Answer:
a. 0.7291
b. 0.9968
c. 0.7259
Step-by-step explanation:
a. np and n(1-p) can be calculated as:
[tex]np=23\times 0.48\\\\=11.04\\\\n(1-p)=23(1-0.52)\\\\=11.96[/tex]
#Both np and np(1-p) are greater than 5, hence, normal approximation is most appropriate:
[tex]\mu_x=11.04\\\\\sigma^2=np(1-p)=0.48\times 0.52\times 23=5.7408[/tex]
#Define Y:
Y~(11.04,5.7408)
[tex]P(X\leq 12)\approx P(Y\leq 12.5)\\\\P(Z\leq \frac{(12.5-11.04)}{\sqrt{5.7408}})=\\\\=1-0.2709\\\\=0.7291[/tex]
Hence, the probability of 12 or fewer is 0.8291
b. The probability that 5 or more fish were caught.
#Using normal approximation:
[tex]P(X \geq 5) \approx P(Y \geq 4.5) = P(Z \geq\frac{ (4.5-11.04)}{\sqrt{(5.7408)}})\\\\=1-0.0032\\\\=0.9968[/tex]
Hence, the probability of catching 5+ is 0.9968
c. The probability of between 5 and 12 is calculated as;
-From b above [tex]P(X\geq 5)=0.9968[/tex] and a ,[tex]P(X\leq 12)[/tex]=0.7291
[tex]P(5\leq X\leq 120\approx P(4.5\leq Y\leq 12.5)\\\\=0.7291-(1-0.9968)\\\\=0.7259[/tex]
Hence, the probability of between 5 and 12 is 0.7259
