Logichard
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A Boolean function f(P,Q,R)f(P, Q, R) of three variables is called 'bipolar-symmetric' if it is both self-dual, meaning f(P,Q,R)=¬f(¬P,¬Q,¬R)f(P, Q, R) = \neg f(\neg P, \neg Q, \neg R), and fully symmetric under any permutation of its variables. How many distinct bipolar-symmetric Boolean functions of three variables exist?