Comment by ggm 3 months ago 8.75% surely? you need at least two digits of specious precision on that non-random number. 1 comment ggm Reply cozzyd 3 months ago More likely 8.333% I would think (1/12). The same probability of a broken clock yielding the correct hour.
cozzyd 3 months ago More likely 8.333% I would think (1/12). The same probability of a broken clock yielding the correct hour.
More likely 8.333% I would think (1/12). The same probability of a broken clock yielding the correct hour.