6. For each past or present Monash unit, we'll use its unit code to denote the proposition that you have passed the unit. So, if ABC1234 is a unit code, then we'll also use ABC1234 for a proposition with the following meaning: True, if you have passed unit ABC1234: ABC1234 = False, if you have not passed unit ABC1234 (either through never having enrolled in it, or only failing it, or doing it currently so that you haven't finished it yet). Here is an edited extract from the Monash Handbook 2022, specifying the conditions under which you may enrol in FIT2014: Prerequisite: . One of FIT1045, FIT1048, FIT1051, FIT1053, ENG1003, ENG1013 or (FIT1040 and FIT1029) AND . One of MAT1830, MTH1030, MTH1035, ENG1005 Prohibition: . CSE2303 (a) Using these rules and the propositions corresponding to all these unit codes, construct an expression in Conjunctive Normal Form that specifies the conditions under which you may enrol in FIT2014. Now consider how you would construct an equivalent expression in Disjunctive Normal Form: (..A...A.....)VC...A...A...... V........V (...A...A......) disjunct disjunct diajunct (b) Give three of the disjuncts in such an expression.\f