Answer:
So Equation(1) and Equation(2) both are not same C.I hence the given statement is false.
Step-by-step explanation:
Given:
total member =2000
Favor member=1600
Mean=1600/2000=0.8
To Find:
C.I of 95 % and it is true for given statement
Solution:
Now to calculate the
C.I=0.8±Z*Sqrt[p(1-p)/n]
C.I=0.8±1.96Sqrt[0.8(0.2)/2000]
C.I=0.8±0.0175
C.I=0.7825 to 0. 8175 .........Equation(1)
Now
Above C.I should be same when n =100 and x= 80 So p=x/n=80/100=0.8
Hence
C.I.=p±Z*Sqrt[p(1-p)/n]
C.I=0.8±1.96*sqrt[0.8*0.2/100]
=0.8±1.96*0.04
=0.8±0.0784
Hence C.I.=0.7216 to 0.8784............Equation(2)
By comparing
So Equation(1) and Equation(2) both are not same C.I hence the given statement is false.
