Answer:
Hello your question lacks the required table attached to this is the table
Answer : a) 0.223 b) 0.0322 c) more likely
Explanation:
A ) probability that a woman selected would not meet the age requirement
∑ p ( x ≤ 20 ) = p( x = 17 ) + p(x = 18 ) + p(x = 19 )
= 0.005 + 0.107 + 0.111 = 0.223
B) probability that at least 30 percent out of 100 will not meet the requirement
30% of 100 = 30. general probability that women selected will not meet requirement = 0.223 . therefore probability of 30 percent out of 100 not meeting requirement will be = 0.0322
C) for a stratified random sampling will apply the standard error of proportion to the simple random sampling
for the simple random sampling the probability = 30/100 = 0.3 ( 30 women who do not meet the requirement )
the standard error of proportion =
n = number of trials = 100
p = probability of success = 0.3
therefore standard error of proportion = 0.0458
probability of 30 women who do not meet the age requirement using the stratified method of sampling
P ( x ≥ 30 ) = P ( z ≥ ( 0.3 - 0.3 )/ standard error of proportion )
= P ( z ≥ (0)/0.0458) therefore P ( Z ≥ 0 ) = 0.5
in a stratified random sampling a woman who does not meet the age requirement is more likely to be selected