(Requires probability ) For two phase sampling with ratio estimation (Section 12 3 1), suppose the phase I sample is an SRS of size n(1), and the phase II sample is an SRS of fixed size n(2) a Show that P (Zi 1) n(1) N, and P(Di 1 Z) Zin(2) n(1) b Show that (12 10) gives the approximate variance of aacute sup1 laquo (2) yr c Let ei yi aacute cedil (2)xi and let s2y and s2e be the sample variances of the yis and the eis from the phase II sample, Show that (12 11) is an approximately unbiased estimator of V ( aacute sup1 laquo (2)yr ) ieS2) n2)1 ieS2)

Question: (Requires probability.) For two-phase sampling with ratio estimation (Section 12.3.1), suppose the phase I sample is an SRS of size n(1), and the phase II

(Requires probability.) For two-phase sampling with ratio estimation (Section 12.3.1), suppose the phase I sample is an SRS of size n(1), and the phase II sample is an SRS of fixed size n(2).
a. Show that P (Zi = 1) = n(1) /N, and P(Di = 1 | Z) = Zin(2)/n(1).
b. Show that (12.10) gives the approximate variance of á¹« (2) yr .
c. Let ei = yi ˆ’ á¸‚(2)xi and let s2y and s2e be the sample variances of the yi€™s and the ei€™s from the phase II sample,

Show that (12.11) is an approximately unbiased estimator of V (á¹«(2)yr ).

ieS2) n2)1 ieS2)

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