Respuesta :
X: the number of workers taking the bus to work
p: probability of success =(15/100) = 0.15
q: probability of failure =1- p = 0.85
P(X=6) = 10C6(0.15)^6(0.85)^4
= 0.001
Ans: A
p: probability of success =(15/100) = 0.15
q: probability of failure =1- p = 0.85
P(X=6) = 10C6(0.15)^6(0.85)^4
= 0.001
Ans: A
Answer: Option 'A' is correct
Step-by-step explanation:
Since we have given that 15% of city workers take the bus to work ,
We will use "Binomial Distribution"
[tex]P(X=x)=^nC_kp^k(1-p)^{n-k}[/tex]
Here,
p denotes "Probability of success",
(1-p) denotes "Probability of failure",
n denotes the "number of workers"
k denotes "number of given workers"
So, Probability of success is given by
[tex]p=\frac{15}{100}=0.15[/tex]
And, probability of failure is given by
[tex](1-p)=1-0.15=0.85[/tex]
Hence, our binomial distribution will look like
[tex]^{10}C_6(0.15)^6(0.85)^4=0.001[/tex]
Hence, Option 'A' is correct.
