A milk display case at a grocery store is stocked with cartons of regular milk and soy milk, in both normal calorie and lighter calorie options. The number of cartons of each type is divided according to the following table. Let R = the event that the carton contains regular milk, S = the event that the carton contains soy milk, N = the event that the carton has normal caloric content, and L= the event that the carton has lighter caloric content. A carton is chosen at random. Complete parts (a) through (f) below. Normal Calorie Low Calorie Regular Soy 32 15 A. P(L): (1-P(L')) C. (1-P(L')):P(L) E. P(L'):P(L) The odds against L occurring, in lowest terms, are:0.- (Type whole numbers.) e. Find the odds in favor of RnL occurring. First write an expression for the desired odds. Select all that apply. A. PROL):P((ROL)) C. PROL): (1-P((ROL))) E. P((ROL)) :P(ROL) 18 17 The odds in favor of RnL occurring, in lowest terms, are (Type whole numbers.) f. Find the odds against SUN occurring First write an expression for the desired odds. Select all that apply. A. (1-P(SUN)): P(SUN) C. P(SUN):P((SUN)") E. P(SUN)): (1-P((SUN))) The odds against SUN occurring, in lowest terms, are:- (Type whole numbers.) B. P(L): (1-P(L)) D. 1-P(L):P(L) OF P(L):P(L') B. P(RnL):(1-P(RnL)) D. (1-P(RL)): P(RnL) OF. (1-P((ROL))) :P(ROL) B. P(SUN): (1-P(SUN)) D. (1-P((SUN))) :P(SUN) OF. P((SUN)) :P(SUN)

parts e and f

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A milk display case at a grocery store is stocked with cartons of regular milk and soy milk, in both normal calorie and lighter calorie options. The number of cartons of each type is divided according to the following table. Let R = the event that the carton contains regular milk, S = the event that the carton contains soy milk, N = the event that the carton has normal caloric content, and L = the event that the carton has lighter caloric content. A carton is chosen at random. Complete parts (a) through (f) below. Normal Calorie Low Calorie Regular Soy 32 15 18 17 (...) A. P(L): (1-P(L')) B. P(L): (1-P(L)) C. (1-P(L')): P(L) D. 1-P(L): P(L) F. P(L): P(L') E. P(L'): P(L) The odds against L occurring, in lowest terms, are (Type whole numbers.) e. Find the odds in favor of R n L occurring. First write an expression for the desired odds. Select all that apply. A. P(ROL):P ((ROL)) B. P(ROL): (1-P(RnL)) C. P(RnL): (1-P((ROL))) D. (1-P(RnL)):P(RnL) E. P((ROL)) :P(ROL) OF. (1-P((ROL))) :P(RnL) The odds in favor of R n L occurring, in lowest terms, are (Type whole numbers.) f. Find the odds against S U N occurring. First write an expression for the desired odds. Select all that apply. A. (1-P(SUN)): P(SUN) B. P(SUN): (1-P(SUN)) C. P(SUN):P ((SUN)') D. (1-P ((SUN)')) :P(SUN) E. P(SUN)): (1-P ((SUN))) F. P((SUN)) :P(SUN) The odds against S U N occurring, in lowest terms, are (Type whole numbers.)