It is known that four archers with entry number 1~4 took part in the archery competition. (1) Arrange them to the target position of 1~4 by drawing lots, and try to find only one.

Solution: (1) There is a way to choose one of the four athletes whose target number is the same as the entry number.

There are two ways for the other three athletes to have different target numbers and entry numbers.

Therefore, the probability that exactly one athlete draws the same target position number as the entry number is;

(2)① As can be seen from the table, if two people shoot once each, the probability of missing the eighth ring is p = (1-0.2) (1-0.32) = 0.544.

∴ The probability that at least one person hits the 8th ring is p =1-0.544 = 0.456;

② ,

Therefore, Archer II has a high level of archery.