A magician shuffles a standard deck of playing cards and allows an audience member to pull out a card, look at it, and replace it in the deck. Two additional people do the same. Find the probability that of the 3 cards drawn, at least 1 is a face card. (Round your answer to one decimal place.)
The probability of drawing a face card (defined here as a jack, queen, or king) from a standard deck of cards is $\frac{12}{52}=\frac{3}{13}$.
The probability of NOT drawing a face card is therefore $1-\frac{3}{13}=\frac{10}{13}$.
The probability of drawing three non-face cards in a row is $\left(\frac{10}{13}\right)^3 = \frac{1000}{2197}$.
Therefore, the probability of drawing at least 1 face card out of 3 is $1-\frac{1000}{2197}=\boxed{0.54}$.