Rejection sampling and importance sampling: Consider the model, yjâ¼Binomial(nj,θj),whereθj= logitâ1(α+βxj), forj=1,...,J, and with independent prior distributions,αâ¼t4(0,22)andβâ¼t4 (0,1). SupposeJ=10,thexjvalues are randomly drawn fromaU(0,1) distribution, andnjâ¼Poisson+(5), where Poisson+is the Poisson distributionrestricted to positive values.(a) Sample a dataset at random from the model.(b) Use rejection sampling to get 1000 independent posterior drawsfrom(α,β).(c) Approximate the posterior density for (α,β) by a normal centered at the posteriormode with covariance matrix fit t

in mathematics, a function is a relationship between two variables such that the value of one of the variables, called the dependent variable, is determined by the value of the other variable, called the independent variable. there is a specific term we use to describe the set of independent variables of a function.

spinning a 1, 2, or 3. option d.

step-by-step explanation: when spinning a number graph up to 4, and aiming for any number less than 3, that automatically eliminates the number 4. now you have two numbers to spin on that are less than 3, but the number 3 is included in this question because it's no greater of an number than itself. i hope this you : )

30 miles

step-by-step explanation:

we know that 60 seconds equals 1 minute and 60 minutes 1 hour

44 ft       60 sec     60 min     158400   ft

  *   *   =

1 sec       1 min       1 hour         hour

we know that there are 5280 ft per mile

158400   ft       1 mile         30 miles

  *   =

1   hour               5280 ft     1 hour

so in 1 hour   it can travel 30 miles