CAT Question Bank - Games & Tournaments

  • Q12) A gaming company has created a computer based cricket game, in which a player can face different types of balls and hit different shots on them. Depending on the choice of shot and the timing, a player can score 2, 3, 4 or 6 runs. If the player misses the shot, a wicket is lost, which also causes a deduction of 5 runs in the score. No other result is possible on a ball. If a player faces 60 balls in a game, which of the following is not a possible score at the end of the game?
    A) 280 runs with 7 wickets lost
    B) 290 runs with 6 wickets lost
    C) 271 runs with 8 wickets lost
    D) 259 runs with 9 wickets lost

    [OA: C]

  • The maximum score possible in the game is 360 (60 balls × 6 runs) with no wickets lost.
    For each wicket lost, this score decreases by 11 (6 runs not scored plus 5 runs lost due to the wicket). For example, if 3 wickets are lost, the maximum possible score is 327 [360 − (3 × 11)], which could be achieved by hitting sixes on all the remaining 57 balls.
    For 7, 6, 9 and 8 wickets lost (as given in the options), the maximum possible scores are 283, 294, 261 and 272 respectively.
    The scores in options 1 and 2 can be achieved if a player hits 3 or 2 runs instead of 6 on one ball. However, option 3 is not possible, as for that, a player would have to hit 5 runs instead of 6 on one ball, which is not possible in this game.
    Hence, option C.
    [Credits : Lokesh Agarwal]

  • Q13) A game is played between 2 players and one player is declared as winner. All the winners from first round, played in the second round. All the winners from second round played in third round and so on. If 8 rounds were played to declare only one player as winner, how many players played in first round?
    (a) 256
    (b) 128
    (c) 255
    (d) 127

    [OA: 256]

  • Q14) Six men engaged in a game. Whenever a player won a game he doubled the money of each of the players. That is, he gave each player as much money as he/she originally had in his/her pocket. They played six games and each player won one game. In the end all of them had Rs. 256 each. What was the difference between the money the person with the highest amount had and the person with the smallest amount had to start off with?

  • Q15) In the game of Dubblefud, red chips, blue chips and green chips are each worth 2,4 and 5 points respectively. In a certain selection of chips, the product of the point values of the chips is 16,000. If the number of blue chips in this selection equals the number of green chips, how many red chips are in the selection?
    a) 1
    b) 2
    c) 3
    d) 4
    e) 5

    [OA: 1]

  • case 1: we are selecting no couple.
    2 males can be selected in 4c2 = 6 ways.
    We cannot select the wives of already selected males and should go for others.
    so 2c2=1 way.
    So in total 2 males and 2 females can be selected in 4c2 * 2c2 = 6 ways..
    now the teams can be interchanged as well.
    so 6 * 2 = 12 games possible.

    case 2: when exactly one couple is selected.
    so u can select that couple in 4c1=4 ways.
    Now after this u need to select 1 male and 1 female more but they should not be a couple.
    so selecting 1 male from remaining 3 males in 3c1 way and now for a female u have 2 options left..
    so 4c1 * 3c1 * 2 = 24 ways

    case 3: when the 2 couples are selected. so 4c2 = 6 ways

    Total = 42

    Note : Assume A1 B1 and A2 B2 are the two couples selected. Now they cannot be in same team but can play in the same game. A1B2 in one team and A2B1 in other team

    [Credits: Jasneet Dua]

  • Q16) Ashwin and Vijay are playing a game wherein each of them have to choose any no. between 2 and 5. For e.g. if Ashwin picks up 4 then Vijay can next pick from 6 and 9; following which Ashwin can again choose from 8 and 14 depending on what the former person has chosen. The person who chooses 60 first wins.

    1. Given that Ashwin starts the game what no should he choose first ?
      (a) 4
      (b) 5
      (c) 3
      (d) he can never win

    2. Ashwin starts first and chooses 10; what should Vijay choose next in order to win?
      (a) 14
      (b) 11
      (c) 12
      (e) None of the above

  • Q17) Four players – P, Q, R and S – played a game of bursting balloons by shooting at them. In this game the following terms are defined.

    Aim = One attempt of shooting at a balloon.
    Shot = One instance of shooting down a balloon.
    Miss = One wasted aim.

    The rules of the game are as follows:

    (i) Each person will be given a maximum of four rounds of aims, the first round comprising three aims. A person gets the second round of aims only if he scores at least one shot in the first (i.e. the previous) round and so on.

    (ii) ( If in any round, the number of shots by a player is 50% or more but less than 100% of the number of aims he had in that round, then he gets one extra aim in each of the remaining rounds. If the number of shots by the player is 100% of the number of aims he had in that round, he gets two extra aims in each of the remaining rounds.)

    (iii) For each shot, a player is awarded five points and for each miss, he earns two negative points.

    If the number of shots in P’s first round = that in Q’s third round = that in S’s second round = that in R’s fourth round, and P scored eight points in the second round, then what is the maximum possible score by Q in the fourth round?

  • Q18) A game is played on a square grid made of a hundred squares the bottom left hand corner square being numbered 1 and the top left hand corner square being numbered 100. The numbering is done sequentially, from left to right in the bottom row and from right to left in the row above and so on. The game ends when a counter reaches or crosses the square numbered 100. The game is played with a pair of dice (six faced). If one of the dice shows two and the other shows six, then the player has to move forward by 6 + 2 = 8 squares. If a player is on square number 96, what is the probability that the game ends after one throw of the dice?

  • Q19) Seven Hockey teams A, B, C, D, E, F and G participated in a tournament. Each team played with every other team twice and D won all of its games and F lost all of its games. B and G scored equal points and are ahead of C. C, A and E also scored equal number of points. Each team gets 3 points, 1 point and no point for a win, draw and loss respectively. What is the highest possible number of points that can be scored by team A?
    b. 15
    c. 16
    d. 17

    [OA: 17]

  • Total number of matches = 42
    Total points without draw = 42 * 3 = 126
    with draw point reduces by 1
    because win-lose - point distribution = 3
    draw -draw= point distribution=2
    Let the total points of A,C,E be a and that of B and G be b
    3a + 2b + 36 = Total points [ also a < b ]
    Total points can be 126 or 125 or 124 and so on
    But our objective is to maximize a we have to take value of total as high as possible.
    3a + 2b = 126 then max = 16
    but if we take 3a + 2b = 125 then max(a) = 17
    so 17

    [Credits : @hemant_malhotra]

  • Q20) From a group of N players, coach has to select a captain. Even after holding a series of meetings, the team management and the players failed to reach a consensus. It was then proposed that all N players be given a number from 1 to N. Then they will be asked to stand on a podium in a circular arrangement, and counting would start from the player numbered 1. The counting would be done in a clockwise fashion. The rule is that every alternate player would be asked to step down as the counting continued, with the circle getting smaller and smaller, till only one person remains standing. Therefore the first person to be eliminated would be the player number 2. If N is 545, which position should a player choose if he has to be the captain?
    (a) 3
    (b) 67
    (c) 195
    (d) 323
    (e) 451

    [OA: 67]

  • Q21) A dartboard is divided into 4 concentric circles having radii of 1 cm, 2 cm, 3 cm and 4 cm respectively. The prize amounts for hitting the circles (starting from the innermost circle)are Rs. 40, Rs. 30, Rs. 20 and Rs. 10 respectively. Every participant has to purchase a ticket in order to be able to throw the dart once. How much amount should the organizer of the game charge per ticket so as to ensure that he will end up with no-profit and no-loss situation? (Assume that a large number of participants participate in the game and every participant in the game randomly throws the dart towards the dartboard and always hits the dartboard.)
    a) Rs. 23.25
    b) Rs. 27.00
    c) Rs. 18.75
    d) Rs. 16.50

    [OA: 18.75]

  • Q22) Crap is a popular game in which you throw a pair of dice one or more times until you either win or lose. There are two ways to win in the game. You can throw the dice once and obtain a score of 7 or 11 in the first throw, or you can obtain a 4,5,6,8,9, or 10 on the first throw and repeat the same score on the subsequent throw before you obtain a 7. There are two ways to lose. you can throw the dice once and obtain a 2,3, or 12, or you can obtain a 4, 5, 6, 8, 9, or 10 on the first throw and then obtain a 7 on a subsequent throw before you repeated your original score.

    What is the probability that a person wins on the 2nd throw?
    a) 100/1296
    b) 50/1296
    c) 100/216
    d) 50/216
    e) None of these

    What is the probability that a person loses on the 2nd throw ?
    a) 100/1296
    b) 120/1296
    c) 144/1296
    d) 72/1296
    e) None of these

  • Q23) Four friends A, B, C and D are playing a game “Pass it on”. Initially each of them has 24 coins. The game starts with A passing a coin to B, then B passing 2 coins to C, then C passing 3 coins to D and then D passing 4 coins to A . At this point, one round is completed. In the 2nd round, A passes 5 coins to B, B passes 6 coins to C and so on. The game ends when one person has all the coins and he is declared the winner. Find the number of coins with B in the 8th round just after he has received the coins from A.
    a) 32
    b) 44
    c) 45
    d) 46

  • Q24) There are 111 players participating in a singles tennis tournament. The player who is losing will be out of the tournament. For each and every match, One new ball is taken. Find the no. of balls required for the entire tournament ?

  • Q25) In a mathematical game, one hundred people are standing in a line and they are required to count off in fives as one, two, three, four, five, one two, three, four, five and so on from the first person in the line. the person who says five is taken out of the line. those remaining repeat this procedure until only four people are left in the line. What was the original position in the line of the last person to leave?
    a. 93
    b. 96
    c. 97
    d. 98

    [OA: D]

  • Q26) In a chess tournament, every player plays one match against every other player. Each match can result in a draw or win to one player anddefeat of the other player. Players are awarded 1 point for every win, 0 points for every defeat and 0.5 points for every draw. In all, 4Russians and more than one American were the only participants in the tournament. Russian players together scored 21 points in the tournament and all American players scored equal number of non-zero integer number of points. How many points were scored by each American player?
    a) 10
    b) 8
    c) 3
    d) More than one answer possible

  • Q27) There are 16 teams and they are divided into 2 pools of 8 each. Each team in a group plays against one another on a round-robin basis. Draws in the competition are not allowed. The top four teams from each group will qualify for the next round i.e round 2. In case of teams having the same number of wins, the team with better run-rate would be ranked ahead.

    1. Minimum number of wins required to qualify for the next round ?
    2. Minimum number of wins required to guarantee qualification in the next round ?

    1. 1 group is consisting of 8 teams. So each team will play 7 match each. Suppose each of the 8 teams were seeded and we consider the case where a higher seeded team will always win.
      So the number of wins for the 8 teams would be 7,6,5,4,3,2,1,0 with highest seeded team winning all and lowest seeded team losing all.
      For minimum number of wins we allow 3 teams to win maximum number of matches. Of the remaining 5 teams just find out the mean of their number of wins.
      In this case it would be (4+3+2+1+0)/5=2.
      So 5 teams can end up with 2 wins each and a team with better run rate will qualify with 2 wins.

    2. In this case consider the mean of first 5 higher seeded teams
      So it may be the case that 5 teams can end up having 5 wins each. And hence 1 team will miss the second round birth. So minimum number of wins to guarantee a place would be 6.

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