Answer:
The probability is [tex]P(X\leq 10)=0.093031581[/tex]
Step-by-step explanation:
We know that the ratio of grey color morph to red color morph is [tex]53:47[/tex]
This can be written in terms of probability as :
[tex]P(RedColorMorph)=\frac{47}{100}=0.47[/tex]
This means that the probability of obtain a red color morph snake in a random sample of 100 snakes is [tex]0.47[/tex] (If I only randomly select one snake).
Now, the number [tex]X[/tex] of red color morph snakes in a random sample ''n'' can be modeled as a binomial random variable. Where ''p'' is the success probability (In our case, the probability from obtain one red color morph snake out of 100 snakes) ⇒
[tex]X:[/tex] ''Number of red color morph snakes in the sample''
[tex]p=0.47[/tex]
In our case, [tex]n=30[/tex]
⇒ [tex]X[/tex] ~ Bi (n,p) ⇒ [tex]X[/tex] ~ Bi (30,0.47)
The probability function for [tex]X[/tex] is :
[tex]P(X=x)=(nCx).p^{x}.(1-p)^{n-x}[/tex]
Where [tex]nCx[/tex] is the combinatorial number define as [tex]nCx=\frac{n!}{x!(n-x)!}[/tex] ⇒
[tex]P(X=x)=(30Cx).(0.47)^{x}.(0.53)^{30-x}[/tex]
We need to calculate the probability of [tex]P(X\leq 10)[/tex]
This probability is equal to :
[tex]P(X\leq 10)=P(X=0)+P(X=1)+P(X=2)+P(X=3)+P(X=4)+P(X=5)+P(X=6)+P(X=7)+P(X=8)+P(X=9)+P(X=10)[/tex]
For example,
[tex]P(X=6)=(30C6).(0.47)^{6}.(0.53)^{24}=0.0015446[/tex]
We need to calculate all the terms of the sum and then calculate [tex]P(X\leq 10)[/tex]
If we use any statistical program we will find that
[tex]P(X\leq 10)=0.093031581[/tex]
