Respuesta :
Answer:
Hence when C.I. is 80% then Margin of error will be 1.9591%
Step-by-step explanation:
Given:
1st Margin of error(MOE)=3%
1st C.I.=95%
2nd C.I.=80%
To Find:
MOE at 80%
Solution:
The proportion is 64 % i.e. is constant for both MOE
Proportion is given by (P),
P=x/n
Where x= favors congressional terms
n= total voters or sampled voters.
There values are same or constant.
i.e standard deviation is also constant
Now Formula for MOE is given by
[tex]MOE=Z*[Standard devation/Sqrt(n)][/tex]
here Z is value for confidence interval
MOE is directly proportional to the Z-value
So
[tex]MOE=K*Z-value[/tex] ... where k is proportionality constant.
[tex]MOE/Z-value[/tex] ....ratio is constant
So , for 95 % Z=1.96 and for 80% Z=1.28
[tex]MOE(1st)/(Z-value 1st)=MOE(2nd)/(Z-value 2nd)[/tex]
[tex]3/1.96=MOE(2nd)/1.28[/tex]
[tex]MOE(2nd)=(3/1.96)*1.28[/tex]
[tex]MOE(2nd)=1.5306*1.28[/tex]
[tex]=1.9591[/tex] %
