Augustus draws tickets one at a time for a raffle. The person named on the ticket must be present to win, but \[30\%\] of the \[750\] raffle tickets have the names of people who are no longer present. Let \[T\] be the number of tickets Augustus needs to draw to find a winner who is present. Find the probability that Augustus first draws the name of someone present on the \[3^{\text{rd}}\] ticket. You may round your answer to the nearest hundredth. \[P(T=3)=\]
