Reasoning Based DI - 2 || Data interpretation || CAT 2021 || 16 April (App update required to attempt this test)
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Question 1
Direction: Read the information carefully and give the answer of the following questions-
Twenty five coloured beads are to be arranged in a grid comprising of five rows and five columns. Each cell in the grid must contain exactly one bead. Each bead is coloured either Red, Blue or Green. While arranging the beads along any of the five rows or along any of the five columns, the rules given below are to be followed: 1) Two adjacent beads along the same row or column are always of different colours. 2) There is at least one Green bead between any two Blue beads along the same row orcolumn. 3) There is at least one Blue and at least one Green bead between any two Red beads along the same row or column. Every unique, complete arrangement of twenty five beads is called a configuration
Question 2
Direction: Read the information carefully and give the answer of the following questions-
Twenty five coloured beads are to be arranged in a grid comprising of five rows and five columns. Each cell in the grid must contain exactly one bead. Each bead is coloured either Red, Blue or Green. While arranging the beads along any of the five rows or along any of the five columns, the rules given below are to be followed: 1) Two adjacent beads along the same row or column are always of different colours. 2) There is at least one Green bead between any two Blue beads along the same row orcolumn. 3) There is at least one Blue and at least one Green bead between any two Red beads along the same row or column. Every unique, complete arrangement of twenty five beads is called a configuration
Question 3
Direction: Read the information carefully and give the answer of the following questions-
Twenty five coloured beads are to be arranged in a grid comprising of five rows and five columns. Each cell in the grid must contain exactly one bead. Each bead is coloured either Red, Blue or Green. While arranging the beads along any of the five rows or along any of the five columns, the rules given below are to be followed: 1) Two adjacent beads along the same row or column are always of different colours. 2) There is at least one Green bead between any two Blue beads along the same row orcolumn. 3) There is at least one Blue and at least one Green bead between any two Red beads along the same row or column. Every unique, complete arrangement of twenty five beads is called a configuration
Question 4
Direction: Read the information carefully and give the answer of the following questions-
Twenty five coloured beads are to be arranged in a grid comprising of five rows and five columns. Each cell in the grid must contain exactly one bead. Each bead is coloured either Red, Blue or Green. While arranging the beads along any of the five rows or along any of the five columns, the rules given below are to be followed: 1) Two adjacent beads along the same row or column are always of different colours. 2) There is at least one Green bead between any two Blue beads along the same row orcolumn. 3) There is at least one Blue and at least one Green bead between any two Red beads along the same row or column. Every unique, complete arrangement of twenty five beads is called a configuration
Question 5
Directions: Six friends, A through F, bought shares of six companies, P to U on a particular day, say Day 1. Each friend bought shares of at least one of these companies and no friend had any share of any company before that day. On the very next day, say Day 2, all of them sold all the shares that they had bought on Day 1. Shares are always bought or sold on their respective market values. The market values (in ₹) of 1 share of each of the companies, P through U, in that order, were 1200, 1400, 1000, 1500, 1300 and 900 on Day 1. On Day 2, the market values (in ₹) of 1 share of each of the companies were 900, 1500, 1300, 1000, 1200 and 1400 respectively. Further, it was also known that:
(i) No friend paid any additional charge (brokerage, etc.) in buying or selling shares.
(ii) Each friend bought different number of shares and no one of them bought more than 6 shares.
(iii) No two friends bought shares of the same company.
(iv) All the questions below are pertaining to the transactions and the period mentioned above.
Question 6
Directions: Six friends, A through F, bought shares of six companies, P to U on a particular day, say Day 1. Each friend bought shares of at least one of these companies and no friend had any share of any company before that day. On the very next day, say Day 2, all of them sold all the shares that they had bought on Day 1. Shares are always bought or sold on their respective market values. The market values (in ₹) of 1 share of each of the companies, P through U, in that order, were 1200, 1400, 1000, 1500, 1300 and 900 on Day 1. On Day 2, the market values (in ₹) of 1 share of each of the companies were 900, 1500, 1300, 1000, 1200 and 1400 respectively. Further, it was also known that:
(i) No friend paid any additional charge (brokerage, etc.) in buying or selling shares.
(ii) Each friend bought different number of shares and no one of them bought more than 6 shares.
(iii) No two friends bought shares of the same company.
(iv) All the questions below are pertaining to the transactions and the period mentioned above.
Question 7
Directions: Six friends, A through F, bought shares of six companies, P to U on a particular day, say Day 1. Each friend bought shares of at least one of these companies and no friend had any share of any company before that day. On the very next day, say Day 2, all of them sold all the shares that they had bought on Day 1. Shares are always bought or sold on their respective market values. The market values (in ₹) of 1 share of each of the companies, P through U, in that order, were 1200, 1400, 1000, 1500, 1300 and 900 on Day 1. On Day 2, the market values (in ₹) of 1 share of each of the companies were 900, 1500, 1300, 1000, 1200 and 1400 respectively. Further, it was also known that:
(i) No friend paid any additional charge (brokerage, etc.) in buying or selling shares.
(ii) Each friend bought different number of shares and no one of them bought more than 6 shares.
(iii) No two friends bought shares of the same company.
(iv) All the questions below are pertaining to the transactions and the period mentioned above.
Question 8
A young girl Roopa leaves home with x flowers, goes to the bank of a nearby river. On the bank of the river, there are four places of worship, standing in a row. She dips all the x flowers into the river. The number of flowers doubles. Then she enters the first place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the second place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the third place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the fourth place of worship, offers y flowers to the deity. Now she is left with no flowers in hand.
Question 9
A young girl Roopa leaves home with x flowers, goes to the bank of a nearby river. On the bank of the river, there are four places of worship, standing in a row. She dips all the x flowers into the river. The number of flowers doubles. Then she enters the first place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the second place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the third place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the fourth place of worship, offers y flowers to the deity. Now she is left with no flowers in hand.
Question 10
A young girl Roopa leaves home with x flowers, goes to the bank of a nearby river. On the bank of the river, there are four places of worship, standing in a row. She dips all the x flowers into the river. The number of flowers doubles. Then she enters the first place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the second place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the third place of worship, offers y flowers to the deity. She dips the remaining flowers into the river, and again the number of flowers doubles. She goes to the fourth place of worship, offers y flowers to the deity. Now she is left with no flowers in hand.
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