False only knights were under this code.
False. Serfs were legally bound to a certain piece of land and obligated to work for the lord who owned that land, but they were not considered slaves as they were not owned by the lord and did have some legal rights and protections.
True. True. True. True.
true! but.......... false if they are a aggrivated driver.
Serfs owed crops to their lords.Apex.
False
True AND False OR True evaluates to True. IT seems like it does not matter which is evaluated first as: (True AND False) OR True = False OR True = True True AND (False OR True) = True AND True = True But, it does matter as with False AND False OR True: (False AND False) OR True = False OR True = True False AND (False OR True) = False AND True = False and True OR False AND False: (True OR False) AND False = True AND False = False True OR (False AND False) = True OR False = True Evaluated left to right gives a different answer if the operators are reversed (as can be seen above), so AND and OR need an order of evaluation. AND can be replaced by multiply, OR by add, and BODMAS says multiply is evaluated before add; thus AND should be evaluated before OR - the C programming language follows this convention. This makes the original question: True AND False OR True = (True AND False) OR True = False OR True = True
There is no simple true or false answer. The seasons go around in a circle. Winter starts immediately after autumn ends. Then six months after winter ends, autumn comes again, followed by another winter, and so on. Every winter comes before the next autumn and after the last autumn.
True
False. It is software.
True
True
Assuming that you mean not (p or q) if and only if P ~(PVQ)--> P so now construct a truth table, (just place it vertical since i cannot place it vertical through here.) P True True False False Q True False True False (PVQ) True True True False ~(PVQ) False False False True ~(PVQ)-->P True True True False if it's ~(P^Q) -->P then it's, P True True False False Q True False True False (P^Q) True False False False ~(P^Q) False True True True ~(P^Q)-->P True True False False