Answer:
A. 12.3%
Step-by-step explanation:
Model this as a binomial distribution
[tex]X \sim B(n,p)[/tex] where X is the random variable, n is the number of trials, and p is the probability of success.
Therefore,
(If the probability of lambs being male and female is equal, then the probability of males being born = 0.5)
[tex]X \sim B(60,0.5)[/tex]
The probability that at least 35 lambs will be born male:
[tex]\ \ \ \ \ \ \ P(X\geq 35)=1-P(X\leq 34)\\\\\implies P(X\geq 35)=1-0.8774695851...\\\\\implies P(X\geq 35)=0.1225304149\\\\\implies P(X\geq 35)=12.3 \%[/tex]
