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Many people think that a national lobby's successful fight against gun control legislation is reflecting the will of a minority of Americans. A previous random sample of 4000 citizens yielded 2250 who are in favor of gun control legislation. How many citizens would need to be sampled if a 99% confidence interval was desired to estimate the true proportion to within 5%?



611



690



653



664

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dogacandu

Answer:

At least 653 citizens need to be sampled.

Step-by-step explanation:

The following formula is used to compute the minimum sample size required to estimate the true proportion who are in favor of gun control legislation  within 5% margin of error:

n≥ p×(1-p) × [tex](\frac{z}{ME} )^2[/tex] where

  • n is the sample size
  • p is the sample proportion of people who are in favor of gun control legislation ([tex]\frac{2250}{4000}=0.5625[/tex]
  • z is the corresponding z-score for 99% confidence level (2.575)
  • ME is the margin of error in the estimation (5% or 0.05)

Putting numbers in the formula

n≥ 0.5625×0.4375 × [tex](\frac{2.58}{0.05} )^2[/tex] ≈652.7

n needs to be at least 653 to provide this equation.

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