Consider the following betting game:
On a ticket with 60 available numbers, a bettor chooses from 6 to 10 numbers. Among the available numbers, only 6 will be drawn. The bettor will be awarded if the 6 drawn numbers are among the numbers chosen by him on the same ticket.
The table presents the price of each ticket, according to the quantity of numbers chosen.
| \begin{tabular}{ c } Quantity of numbers |
| chosen on a ticket |
& Ticket price (R\$) \hline 6 & 2.00 \hline 7 & 12.00 \hline 8 & 40.00 \hline 9 & 125.00 \hline 10 & 250.00 \hline \end{tabular}
Five bettors, each with R\$ 500.00 to bet, made the following choices:
Arthur: 250 tickets with 6 numbers chosen; Bruno: 41 tickets with 7 numbers chosen and 4 tickets with 6 numbers chosen; Caio: 12 tickets with 8 numbers chosen and 10 tickets with 6 numbers chosen; Douglas: 4 tickets with 9 numbers chosen; Eduardo: 2 tickets with 10 numbers chosen.
The two bettors with the highest probabilities of being awarded are
(A) Caio and Eduardo. (B) Arthur and Eduardo. (C) Bruno and Caio. (D) Arthur and Bruno. (E) Douglas and Eduardo.