Let H denote the true Hubble constant. The age of the universe can be expressed in years as H. where e is the conversion factor /km) - 978, 440, 076, 094. (/prar) 1. Consider 6 -cH-, Compute an estimate of 0 using the estimator e and the supernova data. %3D 2. Now suppose that H1,.., H36 gamma(a, 3) with density S(h) = -N T(a) h>0 (a) What is the distribution of H?

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Part 1: individual
Let H denote the true Hubble constant. The age of the universe can be expressed in years as
H.
where e is the conversion factor Mpe/km)
/year)
= 978, 440, 076, 094.
1. Consider 0 = cH-, Compute an estimate of 6 using the estimator 8 and the supernova data.
%3D
2. Now suppose that H1,..., H36 gamma(a, 3) with density
f(h) =
T(a)
h>0
(a) What is the distribution of H?
Transcribed Image Text:Part 1: individual Let H denote the true Hubble constant. The age of the universe can be expressed in years as H. where e is the conversion factor Mpe/km) /year) = 978, 440, 076, 094. 1. Consider 0 = cH-, Compute an estimate of 6 using the estimator 8 and the supernova data. %3D 2. Now suppose that H1,..., H36 gamma(a, 3) with density f(h) = T(a) h>0 (a) What is the distribution of H?
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