – 0.8
Answer:Answer is 9.2Step-by-step explanation:Probability that the bomb will hit the target is 0.8 n(s)= 0.8Find the probability that out of ten bombs n(e)= 10 P(e) = n(e)/n(s) 10 – 0.8 Answer is 9.2