What if all three are different from each other? Or, if two agree, how do you know that the two are not both wrong?
If you have 30 clocks and 20 say one time while 10 say another time, do you go with the majority? Is there not a small probability that the 10 are correct? :) Lux, James P wrote: > > > > The man who has two clocks never knows which one is right. You need at > least three. > > _______________________________________________ time-nuts mailing list -- [email protected] To unsubscribe, go to https://www.febo.com/cgi-bin/mailman/listinfo/time-nuts and follow the instructions there.
