A bag contains 3 white, 3 black and 2 red balls. One by one, three balls are drawn without replacing them. Find the probability that the third ball is red.

If third ball is red, then in first two draws, there will be either no red ball or one red ball.
Let events
`R_(0)=` in first two draws, red ball is drawn
`R_(1)` = in first two draws, one red ball is drawn.
`R=` in third draw , red ball is drawn.
So, from total probability theorem,
`P(R)=P(R_(0))P(R//R_(0))+P(R_(1))P(R//R_(1))`
`=(""^(6)C_(2))/(""^(8)C_(2)).(""^(2)C_(1))/(""^(6)C_(1))+(""^(6)C_(1)""^(2)C_(1))/(""^(8)C_(2)).(""^(1)C_(1))/(""^(6)C_(1))`
`=15/28.(2)/(6)+(6xx2)/(28).1/6=1/4`