Kamalam went to play a lucky draw contest. 135 tickets of the lucky draw were sold. If the probability of Kamalam winning is `(1)/(9)`, then the number of tickets bought by Kamalam is

Football teams T_(1) and T_(2) have to play two games against each other. It is assumed that the outcomes of the two games are independent. The probabilities of T_(1) winning,drawing and losing a game against T_(2) are (1)/(2),(1)/(6) and (1)/(3) , respectively. Each teams gets 3 points for a win, 1 point of a drawn and 0 point for a loss in a games. P(X=Y) is

One ticket is selected at random from 100 tickets numbered 00,01,02,...,98,99. Suppose S and T are the sum and product of the digits of the number on the ticket, then the probability of getting S=9 and T=0 is 2//19 b. 19//100 c. 1//50 d. none of these

Football teams T_(1)and T_(2) have to play two games are independent. The probabilities of T_(1) winning, drawing and lossing a game against T_(2) are 1/2,1/6and 1/3, respectively. Each team gets 3 points for a win, 1 point for a draw and 0 point for a loss in a game. Let X and Y denote the total points scored by teams T_(1) and T_(2) respectively, after two games. P(XgtY) is

The members of a chess club took part in a round robin competition in which each player plays with other once. All members scored the same number of points, except four juniors whose total score ere 17.5. How many members were there in the club? Assume that for each win a player scores 1 point, 1/2 for a draw, and zero for losing.