Recall the truncated distribution function F'* and the algorithm for generating from it, as given in Sec. 8.2.1. Show that the algorithm stated in Sec. 8.2.1 is valid when F is continuous and strictly increasing. Show that the following algorithm is also valid for generating x with distribution function F* (assume again that F is continuous and strictly increasing): Generate U tilde U(0, 1). If F(a) lessthanorequalto U lessthanorequalto F(b), return X = F^-1(U). Otherwise, go back to step 1. Which algorithm do you think is "better"? In what sense? Under what conditions? Recall the truncated distribution function F'* and the algorithm for generating from it, as given in Sec. 8.2.1. Show that the algorithm stated in Sec. 8.2.1 is valid when F is continuous and strictly increasing. Show that the following algorithm is also valid for generating x with distribution function F* (assume again that F is continuous and strictly increasing): Generate U tilde U(0, 1). If F(a) lessthanorequalto U lessthanorequalto F(b), return X = F^-1(U). Otherwise, go back to step 1. Which algorithm do you think is "better"? In what sense? Under what conditions