Given : The proportion of New Zealanders consume five or more servings of soft drinks per week :[tex]\hat{p}= 0.16[/tex]
a) The number of survey respondents reported that they consume five or more servings of soft drinks per week = 2006
b) Confidence interval for population proportion (p) :
[tex]\hat{p}\pm z^*\sqrt{\dfrac{\hat{p}(1-\hat{p})}{n}}[/tex]
, where [tex]\hat{p}[/tex] = Sample proportion.
n= Sample size.
z* = Critical value.
For n= 2006 , [tex]\hat{p}= 0.16[/tex] and critical value for 95% confidence interval : z* = 1.96
Then , the required confidence interval will be :
[tex] 0.16\pm (1.96)\sqrt{\dfrac{ 0.16(1- 0.16)}{2006}}[/tex]
[tex] 0.16\pm (1.96)\sqrt{ 0.000066999002991}[/tex]
[tex] 0.16\pm (1.96)(0.00818529186963)[/tex]
[tex] 0.16\pm 0.0160431720645[/tex]
[tex](0.16-0.0160431720645,\ 0.16+0.0160431720645)[/tex]
[tex](0.143956827935,\ 0.176043172064)\approx(0.144,\ 0.176)[/tex]
i.e. A 95% confidence interval for the proportion of New Zealanders who report that they consume five or more servings of soft drinks per week. = [tex](0.144,\ 0.176)[/tex]
c) [tex](0.144,\ 0.176)=(0.144\times100\%,\ 0.176\times100\%)[/tex]
[tex]=(14.4\%,\ 17.6\%)[/tex]176\times100\%)[/tex]
d) The estimate might be biased because the survey is taken online that means offline New Zealanders are out of consideration.