Answer:
a) 5.4%
Step-by-step explanation:
a) We will use the binomial distribution, with n = 100 and p(success) = 0.95
We need to calculate
P(X=x) = [tex]\binom{n}{x}p^{x}q^{n-x}[/tex]
P(X ≤91) = [tex]\sum_{k=1}^{91}\binom{100}{k}0.95^{k}0.5^{n-k}[/tex]
As we know that binomial distribution can be approximated to normal distribution if np≥5 and nq≥5 as in this case.
Therefore, P(x,n,p) →N[tex](\mu, \sigma )[/tex]
[tex]\mu[/tex] = np = 95
[tex]\sigma[/tex] = √npq = 2.`79
P(X≤91) ≅ P(X≤91.5) = P( Z≤[tex]\frac{91.5-95}{2.179}[/tex]
= P( Z≤ -1.6)
= 0.054
Probability = 5.4%
b) If the probability was less than 5% then we must say that the DHL Shipping company don not ships 95% of its orders on time but as we can see that the probability is more that 5% that is 5.4%. So, we cannot say that the company does not ships the orders on time. But we cannot say with confirmation, we need more samples so as to judge accordingly.
