63 Section 8.4.Example Let {(Ri,Xi):i=1,...,n}be an i.i.d.sample of n random vectors (R,X).Here R is a response indicator and X is a covariate.We assume that logitP[R 1X]=a+BX and assume that X is normally distributed with mean u and variance o2.So,our probability model has four parameters, 0=(a,B,u,o2).Let 0o =(ao,Bo,uo,denote the true value of 0.63 Section 8.4. Example Let {(Ri, Xi) : i = 1,...,n} be an i.i.d. sample of n random vectors (R, X). Here R is a response indicator and X is a covariate. We assume that logitP[R = 1|X] = α + βX and assume that X is normally distributed with mean µ and variance σ2. So, our probability model has four parameters, θ = (α, β, µ, σ2). Let θ0 = (α0, β0, µ0, σ20) denote the true value of θ