{
  "title": "SSC Selection Post Phase-X Examination",
  "allow_calculator": true,
  "sections": 
[{"name": "General Intelligence", "questions": [{"q_num": 1, "page": 0, "text": "In a code language, 'BRACE' is written as ‘GECTD’ and 'DORM' is written as 'OTQF'.\nHow will 'INQUEST' be written in that language?", "raw_options": [{"text": "1. VUGWSPK", "is_ans": false}, {"text": "2. VUGWSPJ", "is_ans": false}, {"text": "3. VUGWSTK", "is_ans": false}, {"text": "4. VUGWSTJ", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. VUGWSTK"}, {"is_ans": false, "type": "TEXT", "text": "2. VUGWSPJ"}, {"is_ans": false, "type": "TEXT", "text": "4. VUGWSTJ"}, {"is_ans": true, "type": "TEXT", "text": "1. VUGWSPK"}], "imgs": []}, {"q_num": 2, "page": 0, "text": "Select the option that represents the correct order of the given words as they would\nappear in an English dictionary.(Note: the given words may or may not be meaningful\nwords).\n1.Economist\n2.Earlier\n3.Ecology\n4.Embarrass\n5.Emergency", "raw_options": [{"text": "1. 2, 3, 1, 4, 5", "is_ans": false}, {"text": "2. 2, 1, 3, 5, 4", "is_ans": false}, {"text": "3. 2, 3, 1, 5, 4", "is_ans": false}, {"text": "4. 2, 1, 3, 4, 5", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 2, 3, 1, 4, 5"}, {"is_ans": false, "type": "TEXT", "text": "3. 2, 3, 1, 5, 4"}, {"is_ans": false, "type": "TEXT", "text": "4. 2, 1, 3, 4, 5"}, {"is_ans": false, "type": "TEXT", "text": "2. 2, 1, 3, 5, 4"}], "imgs": []}, {"q_num": 3, "page": 0, "text": "In a certain code language, 'CATHOLIC' is written as '79', 'AUDIENCE' is written as '70',\nhow will 'ASSEMBLY' be written in that language?", "raw_options": [{"text": "1. 109", "is_ans": false}, {"text": "2. 108", "is_ans": false}, {"text": "3. 100", "is_ans": false}, {"text": "4. 104", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. 100"}, {"is_ans": false, "type": "TEXT", "text": "4. 104"}, {"is_ans": true, "type": "TEXT", "text": "1. 109"}, {"is_ans": false, "type": "TEXT", "text": "2. 108"}], "imgs": []}, {"q_num": 4, "page": 1, "text": "Which two numbers (not the digits of the numbers) and two signs should be\ninterchanged to make the given equation correct?\n25 ÷ 12 × 5 − 36 + 24 = 72", "raw_options": [{"text": "1. 5 and 12; × and −", "is_ans": false}, {"text": "2. 5 and 12; + and −", "is_ans": false}, {"text": "3. 36 and 25; × and +", "is_ans": false}, {"text": "4. 24 and 5; + and −", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 5 and 12; + and −"}, {"is_ans": false, "type": "TEXT", "text": "3. 36 and 25; × and +"}, {"is_ans": false, "type": "TEXT", "text": "4. 24 and 5; + and −"}, {"is_ans": true, "type": "TEXT", "text": "1. 5 and 12; × and −"}], "imgs": []}, {"q_num": 5, "page": 1, "text": "Pointing towards a woman, Allwyn said, “She is the mother of my brother’s son’s\nbrother’s mother’s husband.” How is that woman related to Allwyn’s brother?", "raw_options": [{"text": "1. Mother’s sister", "is_ans": false}, {"text": "2. Mother", "is_ans": false}, {"text": "3. Mother’s mother", "is_ans": false}, {"text": "4. Sister", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. Mother"}, {"is_ans": false, "type": "TEXT", "text": "4. Sister"}, {"is_ans": true, "type": "TEXT", "text": "1. Mother’s sister"}, {"is_ans": false, "type": "TEXT", "text": "3. Mother’s mother"}], "imgs": []}, {"q_num": 6, "page": 1, "text": "Which letter-cluster will replace the question mark (?) and complete the given series?\nUZVD, SCTG, ?, OIPM, MLNP", "raw_options": [{"text": "1. QFRJ", "is_ans": false}, {"text": "2. PFRJ", "is_ans": false}, {"text": "3. PFSJ", "is_ans": false}, {"text": "4. QFSJ", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. QFSJ"}, {"is_ans": false, "type": "TEXT", "text": "3. PFSJ"}, {"is_ans": false, "type": "TEXT", "text": "2. PFRJ"}, {"is_ans": true, "type": "TEXT", "text": "1. QFRJ"}], "imgs": []}, {"q_num": 7, "page": 1, "text": "Select the word-pair that best represents a similar relationship to the one expressed in\nthe pair of words given below. (The words must be considered as meaningful English\nwords and must not be related to each other based on the number of letters/number of\nconsonants/vowels in the word)\nRoom heater : Winter", "raw_options": [{"text": "1. Raincoat : Monsoon", "is_ans": false}, {"text": "2. Leaves : Autumn", "is_ans": false}, {"text": "3.  Heat : Summer", "is_ans": false}, {"text": "4. Wind : Spring", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. Leaves : Autumn"}, {"is_ans": false, "type": "TEXT", "text": "3.  Heat : Summer"}, {"is_ans": true, "type": "TEXT", "text": "1. Raincoat : Monsoon"}, {"is_ans": false, "type": "TEXT", "text": "4. Wind : Spring"}], "imgs": []}, {"q_num": 8, "page": 2, "text": "In a certain code language, ‘LENGTH’ is written as ‘MDKGSF’ and ‘ESCAPE’ is written\nas ‘BRDDOZ’. How will ‘MARGIN’ be written in that language?", "raw_options": [{"text": "1.  QZLFMH", "is_ans": false}, {"text": "2.  QLZMHF", "is_ans": false}, {"text": "3. QZLMHF", "is_ans": false}, {"text": "4. QZLFHM", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. QZLMHF"}, {"is_ans": false, "type": "TEXT", "text": "2.  QLZMHF"}, {"is_ans": true, "type": "TEXT", "text": "1.  QZLFMH"}, {"is_ans": false, "type": "TEXT", "text": "4. QZLFHM"}], "imgs": []}, {"q_num": 9, "page": 3, "text": "", "raw_options": [{"type": "IMAGE", "data": {"xref": 218, "path": "/home/user/extracted_diagrams_shift3/xref_218.jpeg", "width": 210, "height": 196, "y0": 164.0637664794922}, "is_ans": false}, {"text": "1.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 220, "path": "/home/user/extracted_diagrams_shift3/xref_220.jpeg", "width": 212, "height": 192, "y0": 297.7411193847656}, "is_ans": false}, {"text": "2.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 221, "path": "/home/user/extracted_diagrams_shift3/xref_221.jpeg", "width": 209, "height": 192, "y0": 428.7691345214844}, "is_ans": false}, {"text": "3.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 222, "path": "/home/user/extracted_diagrams_shift3/xref_222.jpeg", "width": 212, "height": 190, "y0": 559.8004760742188}, "is_ans": false}, {"text": "4.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "IMAGE_LABEL", "label": "1.", 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"]}, {"q_num": 10, "page": 4, "text": "Which of the following numbers will replace the question mark (?) in the given series?\n13, 21, ?, 69, 133", "raw_options": [{"text": "1. 52", "is_ans": false}, {"text": "2. 37", "is_ans": false}, {"text": "3. 33", "is_ans": false}, {"text": "4. 41", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. 41"}, {"is_ans": false, "type": "TEXT", "text": "2. 37"}, {"is_ans": true, "type": "TEXT", "text": "1. 52"}, {"is_ans": false, "type": "TEXT", "text": "3. 33"}], "imgs": []}, {"q_num": 11, "page": 4, "text": "Select the set in which the numbers are related in the same way as are the numbers of\nthe following sets.\n(NOTE : Operations should be performed on the whole numbers, without breaking\ndown the numbers into its constituent digits. E.g. 13 – Operations on 13 such as\nadding /deleting /multiplying etc. to 13 can be performed. Breaking down 13 into 1 and\n3 and then performing mathematical operations on 1 and 3 is NOT allowed)\n(7, 35, 42), (4, 20, 24)", "raw_options": [{"text": "1. (8, 56, 72)", "is_ans": false}, {"text": "2. (9, 45, 54)", "is_ans": false}, {"text": "3. (6, 36, 48)", "is_ans": false}, {"text": "4. (12, 60, 48)", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. (12, 60, 48)"}, {"is_ans": false, "type": "TEXT", "text": "2. (9, 45, 54)"}, {"is_ans": false, "type": "TEXT", "text": "3. (6, 36, 48)"}, {"is_ans": true, "type": "TEXT", "text": "1. (8, 56, 72)"}], "imgs": []}, {"q_num": 12, "page": 4, "text": "", "raw_options": [{"text": "1. A", "is_ans": false}, {"text": "2. 1", "is_ans": false}, {"text": "3. ∞", "is_ans": false}, {"text": "4. ∇", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 1"}, {"is_ans": true, "type": "TEXT", "text": "1. A"}, {"is_ans": false, "type": "TEXT", "text": "3. ∞"}, {"is_ans": false, "type": "TEXT", "text": "4. ∇"}], "imgs": 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"]}, {"q_num": 13, "page": 4, "text": "In a code language, 'TRAIN' is written as ‘PKCTV’ and 'MESH' is written as 'JUGO'.\nHow will 'OMBRE' be written in that language?", "raw_options": [{"text": "1. QODTG", "is_ans": false}, {"text": "2. GODTQ", "is_ans": false}, {"text": "3. GTDQQ", "is_ans": false}, {"text": "4. GTDOQ", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. GTDOQ"}, {"is_ans": false, "type": "TEXT", "text": "3. GTDQQ"}, {"is_ans": false, "type": "TEXT", "text": "2. GODTQ"}, {"is_ans": true, "type": "TEXT", "text": "1. QODTG"}], "imgs": []}, {"q_num": 14, "page": 5, "text": "In a certain code language, 'he loves children' is written as 'AA CC PP', 'children like\ncandies' is written as 'ZZ PP QQ' and 'she loves candies' is written as 'QQ AA NN'.\nWhat is the code for the word 'like' in that language?", "raw_options": [{"text": "1. PP", "is_ans": false}, {"text": "2. NN", "is_ans": false}, {"text": "3. ZZ", "is_ans": false}, {"text": "4. QQ", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. NN"}, {"is_ans": false, "type": "TEXT", "text": "4. QQ"}, {"is_ans": false, "type": "TEXT", "text": "3. ZZ"}, {"is_ans": true, "type": "TEXT", "text": "1. PP"}], "imgs": []}, {"q_num": 15, "page": 5, "text": "Three statements are given, followed by three conclusions numbered I, II and III.\nAssuming the statements to be true, even if they seem to be at variance with\ncommonly known facts, decide which of the conclusions logically follow(s) from the\nstatements.\nStatements:\nAll tigers are fishes.\nNo elephant is a tiger.\nSome deer are tigers.\nConclusions:\nI. Some fishes are deer.\nII. No elephant is a deer.\nIII. No deer is a fish.", "raw_options": [{"text": "1. Only conclusion I and III follow.", "is_ans": false}, {"text": "2. Only conclusion I follows.", "is_ans": false}, {"text": "3. Only conclusion II follows.", "is_ans": false}, {"text": "4. Only conclusion I and II follow.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Only conclusion II follows."}, {"is_ans": true, "type": "TEXT", "text": "1. Only conclusion I and III follow."}, {"is_ans": false, "type": "TEXT", "text": "4. Only conclusion I and II follow."}, {"is_ans": false, "type": "TEXT", "text": "2. Only conclusion I follows."}], "imgs": []}, {"q_num": 16, "page": 5, "text": "Select the word-pair that best represents a similar relationship to the one expressed in\nthe pair of words given below.\n(The words must be considered as meaningful English words and must not be related\nto each other based on the number of letters/number of consonants/vowels in the\nword.)\nBird : Badminton", "raw_options": [{"text": "1. Cue : Billiards", "is_ans": false}, {"text": "2. Kohli : Cricket", "is_ans": false}, {"text": "3. Wash : Dishes", "is_ans": false}, {"text": "4. Ronaldo : Football", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. Kohli : Cricket"}, {"is_ans": false, "type": "TEXT", "text": "4. Ronaldo : Football"}, {"is_ans": true, "type": "TEXT", "text": "1. Cue : Billiards"}, {"is_ans": false, "type": "TEXT", "text": "3. Wash : Dishes"}], "imgs": []}, {"q_num": 17, "page": 5, "text": "Select the option that is related to the third word in the same way as the second word\nis related to the first word. (The words must be considered as meaningful English\nwords and must NOT be related to each other based on the number of letters/number\nof consonants/vowels in the word.)\nLoss : Profit :: Expense : ?________", "raw_options": [{"text": "1. Spend", "is_ans": false}, {"text": "2. Tax", "is_ans": false}, {"text": "3. Income", "is_ans": false}, {"text": "4. Earn", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Income"}, {"is_ans": true, "type": "TEXT", "text": "1. Spend"}, {"is_ans": false, "type": "TEXT", "text": "4. Earn"}, {"is_ans": false, "type": "TEXT", "text": "2. 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"]}, {"q_num": 19, "page": 6, "text": "Select the option that represents the correct order of the given words as they would\nappear in an English dictionary.\n1. Editorial\n2. Education\n3. Edition\n4. Effective\n5. Effortless\n6. Ecosystem", "raw_options": [{"text": "1. 6, 1, 3, 2, 4, 5", "is_ans": false}, {"text": "2. 6, 3, 2, 1, 4, 5", "is_ans": false}, {"text": "3. 6, 3, 1, 2, 4, 5", "is_ans": false}, {"text": "4. 6, 3, 1, 2, 5, 4", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 6, 1, 3, 2, 4, 5"}, {"is_ans": false, "type": "TEXT", "text": "4. 6, 3, 1, 2, 5, 4"}, {"is_ans": false, "type": "TEXT", "text": "2. 6, 3, 2, 1, 4, 5"}, {"is_ans": false, "type": "TEXT", "text": "3. 6, 3, 1, 2, 4, 5"}], "imgs": []}, {"q_num": 20, "page": 7, "text": "‘A # B’ means ‘A is the brother of B’.\n‘A @ B’ means ‘A is the daughter of B’.\n‘A & B’ means ‘A is the husband of B’.\n‘A % B’ means ‘A is the wife of B’.\nIf V & S @ F % H # T @ Q, then how is V related to H?", "raw_options": [{"text": "1. Father", "is_ans": false}, {"text": "2. Daughter’s husband", "is_ans": false}, {"text": "3. Father’s father", "is_ans": false}, {"text": "4. Wife’s father", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Father’s father"}, {"is_ans": false, "type": "TEXT", "text": "2. Daughter’s husband"}, {"is_ans": true, "type": "TEXT", "text": "1. Father"}, {"is_ans": false, "type": "TEXT", "text": "4. Wife’s father"}], "imgs": []}, {"q_num": 21, "page": 7, "text": "Three statements are given, followed by three conclusions numbered I, II and III.\nAssuming the statements to be true, even if they seem to be at variance with\ncommonly known facts, decide which of the conclusions logically follow(s) from the\nstatements.\nStatement :\nAll Bananas are Grapes.\nAll Papayas are Pineapple.\nSome Pineapples are Banana.\nConclusions:\n(I) Some Papayas are Grapes.\n(II) Some Grapes are Pineapples.\n(III) Some Bananas are Papayas.", "raw_options": [{"text": "1. Only Conclusion II follows.", "is_ans": false}, {"text": "2. Both Conclusions I and II follow.", "is_ans": false}, {"text": "3. Only Conclusion I follows.", "is_ans": false}, {"text": "4. Both Conclusions I and III follow.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. Both Conclusions I and II follow."}, {"is_ans": true, "type": "TEXT", "text": "1. Only Conclusion II follows."}, {"is_ans": false, "type": "TEXT", "text": "3. Only Conclusion I follows."}, {"is_ans": false, "type": "TEXT", "text": "4. Both Conclusions I and III follow."}], "imgs": []}, {"q_num": 22, "page": 7, "text": "Select the option that is related to the fifth letter-cluster in the same way as the second\nletter-cluster is related to the first letter-cluster and the fourth letter-cluster is related\nto the third letter-cluster.\nCREATION : ETGCVKQP :: UNIVERSE : WPKXGTUG :: PLANET : ?", "raw_options": [{"text": "1. RNCPGV", "is_ans": false}, {"text": "2. RPCGVN", "is_ans": false}, {"text": "3. RCPNGV", "is_ans": false}, {"text": "4. RPGVNC", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. RPCGVN"}, {"is_ans": false, "type": "TEXT", "text": "4. RPGVNC"}, {"is_ans": false, "type": "TEXT", "text": "3. RCPNGV"}, {"is_ans": true, "type": "TEXT", "text": "1. RNCPGV"}], "imgs": []}, {"q_num": 23, "page": 7, "text": "In a certain code language, 'CHOICE' is written as '53', 'CHARGE' is written as '52', how\nwill 'CHANCE' be written in that language?", "raw_options": [{"text": "1. 50", "is_ans": false}, {"text": "2. 44", "is_ans": false}, {"text": "3. 54", "is_ans": false}, {"text": "4. 48", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. 54"}, {"is_ans": false, "type": "TEXT", "text": "2. 44"}, {"is_ans": false, "type": "TEXT", "text": "4. 48"}, {"is_ans": true, "type": "TEXT", "text": "1. 50"}], "imgs": []}, {"q_num": 24, "page": 8, "text": "Select the option that represents the letters that, when sequentially placed from left to\nright in the blanks below, will complete the letter series.\nNOI _ _ _ RCN _ _ _ AERCN_IT_ERC_OITA _ _ C", "raw_options": [{"text": "1. TEAIOTONERA", "is_ans": false}, {"text": "2. TOANERTAEOI", "is_ans": false}, {"text": "3. TONERATEAIO", "is_ans": false}, {"text": "4. TAEOITOANER", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. TONERATEAIO"}, {"is_ans": true, "type": "TEXT", "text": "1. TEAIOTONERA"}, {"is_ans": false, "type": "TEXT", "text": "2. TOANERTAEOI"}, {"is_ans": false, "type": "TEXT", "text": "4. TAEOITOANER"}], "imgs": []}, {"q_num": 25, "page": 8, "text": "", "raw_options": [{"type": "IMAGE", "data": {"xref": 404, "path": "/home/user/extracted_diagrams_shift3/xref_404.jpeg", "width": 183, "height": 168, "y0": 292.4460144042969}, "is_ans": false}, {"text": "1.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 405, "path": "/home/user/extracted_diagrams_shift3/xref_405.jpeg", "width": 185, "height": 167, "y0": 407.59246826171875}, "is_ans": false}, {"text": "2.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 406, "path": "/home/user/extracted_diagrams_shift3/xref_406.jpeg", "width": 185, "height": 162, "y0": 522.0789794921875}, "is_ans": false}, {"text": "3.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 407, "path": "/home/user/extracted_diagrams_shift3/xref_407.jpeg", "width": 185, "height": 167, "y0": 633.254150390625}, "is_ans": false}, {"text": "4.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "IMAGE_LABEL", "label": "1.", 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"}], 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"]}]}, {"name": "English Language", "questions": [{"q_num": 1, "page": 9, "text": "Select the most appropriate option to fill in the blank.\nEaster eggs used to be painted chicken eggs, but a modern________ is to substitute\nthem with chocolate eggs or plastic eggs filled with confectionery such as jelly beans.", "raw_options": [{"text": "1. legacy", "is_ans": false}, {"text": "2. ethic", "is_ans": false}, {"text": "3. lore", "is_ans": false}, {"text": "4. custom", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. lore"}, {"is_ans": true, "type": "TEXT", "text": "1. legacy"}, {"is_ans": false, "type": "TEXT", "text": "2. ethic"}, {"is_ans": false, "type": "TEXT", "text": "4. custom"}], "imgs": []}, {"q_num": 2, "page": 9, "text": "Select the option that expresses the given sentence in passive voice.\nRahim’s house is building rapidly.", "raw_options": [{"text": "1. Rahim’s house was built rapidly.", "is_ans": false}, {"text": "2. House of Rahim has been built rapidly.", "is_ans": false}, {"text": "3. House of Rahim is built rapidly.", "is_ans": false}, {"text": "4. Rahim’s house is being built rapidly.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. House of Rahim is built rapidly."}, {"is_ans": true, "type": "TEXT", "text": "1. Rahim’s house was built rapidly."}, {"is_ans": false, "type": "TEXT", "text": "2. House of Rahim has been built rapidly."}, {"is_ans": false, "type": "TEXT", "text": "4. Rahim’s house is being built rapidly."}], "imgs": []}, {"q_num": 3, "page": 9, "text": "Select the most appropriate synonym of the given word.\nDISMAL", "raw_options": [{"text": "1. gloomy", "is_ans": false}, {"text": "2. cheerful", "is_ans": false}, {"text": "3. encouraging", "is_ans": false}, {"text": "4. bright", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. cheerful"}, {"is_ans": true, "type": "TEXT", "text": "1. gloomy"}, {"is_ans": false, "type": "TEXT", "text": "4. bright"}, {"is_ans": false, "type": "TEXT", "text": "3. encouraging"}], "imgs": []}, {"q_num": 4, "page": 9, "text": "Select the most appropriate meaning of the underlined word.\nThe captain disdained the roaring impatience and mutinous disposition of his crews.", "raw_options": [{"text": "1. Treated with scorn", "is_ans": false}, {"text": "2. Called in question", "is_ans": false}, {"text": "3. Gave due importance to", "is_ans": false}, {"text": "4. Release from captivity", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Treated with scorn"}, {"is_ans": false, "type": "TEXT", "text": "3. Gave due importance to"}, {"is_ans": false, "type": "TEXT", "text": "4. Release from captivity"}, {"is_ans": false, "type": "TEXT", "text": "2. Called in question"}], "imgs": []}, {"q_num": 5, "page": 10, "text": "In the given sentence, a word is given in brackets. Select the most appropriate\nANTONYM of the word to fill in the blank.\nThe kids are feeling bored, but they are __________ (eager) to participate in the\nactivities", "raw_options": [{"text": "1. passive", "is_ans": false}, {"text": "2. reluctant", "is_ans": false}, {"text": "3. nervous", "is_ans": false}, {"text": "4. repulsive", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. passive"}, {"is_ans": false, "type": "TEXT", "text": "2. reluctant"}, {"is_ans": false, "type": "TEXT", "text": "4. repulsive"}, {"is_ans": false, "type": "TEXT", "text": "3. nervous"}], "imgs": []}, {"q_num": 6, "page": 10, "text": "Select the most appropriate option that can substitute the underlined segment in the\ngiven sentence.\nHobby is a work which a man undertakes when he is not working for pleasure.", "raw_options": [{"text": "1.  in his available time", "is_ans": false}, {"text": "2. in his scheduled time", "is_ans": false}, {"text": "3. in his spare time", "is_ans": false}, {"text": "4. in his daytime", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. in his scheduled time"}, {"is_ans": false, "type": "TEXT", "text": "3. in his spare time"}, {"is_ans": true, "type": "TEXT", "text": "1.  in his available time"}, {"is_ans": false, "type": "TEXT", "text": "4. in his daytime"}], "imgs": []}, {"q_num": 7, "page": 10, "text": "Select the sentence which does NOT have a spelling error.", "raw_options": [{"text": "1. There is a statutory warning on every packet of cigerettes.", "is_ans": false}, {"text": "2. There is a statutory warning on every packet of cigarettes.", "is_ans": false}, {"text": "3. There is a statuary warning on every packet of cigarettes.", "is_ans": false}, {"text": "4. There is a statutory warning on every packet of cigaretes.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. There is a statuary warning on every packet of cigarettes."}, {"is_ans": false, "type": "TEXT", "text": "4. There is a statutory warning on every packet of cigaretes."}, {"is_ans": true, "type": "TEXT", "text": "1. There is a statutory warning on every packet of cigerettes."}, {"is_ans": false, "type": "TEXT", "text": "2. There is a statutory warning on every packet of cigarettes."}], "imgs": []}, {"q_num": 8, "page": 10, "text": "Select the most appropriate option to fill in the blank.\nCountries like China and the United States invest ___________ in wind, hydro, solar\nand biofuels.", "raw_options": [{"text": "1. profoundly", "is_ans": false}, {"text": "2. achingly", "is_ans": false}, {"text": "3. absolutely", "is_ans": false}, {"text": "4. heavily", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. heavily"}, {"is_ans": true, "type": "TEXT", "text": "1. profoundly"}, {"is_ans": false, "type": "TEXT", "text": "2. achingly"}, {"is_ans": false, "type": "TEXT", "text": "3. absolutely"}], "imgs": []}, {"q_num": 9, "page": 10, "text": "Select the option that expresses the given sentence in direct speech.\nJaya asked if Riya was doing better than the previous day.", "raw_options": [{"text": "1. Jaya said to Riya, “Are you doing better than before?”", "is_ans": false}, {"text": "2. Jaya said to Riya, “How are you doing today?”", "is_ans": false}, {"text": "3. Jaya said to Riya, “Are you doing better than yesterday?”", "is_ans": false}, {"text": "4. Jaya said to Riya, “If you are doing better than yesterday?”", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Jaya said to Riya, “Are you doing better than before?”"}, {"is_ans": false, "type": "TEXT", "text": "2. Jaya said to Riya, “How are you doing today?”"}, {"is_ans": false, "type": "TEXT", "text": "4. Jaya said to Riya, “If you are doing better than yesterday?”"}, {"is_ans": false, "type": "TEXT", "text": "3. Jaya said to Riya, “Are you doing better than yesterday?”"}], "imgs": []}, {"q_num": 10, "page": 11, "text": "Select the most appropriate meaning of the given idiom.\nIt's a piece of cake", "raw_options": [{"text": "1. It’s tough", "is_ans": false}, {"text": "2. It’s easy", "is_ans": false}, {"text": "3. It’s tasty", "is_ans": false}, {"text": "4. It’s horrible", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. It’s easy"}, {"is_ans": false, "type": "TEXT", "text": "4. It’s horrible"}, {"is_ans": false, "type": "TEXT", "text": "3. It’s tasty"}, {"is_ans": true, "type": "TEXT", "text": "1. It’s tough"}], "imgs": []}, {"q_num": 11, "page": 11, "text": "Select the option that can be used as a one-word substitute for the given group of\nwords.\nAn arrangement of parts or elements in a particular form or figure", "raw_options": [{"text": "1. Amorphousness", "is_ans": false}, {"text": "2. Delineation", "is_ans": false}, {"text": "3. Configuration", "is_ans": false}, {"text": "4. Contortion", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Contortion"}, {"is_ans": true, "type": "TEXT", "text": "1. Amorphousness"}, {"is_ans": false, "type": "TEXT", "text": "3. Configuration"}, {"is_ans": false, "type": "TEXT", "text": "2. Delineation"}], "imgs": []}, {"q_num": 12, "page": 11, "text": "Parts of the given sentence have been given as options. One of them contains a\nspelling error. Select the option that rectifies the error.\nHeritage helps us understand our past, apreciate our present and shape our future.", "raw_options": [{"text": "1. present", "is_ans": false}, {"text": "2. appreciate", "is_ans": false}, {"text": "3. Heritage", "is_ans": false}, {"text": "4. understand", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Heritage"}, {"is_ans": false, "type": "TEXT", "text": "2. appreciate"}, {"is_ans": false, "type": "TEXT", "text": "4. understand"}, {"is_ans": true, "type": "TEXT", "text": "1. present"}], "imgs": []}, {"q_num": 13, "page": 11, "text": "Select the option that expresses the given sentence in direct speech.\nHarry asked me if I wanted to see magic.", "raw_options": [{"text": "1. Harry said to me, “Do you want to see magic?”", "is_ans": false}, {"text": "2. Harry said, “If you want to see magic?”", "is_ans": false}, {"text": "3. Harry said to me, “If you want to see magic?”", "is_ans": false}, {"text": "4. Harry said, “Do you want to see magic?”", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. Harry said, “If you want to see magic?”"}, {"is_ans": true, "type": "TEXT", "text": "1. Harry said to me, “Do you want to see magic?”"}, {"is_ans": false, "type": "TEXT", "text": "4. Harry said, “Do you want to see magic?”"}, {"is_ans": false, "type": "TEXT", "text": "3. Harry said to me, “If you want to see magic?”"}], "imgs": []}, {"q_num": 14, "page": 12, "text": "Select the option that expresses the given sentence in reported speech.\nNayan asked, “Can I call you back tomorrow?”", "raw_options": [{"text": "1. Nayan asked if he could call me back tomorrow.", "is_ans": false}, {"text": "2. Nayan asked if he could call me back the next day.", "is_ans": false}, {"text": "3. Nayan asked if he can call me back tomorrow.", "is_ans": false}, {"text": "4. Nayan asked if he should call me back tomorrow.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Nayan asked if he could call me back tomorrow."}, {"is_ans": false, "type": "TEXT", "text": "4. Nayan asked if he should call me back tomorrow."}, {"is_ans": false, "type": "TEXT", "text": "3. Nayan asked if he can call me back tomorrow."}, {"is_ans": false, "type": "TEXT", "text": "2. Nayan asked if he could call me back the next day."}], "imgs": []}, {"q_num": 15, "page": 12, "text": "Select the option that will improve the underlined part of the given sentence.\nThe walls of the temple caved out due to weak construction.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. apart", "is_ans": false}, {"text": "2. at", "is_ans": false}, {"text": "3. around", "is_ans": false}, {"text": "4. in", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. at"}, {"is_ans": false, "type": "TEXT", "text": "4. in"}, {"is_ans": true, "type": "TEXT", "text": "1. apart"}, {"is_ans": false, "type": "TEXT", "text": "3. around"}], "imgs": []}, {"q_num": 16, "page": 12, "text": "Select the most appropriate option to fill in blank no. 1.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. surface", "is_ans": false}, {"text": "2. boundary", "is_ans": false}, {"text": "3. location", "is_ans": false}, {"text": "4. atmosphere", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. atmosphere"}, {"is_ans": false, "type": "TEXT", "text": "2. boundary"}, {"is_ans": false, "type": "TEXT", "text": "3. location"}, {"is_ans": true, "type": "TEXT", "text": "1. surface"}], "imgs": []}, {"q_num": 17, "page": 13, "text": "Select the most appropriate option to fill in blank no. 2.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. components", "is_ans": false}, {"text": "2. solvent", "is_ans": false}, {"text": "3. pesticides", "is_ans": false}, {"text": "4. plants", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. plants"}, {"is_ans": true, "type": "TEXT", "text": "1. components"}, {"is_ans": false, "type": "TEXT", "text": "3. pesticides"}, {"is_ans": false, "type": "TEXT", "text": "2. solvent"}], "imgs": []}, {"q_num": 18, "page": 13, "text": "Select the most appropriate option to fill in blank no. 3.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. deformed", "is_ans": false}, {"text": "2. deoxidised", "is_ans": false}, {"text": "3. desterilised", "is_ans": false}, {"text": "4. decomposed", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. deoxidised"}, {"is_ans": false, "type": "TEXT", "text": "4. decomposed"}, {"is_ans": false, "type": "TEXT", "text": "3. desterilised"}, {"is_ans": true, "type": "TEXT", "text": "1. deformed"}], "imgs": []}, {"q_num": 19, "page": 13, "text": "Select the most appropriate option to fill in blank no. 4.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. compositions", "is_ans": false}, {"text": "2. fluctuations", "is_ans": false}, {"text": "3. interactions", "is_ans": false}, {"text": "4. connections", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. connections"}, {"is_ans": true, "type": "TEXT", "text": "1. compositions"}, {"is_ans": false, "type": "TEXT", "text": "2. fluctuations"}, {"is_ans": false, "type": "TEXT", "text": "3. interactions"}], "imgs": []}, {"q_num": 20, "page": 14, "text": "Select the most appropriate option to fill in blank no. 5.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. gradual", "is_ans": false}, {"text": "2. chemical", "is_ans": false}, {"text": "3. steep", "is_ans": false}, {"text": "4. abrupt", "is_ans": false}, {"text": "Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. steep"}, {"is_ans": false, "type": "TEXT", "text": "4. abrupt Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose."}, {"is_ans": true, "type": "TEXT", "text": "1. gradual"}, {"is_ans": false, "type": "TEXT", "text": "2. chemical"}], "imgs": []}, {"q_num": 21, "page": 14, "text": "Select the most appropriate title for the passage from the following options.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. Darcy and Bingley", "is_ans": false}, {"text": "2. Darcy and Friends", "is_ans": false}, {"text": "3. Bingley and Friends", "is_ans": false}, {"text": "4. The Town of Meryton", "is_ans": false}, {"text": "Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Bingley and Friends"}, {"is_ans": true, "type": "TEXT", "text": "1. Darcy and Bingley"}, {"is_ans": false, "type": "TEXT", "text": "2. Darcy and Friends"}, {"is_ans": false, "type": "TEXT", "text": "4. The Town of Meryton Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose."}], "imgs": []}, {"q_num": 22, "page": 15, "text": "Select the most appropriate meaning of ‘fastidious’ from the following options.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. Undemanding", "is_ans": false}, {"text": "2. Concerned about accuracy and detail", "is_ans": false}, {"text": "3. Queasy", "is_ans": false}, {"text": "4. Prissy", "is_ans": false}, {"text": "Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. Concerned about accuracy and detail"}, {"is_ans": true, "type": "TEXT", "text": "1. Undemanding"}, {"is_ans": false, "type": "TEXT", "text": "3. Queasy"}, {"is_ans": false, "type": "TEXT", "text": "4. Prissy Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose."}], "imgs": []}, {"q_num": 23, "page": 15, "text": "Who was understanding, clever, haughty and reserved?\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. Miss Bennett", "is_ans": false}, {"text": "2. Bingley", "is_ans": false}, {"text": "3. Mrs. Hurst", "is_ans": false}, {"text": "4. Darcy", "is_ans": false}, {"text": "Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Miss Bennett"}, {"is_ans": false, "type": "TEXT", "text": "3. Mrs. Hurst"}, {"is_ans": false, "type": "TEXT", "text": "2. Bingley"}, {"is_ans": false, "type": "TEXT", "text": "4. Darcy Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose."}], "imgs": []}, {"q_num": 24, "page": 16, "text": "Select the synonym of ‘dependence’ from the passage.\n\n[Comprehension Passage]\nComprehension:", "raw_options": [{"text": "1. Misgiving", "is_ans": false}, {"text": "2. Reliance", "is_ans": false}, {"text": "3. Relay", "is_ans": false}, {"text": "4. Skepticism", "is_ans": false}, {"text": "Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Misgiving"}, {"is_ans": false, "type": "TEXT", "text": "3. Relay"}, {"is_ans": false, "type": "TEXT", "text": "2. Reliance"}, {"is_ans": false, "type": "TEXT", "text": "4. Skepticism Between him and Darcy there was a very steady friendship, in spite of great opposition of\ncharacter. Bingley was endeared to Darcy by the easiness, openness, and ductility of his\ntemper, though no disposition could offer a greater contrast to his own, and though with his\nown he never appeared dissatisfied. On the strength of Darcy’s regard Bingley had the firmest\nreliance, and of his judgment the highest opinion. In understanding, Darcy was the superior.\nBingley was by no means deficient, but Darcy was clever. He was at the same time haughty,\nreserved, and fastidious, and his manners, though well bred, were not inviting. In that respect\nhis friend had greatly the advantage. Bingley was sure of being liked wherever he appeared,\nDarcy was continually giving offence.\nThe manner in which they spoke of the Meryton assembly was sufficiently characteristic.\nBingley had never met with pleasanter people or prettier girls in his life; everybody had been\nmost kind and attentive to him; there had been no formality, no stiffness; he had soon felt\nacquainted with all the room; and as to Miss Bennet, he could not conceive an angel more\nbeautiful. Darcy, on the contrary, had seen a collection of people in whom there was little\nbeauty and no fashion, for none of whom he had felt the smallest interest, and from none\nreceived either attention or pleasure. Miss Bennet he acknowledged to be pretty, but she\nsmiled too much.\nMrs. Hurst and her sister allowed it to be so—but still they admired her and liked her, and\npronounced her to be a sweet girl, and one whom they should not object to know more of.\nMiss Bennet was therefore established as a sweet girl, and their brother felt authorised by\nsuch commendation to think of her as he chose."}], "imgs": []}, {"q_num": 25, "page": 16, "text": "What is the central theme of the passage?", "raw_options": [{"text": "1. Darcy and his unlikeable qualities", "is_ans": false}, {"text": "2. The contrast between Bingley and Darcy", "is_ans": false}, {"text": "3. The similarities between Darcy and Bingley", "is_ans": false}, {"text": "4. Bingley and his attractive qualities", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Bingley and his attractive qualities"}, {"is_ans": false, "type": "TEXT", "text": "3. The similarities between Darcy and Bingley"}, {"is_ans": false, "type": "TEXT", "text": "2. The contrast between Bingley and Darcy"}, {"is_ans": true, "type": "TEXT", "text": "1. Darcy and his unlikeable qualities"}], "imgs": []}]}, {"name": "Quantitative Aptitude", "questions": [{"q_num": 1, "page": 17, "text": "Shalini spends 60% of her salary. If her salary is increased by 40% and her expenditure\nis also increased by 30%, find the percentage increment or decrement in her savings.", "raw_options": [{"text": "1. 55% increment", "is_ans": false}, {"text": "2. 45% decrement", "is_ans": false}, {"text": "3. 45% increment", "is_ans": false}, {"text": "4. 55% decrement", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 45% decrement"}, {"is_ans": false, "type": "TEXT", "text": "3. 45% increment"}, {"is_ans": true, "type": "TEXT", "text": "1. 55% increment"}, {"is_ans": false, "type": "TEXT", "text": "4. 55% decrement"}], "imgs": []}, {"q_num": 2, "page": 17, "text": "The current population of a village is 1000 and its population is increasing at the rate\nof 10% every year. What will be the population of the village after three years?", "raw_options": [{"text": "1. 1100", "is_ans": false}, {"text": "2. 1500", "is_ans": false}, {"text": "3. 1331", "is_ans": false}, {"text": "4. 1210", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 1100"}, {"is_ans": false, "type": "TEXT", "text": "4. 1210"}, {"is_ans": false, "type": "TEXT", "text": "3. 1331"}, {"is_ans": false, "type": "TEXT", "text": "2. 1500"}], "imgs": []}, {"q_num": 3, "page": 17, "text": "A police officer sees a thief from 200 metres. The thief flees, and the police officer\npursues him. The thief and the officer are both running at 10 km/h and 11 km/h,\nrespectively. At what distance will the officer apprehend the thief?", "raw_options": [{"text": "1. 2.2 km", "is_ans": false}, {"text": "2. 2.5 km", "is_ans": false}, {"text": "3. 2 km", "is_ans": false}, {"text": "4. 3 km", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. 3 km"}, {"is_ans": false, "type": "TEXT", "text": "3. 2 km"}, {"is_ans": true, "type": "TEXT", "text": "1. 2.2 km"}, {"is_ans": false, "type": "TEXT", "text": "2. 2.5 km"}], "imgs": []}, {"q_num": 4, "page": 17, "text": "A family saves 30% of the total income and the savings amount to ₹600 less than half\nof the expenditure. If the total expenditure is spent on health, food and education in\nthe ratio of 3 : 5 : 6, then what amount of expenditure is spent on education?", "raw_options": [{"text": "1. ₹3,600", "is_ans": false}, {"text": "2. ₹1,800", "is_ans": false}, {"text": "3. ₹8,400", "is_ans": false}, {"text": "4. ₹7,200", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. ₹7,200"}, {"is_ans": false, "type": "TEXT", "text": "2. ₹1,800"}, {"is_ans": true, "type": "TEXT", "text": "1. ₹3,600"}, {"is_ans": false, "type": "TEXT", "text": "3. ₹8,400"}], "imgs": []}, {"q_num": 5, "page": 17, "text": "[(sin θ tan  θ + cos  θ )2 - 1 ] is equal to:", "raw_options": [{"text": "1. tan2  θ", "is_ans": false}, {"text": "2. cosec  θ", "is_ans": false}, {"text": "3. sec2 θ", "is_ans": false}, {"text": "4. sec θ", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. sec2 θ"}, {"is_ans": false, "type": "TEXT", "text": "4. sec θ"}, {"is_ans": true, "type": "TEXT", "text": "1. tan2  θ"}, {"is_ans": false, "type": "TEXT", "text": "2. cosec  θ"}], "imgs": []}, {"q_num": 6, "page": 18, "text": "Determine the largest angle if the angles of a triangle are in the ratio 3 : 4 : 5.", "raw_options": [{"text": "1. 70°", "is_ans": false}, {"text": "2. 75°", "is_ans": false}, {"text": "3. 85°", "is_ans": false}, {"text": "4. 65°", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. 65°"}, {"is_ans": false, "type": "TEXT", "text": "3. 85°"}, {"is_ans": true, "type": "TEXT", "text": "1. 70°"}, {"is_ans": false, "type": "TEXT", "text": "2. 75°"}], "imgs": []}, {"q_num": 7, "page": 18, "text": "A dishonest shopkeeper claims to sell his articles at the cost price but uses 950 gm\nweight instead of one kilogram weight. What is his profit (rounded off to 1 decimal\nplace) percentage?", "raw_options": [{"text": "1. 4.5 Percent", "is_ans": false}, {"text": "2. 7.8 Percent", "is_ans": false}, {"text": "3. 11.1 Percent", "is_ans": false}, {"text": "4. 5.3 Percent", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 4.5 Percent"}, {"is_ans": false, "type": "TEXT", "text": "3. 11.1 Percent"}, {"is_ans": false, "type": "TEXT", "text": "2. 7.8 Percent"}, {"is_ans": false, "type": "TEXT", "text": "4. 5.3 Percent"}], "imgs": []}, {"q_num": 8, "page": 18, "text": "", "raw_options": [{"text": "1.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 287, "path": "/home/user/extracted_diagrams_shift3/xref_287.jpeg", "width": 251, "height": 27, "y0": 382.44512939453125}, "is_ans": false}, {"type": "IMAGE", "data": {"xref": 288, "path": "/home/user/extracted_diagrams_shift3/xref_288.jpeg", "width": 251, "height": 27, "y0": 404.2827453613281}, "is_ans": false}, {"text": "2.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 290, "path": "/home/user/extracted_diagrams_shift3/xref_290.jpeg", "width": 138, "height": 28, "y0": 426.1209716796875}, "is_ans": false}, {"text": "3.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 291, "path": "/home/user/extracted_diagrams_shift3/xref_291.jpeg", "width": 138, "height": 28, "y0": 448.6209716796875}, "is_ans": false}, {"text": "4.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "IMAGE_LABEL", "label": "2.", "data": {"xref": 288, "path": "/home/user/extracted_diagrams_shift3/xref_288.jpeg", "width": 251, "height": 27, "y0": 404.2827453613281}, "img": 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d5BqTs43A2el3N0PxMUbAH2NSpXKK1r4y028u4oIrXWleVgqmbQr2NAT6s8IAHuSBV2uSyDxt4rtvCmgrdSXFtDcXEotrQ3cwiiMrdC7EgBQAWPsOOSKyn/Ej8y0cR8MNa8P2fjXxPpdlr9rqM99eQGCVJ1la8YWwaWX5eOock9AePQV0NWpxfqZyZkNbrqX7OGvazMvl6lPd3WpPOB84nium2kHqCBGFHoK55aU4vt+rNkv30l/Wx6D4q8R6roPhq1163itRZwmCS/jlR5JDEzqH2bSMFVYnJ3ZxjFbTVqqj2uc1J3pNlm/vfFn/AAj15f6eumxXLIZra2uYJCYVCkhJMON7MQo42hcn7+OcqslBN9jZatIrWPibVtZuvCc2jpaCx1aza9v0ljZnij8tCNjBgAd7hcEHPJ7GrSs5R7fqSndI3dV8Q2ejTRx3kGpOzjcDZ6Xc3Q/ExRsAfY1KlcpnKfD3xpBe6BbQXn9t3F1LdXCiabSrxkx9okCgymLaABgcnjGDjFaJEM6/VtF0/XLeK31S2W6hinSdUcnG9DuUnHXBHQ8Vm1t5FX38zk/D9tHq3xN1bxjYssekixXTY5RwL2SOQl5h6qv3A3fBxxgmov8AElrbyOG17xpoGveJ/DmvyeIdNEMGuLHbW5vo829sscu6aRc5UyPjr0URjgk1NJNuHzLq/wAGXy/M9Fm8Vagvizw+IvsU3h/Xg6W0qq4mDCHzUckkDDAONu3IwDk5wL6E/ZYlrq3i6+0PVp7OPS5LldUa20+RonSIW6yhGllBfLYxJ90jO0Y61CZbQvgrWPEeu3V7d6hc6dcaIp8uyurWwkt2u2B+aQBppP3fYH+LkjAALaGbNO88YadY3slrPa6y7xHazQaHezIfoyQlSPcE1mncss6Z4jstZmeC0g1ON1XcTd6Vc2y49mljUE+wOauxLKmu2y2l2mv2Wgzaxq1vE1tCsEqRuEYgkZkdVAyoyeT6VF2m0uu446rXpseZLdDS/wBnjxXeaVNIt5NPdNdW4QxGwmklAeEDqNgbr368ZpzSUeVfD3Hh7zqc0l73Y6PxFp8Gh+M/h3JpcSwLFLNp2yMbcwGAnacdgUBx61T1lZ9TGL/2Zy9PzLXibXfGNhrElrpB0lZbmcQ6VZzWkk8lwoRTJNI6zKI41LEE7SeB1JAM07ySb3e5tNWpN9v8y/4l8R654XudHuLqO0vNPuLlLK4S2gk8+SZ0bayfPhQZAq7Tu+9ksMUxHSaYuqfZM609q1wzFttrGyqi9lySSxH975c/3RQBj+KNUvdO1jw1FZzhIr7U/s1wpQHenkyv1PTlB0qY6yivUbXuTfoZtvqmox+MY7bVdWubB5bqRYLKW1j+y3MIDbfLmCZ83GCVL5+VsLjmnD4Iv1FOylO3kaXjHXrrR7fTYNOtrm4utSvPssYtfL8xR5byEr5rKmcRnG4456HoRbpDkvdb7HO2niTxVptu9jrVrPBLe6nBZaXd6h9mMxSRCztIluxTK7JMYwD8vHWmtUiJbv5FbxDqniPR7rxJpsHiS6k+w6F/adrcyW1v5qyhpPlbEe0r8gH3QcE855rNy5Yzl2t+Jvy3nTj/ADX/AAsbMeraoPGfheM6nK9pqelzyXNqYoghkjWMhwdu4E+YcjOOBwK3krSnH+Wxz0nzRUu5kaZ4n1iLxf4fgk1STUrbWJbmK4Mdui2cbpG8g+zvtV2+7gklweec1C1p3NKis5vtY6HwIf8ATPFX/Ycl/wDRUVZUXfD0Zd0//SmRLSrL5fkYct1c6T8SvFeqzatfy2em6XbXLWQEJSRcXB2/c3ADbkYIJJ5JGBWlR8tFVO9/zNox5qlKl3uSPruvabpvhzxHNqn2+11e4tYbuw8mMRQi4wFaBgA3ysy/fLZGelatWqqn3v8Agjlpyc6Tqdv8zuNPtr63nvWv7/7Wk05kt0MIT7PHgAR5H3uQTk881mbGhQByug+C/wCwNe1HVU8Qatey6m4e6iuvI8tnUBVYBIlIIUAcHHqDQBnT/DOC60/XrGXxHrRh16XzL0f6MCx2hTt/ccAqFH4euchTZcvfh/aXl9Z6h/bGsWuoW8CW015aXCxSXka9FmCrtPU8gAjPBFBmzoZtLtLjRZNLlizZyQG3aPceUIwRnr0oZRgWvgS3trvTLz+19WlutLtZbS3nkkiJ8p9vBATBxsXBxk4+bdQgMLVPCS+G/ClppEN54kv7FtSa6lvLVka6syS0m5ViQFwZDyNr/ePHTCluDL+h+Hv7Ssb201DVNe1nRr62aKWHXohCxJP8I8qN14znI7rjoactgRo6d4D0+y0e70y+v9U1eC6ge2J1G6MrRwsMGNSAMD368DngUAPsfCEVisTSarqN5NawtDYy3DRFrMFduYwIwpbHG5wx7ZwTkAqWnw6srTwfN4ck1bVbq2a4+0xTzPF50EnmeaChWMDiT5uQfTpxREESz+BbeS61W6TWNUiutWtIrS5nR4iSI92GAMZUEh2B4xzwAeazmrmlyEfDuyGnaPbprGqxXmjRGC01KKSNbgRHA8psR7GXAA5XsD15rZsysdRZ2kdnapbwlmRP4pGLM56kknqSec0gsc7pvgHTtK1ua+sb3U4rWWc3B0v7STaLMW3GQR4yDnnGduecdKRVxmpfD+DVfD1xpV9rmrSeffi++2BoBcRuCCoVhFgAEDHGQOM44oC5zWl6ZeX3xS8QR/b/ABLZIbO1txf/AGHykvTF5glzI0Hl5+YYKbc5O04qUgOo/wCEEs4dc0fUbDUtQso9GhNtbWUBi8jyzjeG3Rljnaufm/h4wa0TJYt14C0658ST6xBe6nZtd4+22tpdFILwgAAyJjrgAZBGR1zWaGTXvhGO/vppLjVdRNlPMk0umh4/s7Mm3H8G8DKg4DAHv1q0wGjwdH/aa3V1q2pXkEd015FY3DxmGKUkkEEIHwCTgFiB6Vn8LUktY3t89GElzJrv+hStPh1Yrp+r2OpajqWqQ6tcrdym6eMNFMMYkjMaKVPyp7DaMd8qMFBKKWkdvnuKT5m33/Quv4MWazukuda1Se+ubY2n9oyGHz4oSclEAj8sZ7nbk8c8DGgyjD8Oo4f+EfA8Ta266B8tmrNbHPylPn/c/N8h2/TnrzQBs+KtIvde8N3em2GorpslyAjTmEy/Jn5lwGU/MMjIIIzxzUooraLouuWWpQSalq9hJY2ts1vDY6bprWkYyVwTmZ87QmAABjca0M2ZNz4D1jUtIk0HV/FLXuhyzF5I5LT/AEuSPfv8ppy5BXt9wHHGazhoaS1NXxN4T/4Suyu9M1W6X+yprcxpbxwfMspBAkZiSG28FRgYIyc8YJoIuxpaFY3+n6VDBq+o/wBpXSBQ06weSDgAcLknnGTknknoMAaydzGEbGp0qC2zI8T6J/wknhi/0cXH2b7ZEYvO2b9nvjIz+dAzXAwAPSgDnPGnh/UPFHhq60ax1C2sI72F4LiSa0ac7GXHy4kTB9zn6VnJe8XF6ET+FrjVPA1z4c8T3sN7HPb/AGYy2dsbchMAA4Z3+YEZznHtV1tY6GdF8srlSDwZqlzq2kXXiTXo9Si0ZjLaQw2fkGSTbsEkzF23EAn7oQZOcdqu4lGxVvLSx8eeI9H1TRb4T6dZRXEV5LGmVnSUKDBk98x/MOoHHBIouaKVjvQAowOBUki0AYviHQ/7dtbKIXHkfZb6C8yE3bvKkD7eoxnGM9qUNAZtdqJCRja3p2o6nbra2Oqf2dBIGW4eKDdOVOP9W5O2M9eSrdeMYzSsORj674MlvvCVl4d8O3tto+mwbY5YHtWmWeFf+WR2yIQp/i5yeRnk5LBHQ0vDukanprXUmr6pFevMyCGK1tTbQWsSLgIkZkfHOSTnnIHQCtGwN+s2AVQBQAnapkBy/h7wzfaN4p1/VbnU4LqLWJkmEEdm0RhKIIwNxkbd8qjPA5546U4gY83w1ke1vtGXWiPDV9em7l0422ZgS/mNEs2/AiL8kbCcEjNKCFI2vE/hP/hK7K80zVbpP7LmtykdvHBhlkIIEjMSQ23gqMDBGTnjBNXNIOwkOox+GNPs7DxRrSX1/cIVh2W3lm52IAVSMFiWPXGSSScccDR6mEI2IvAHheXwv4Zt7W8l866SMRFv+eUasSkQ9lDHnuST0xSRpJnW0gMbwxoZ8O6EmnG4+0BJppfM2bf9ZK0mMZPTdj8KAI/FWkXuveG7vTbDUV02S5ARpzCZfkz8y4DKfmGRkEEZ45qUUVtF0XXLLUoJNS1ewksbW2a3hsdN01rSMZK4JzM+doTAAAxuNaGbIvFfhi98Q32izWmowWiaVfC8KyWhlMrBSoGRIuBhm7Ht6cxB2qxqev4qwp60Z0u9vzuZ/iBbfxpe6fZaDqWLrSNVEtzPCu77LsDK6nPAYhsAe+cEClC6cKnqaSd1On3t/maHirwtd614et9F0bUYNLskZVnhe0eVZ4V/5YnbIhCnHODkjjoTlT1ldiLnh7SNT003Umr6pFevMyCGK1tTbQW0aLgIkZkfHOSTnnIHQCtKmsQN+kAUAc7q+ja3ca1b6loWvLYFIGgltLq2NxbygnIfYJEIceuenFTBBIpWXgCwh8JaxomoTy3p1yWafULnAQySy/eKDnaBgYHOMDrRNDi7DNK8F30Wr6Vf+ItbXVX0aF4rAJa+RgsApkk+dt8m0YyNo5PHNXJ3IgrFIeB/Ep1bUb1vFFmsmozJ51xHpci3CW6kEQRSfaMRrjIyFzli3XmiLsVIv+J/Btx4qt5VvNUWGSGVJtLkituLORHVxIQW+d8rjIK/KSABkkzDQDpLGC6hs40vrsXNwMmSRYhGrEnPC5OAOgyScdSTzRIDI8Q+FV8RX+mXbavqFk2mT/aIY7Qw7WkwVy2+NieGYYyByaSKYxfB8f8Aai3V1q+p3kEd0b2KxuHjMMUpJIIIjEmAScAsQPStEZsu+JPDVh4p0n+z9R85FEizRTW8pjlglX7siMOjCpKM2fwFpt34bbSNTvNRvHaRJv7Rnuc3SypykiyAAIV7YAHXjk5AObtdLif4lajpd9FrN/aXGiR2M19e2kuydt0hcecECfdYdMDPTnNS17k13sDfvUWunMdFp/gi0tLvSbm41LU72bSoZYIGuZwcxyAAqwVQDgKOevqTxVVG5Sm+9iaWkLEdn8PNOsl0VV1LU5F0OZ3sUeZcRIyFPK4UZUKcAn5/9qh6lF7wz4WHhqbUXTVtR1A6jc/aZRemHCyEYZl2RrjIA45HAxjmhATt4Ztf+Eln1oT3AlurZLa5tsqYZ1QsVLAjORvYcEA55BoGUtL8DWOmG2iS8vp7Cxl82x0+d1MNqwzjbhQxAycB2YDjGMDASza07TRYTXri7u7j7XOZ9txNvEOQBtj/ALq8Zx6k0DL9ABQAUAFABSQBQwEpPcEHaqewMWgAoAKACkwCgBM0wFoEFACCgYpoEwoGFADG5ou1clboRe9O+oR2RJSKCgAoAKACgAoAQ0AL2oEwoGFABSAKYCCgBaBBQMKAE7UCQdqAYtAwoAKQBQAUwCgAoAKAChCA0AIaBi9qBMKBhQAUAFAEYqF8BP2wAwOKF8Af8vCSrKCgAoAKAChCChgJQMWgTCgYUAFABQAUAFACEDND2F2FxSGgoQBQwCmJCGgYtAH/2Q=="]}, {"q_num": 9, "page": 18, "text": "", "raw_options": [{"text": "1. 69", "is_ans": false}, {"text": "2. 59", "is_ans": false}, {"text": "3. 70", "is_ans": false}, {"text": "4. 79", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 59"}, {"is_ans": false, "type": "TEXT", "text": "4. 79"}, {"is_ans": true, "type": "TEXT", "text": "1. 69"}, {"is_ans": false, "type": "TEXT", "text": "3. 70"}], "imgs": 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"]}, {"q_num": 10, "page": 18, "text": "A sold an article to B at 25% profit. B sold it to C at a loss of 12%. If C paid Rs.1,650,\nthen how much did A pay for it?", "raw_options": [{"text": "1. Rs.1,480", "is_ans": false}, {"text": "2. Rs.1,500", "is_ans": false}, {"text": "3. Rs.1,100", "is_ans": false}, {"text": "4. Rs.1,990", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Rs.1,100"}, {"is_ans": true, "type": "TEXT", "text": "1. Rs.1,480"}, {"is_ans": false, "type": "TEXT", "text": "2. Rs.1,500"}, {"is_ans": false, "type": "TEXT", "text": "4. Rs.1,990"}], "imgs": []}, {"q_num": 11, "page": 19, "text": "", "raw_options": [{"text": "1. 30.12%", "is_ans": false}, {"text": "2. 28.57%", "is_ans": false}, {"text": "3. 29.57%", "is_ans": false}, {"text": "4. 27.37%", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. 29.57%"}, {"is_ans": true, "type": "TEXT", "text": "1. 30.12%"}, {"is_ans": false, "type": "TEXT", "text": "4. 27.37%"}, {"is_ans": false, "type": "TEXT", "text": "2. 28.57%"}], "imgs": 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"]}, {"q_num": 13, "page": 19, "text": "In a company, the average salary of all the employees is ₹20,000. The average salary of\ngroup-A employees is ₹32,000 while the average salary of group-B employees is\n₹18,000. What is the number of employees in group-A if there are 72 employees in\ngroup-B?", "raw_options": [{"text": "1. 9", "is_ans": false}, {"text": "2. 12", "is_ans": false}, {"text": "3. 6", "is_ans": false}, {"text": "4. 8", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. 6"}, {"is_ans": false, "type": "TEXT", "text": "2. 12"}, {"is_ans": true, "type": "TEXT", "text": "1. 9"}, {"is_ans": false, "type": "TEXT", "text": "4. 8"}], "imgs": []}, {"q_num": 14, "page": 19, "text": "Which of the following is a pair of co-primes?", "raw_options": [{"text": "1. (25, 31)", "is_ans": false}, {"text": "2. (32, 62)", "is_ans": false}, {"text": "3. (31, 93)", "is_ans": false}, {"text": "4. (14, 35)", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. (32, 62)"}, {"is_ans": true, "type": "TEXT", "text": "1. (25, 31)"}, {"is_ans": false, "type": "TEXT", "text": "4. (14, 35)"}, {"is_ans": false, "type": "TEXT", "text": "3. (31, 93)"}], "imgs": []}, {"q_num": 15, "page": 20, "text": "Which of the following numbers is NOT divisible by 9?", "raw_options": [{"text": "1. 43516", "is_ans": false}, {"text": "2. 51543", "is_ans": false}, {"text": "3. 34155", "is_ans": false}, {"text": "4. 54315", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 43516"}, {"is_ans": false, "type": "TEXT", "text": "2. 51543"}, {"is_ans": false, "type": "TEXT", "text": "3. 34155"}, {"is_ans": false, "type": "TEXT", "text": "4. 54315"}], "imgs": []}, {"q_num": 16, "page": 20, "text": "", "raw_options": [{"type": "IMAGE", "data": {"xref": 307, "path": "/home/user/extracted_diagrams_shift3/xref_307.png", "width": 39, "height": 46, "y0": 233.5492401123047}, "is_ans": false}, {"text": "1.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 308, "path": "/home/user/extracted_diagrams_shift3/xref_308.png", "width": 39, "height": 46, "y0": 267.9580993652344}, "is_ans": false}, {"text": "2.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 310, "path": "/home/user/extracted_diagrams_shift3/xref_310.png", "width": 39, "height": 46, "y0": 302.3692321777344}, "is_ans": false}, {"text": "3.", "is_ans": false}, {"type": "IMAGE", "data": {"xref": 311, "path": "/home/user/extracted_diagrams_shift3/xref_311.png", "width": 39, "height": 46, "y0": 336.78289794921875}, "is_ans": false}, {"text": "4.", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "IMAGE_LABEL", "label": "3.", "data": {"xref": 310, "path": "/home/user/extracted_diagrams_shift3/xref_310.png", "width": 39, "height": 46, "y0": 302.3692321777344}, "img": 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"]}, {"q_num": 17, "page": 20, "text": "", "raw_options": [{"text": "1. 10 units", "is_ans": false}, {"text": "2. 2.5 units", "is_ans": false}, {"text": "3. 7.5 units", "is_ans": false}, {"text": "4. 5 units", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 10 units"}, {"is_ans": false, "type": "TEXT", "text": "2. 2.5 units"}, {"is_ans": false, "type": "TEXT", "text": "3. 7.5 units"}, {"is_ans": false, "type": "TEXT", "text": "4. 5 units"}], "imgs": 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"]}, {"q_num": 18, "page": 20, "text": "", "raw_options": [{"text": "1. −1", "is_ans": false}, {"text": "2. 1", "is_ans": false}, {"text": "3.  0", "is_ans": false}, {"text": "4.  2", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 1"}, {"is_ans": false, "type": "TEXT", "text": "3.  0"}, {"is_ans": false, "type": "TEXT", "text": "4.  2"}, {"is_ans": true, "type": "TEXT", "text": "1. −1"}], "imgs": 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"]}, {"q_num": 20, "page": 21, "text": "", "raw_options": [{"text": "1. 1,00,000 tonnes", "is_ans": false}, {"text": "2. 15,00,000 tonnes", "is_ans": false}, {"text": "3. 10,00,000 tonnes", "is_ans": false}, {"text": "4. 10,000 tonnes", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. 10,000 tonnes"}, {"is_ans": false, "type": "TEXT", "text": "2. 15,00,000 tonnes"}, {"is_ans": true, "type": "TEXT", "text": "1. 1,00,000 tonnes"}, {"is_ans": false, "type": "TEXT", "text": "3. 10,00,000 tonnes"}], "imgs": 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"]}, {"q_num": 21, "page": 21, "text": "Anil works 3 times faster than Sandeep. If Sandeep can complete a work\nindependently in 12 days, the number of days in which Anil and Sandeep can together\nfinish the work is:", "raw_options": [{"text": "1. 4", "is_ans": false}, {"text": "2. 2", "is_ans": false}, {"text": "3. 3", "is_ans": false}, {"text": "4. 5", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. 3"}, {"is_ans": true, "type": "TEXT", "text": "1. 4"}, {"is_ans": false, "type": "TEXT", "text": "2. 2"}, {"is_ans": false, "type": "TEXT", "text": "4. 5"}], "imgs": []}, {"q_num": 22, "page": 21, "text": "Mohan got a 20% discount on the marked price when he bought a bag. He sold it for\n40% more than what he paid for it. The profit percentage on the marked price is:", "raw_options": [{"text": "1. 11%", "is_ans": false}, {"text": "2. 15%", "is_ans": false}, {"text": "3. 8%", "is_ans": false}, {"text": "4. 12%", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 15%"}, {"is_ans": false, "type": "TEXT", "text": "3. 8%"}, {"is_ans": false, "type": "TEXT", "text": "4. 12%"}, {"is_ans": true, "type": "TEXT", "text": "1. 11%"}], "imgs": []}, {"q_num": 23, "page": 22, "text": "In a hotel, ration is available for 148 persons for 51 days. If 37 persons left the hotel,\nthen for how many days will the remaining ration last?", "raw_options": [{"text": "1.  69", "is_ans": false}, {"text": "2.  68", "is_ans": false}, {"text": "3.  65", "is_ans": false}, {"text": "4.  67", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2.  68"}, {"is_ans": false, "type": "TEXT", "text": "4.  67"}, {"is_ans": false, "type": "TEXT", "text": "3.  65"}, {"is_ans": true, "type": "TEXT", "text": "1.  69"}], "imgs": []}, {"q_num": 24, "page": 22, "text": "The average weight of 12 persons is increased by 3.5 kg when one of them whose\nweight is 56 kg is replaced by a new man. The weight of the new man is:", "raw_options": [{"text": "1. 90 kg", "is_ans": false}, {"text": "2. 95 kg", "is_ans": false}, {"text": "3. 98 kg", "is_ans": false}, {"text": "4. 100 kg", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. 100 kg"}, {"is_ans": true, "type": "TEXT", "text": "1. 90 kg"}, {"is_ans": false, "type": "TEXT", "text": "2. 95 kg"}, {"is_ans": false, "type": "TEXT", "text": "3. 98 kg"}], "imgs": []}, {"q_num": 25, "page": 22, "text": "", "raw_options": [{"text": "1. 55 marks", "is_ans": false}, {"text": "2. 50 marks", "is_ans": false}, {"text": "3. 60 marks", "is_ans": false}, {"text": "4. 65 marks", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. 55 marks"}, {"is_ans": false, "type": "TEXT", "text": "4. 65 marks"}, {"is_ans": false, "type": "TEXT", "text": "3. 60 marks"}, {"is_ans": false, "type": "TEXT", "text": "2. 50 marks"}], "imgs": 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"]}]}, {"name": "General Awareness", "questions": [{"q_num": 1, "page": 22, "text": "In which year was Soil Health Card launched in India to enable the farmers to apply\nappropriate recommended dosages of nutrients for crop production and improving\nsoil health and its fertility?", "raw_options": [{"text": "1. 2017", "is_ans": false}, {"text": "2. 2019", "is_ans": false}, {"text": "3. 2013", "is_ans": false}, {"text": "4. 2015", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 2019"}, {"is_ans": false, "type": "TEXT", "text": "4. 2015"}, {"is_ans": false, "type": "TEXT", "text": "3. 2013"}, {"is_ans": true, "type": "TEXT", "text": "1. 2017"}], "imgs": []}, {"q_num": 2, "page": 23, "text": "How many members of the State Legislative Council are nominated by the Governor?", "raw_options": [{"text": "1. One-third", "is_ans": false}, {"text": "2. One-fourth", "is_ans": false}, {"text": "3. One-sixth", "is_ans": false}, {"text": "4. One-fifth", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. One-fourth"}, {"is_ans": false, "type": "TEXT", "text": "4. One-fifth"}, {"is_ans": true, "type": "TEXT", "text": "1. One-third"}, {"is_ans": false, "type": "TEXT", "text": "3. One-sixth"}], "imgs": []}, {"q_num": 3, "page": 23, "text": "Who among the following has become IAF’s first woman fighter pilot from J&K?", "raw_options": [{"text": "1. Garima Lahiri", "is_ans": false}, {"text": "2. Apurva Lahiri", "is_ans": false}, {"text": "3. Arundhati Ramsingh", "is_ans": false}, {"text": "4. Mawya Sudan", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Arundhati Ramsingh"}, {"is_ans": true, "type": "TEXT", "text": "1. Garima Lahiri"}, {"is_ans": false, "type": "TEXT", "text": "4. Mawya Sudan"}, {"is_ans": false, "type": "TEXT", "text": "2. Apurva Lahiri"}], "imgs": []}, {"q_num": 4, "page": 23, "text": "Which is NOT a Fundamental Duty?", "raw_options": [{"text": "1. To protect public property", "is_ans": false}, {"text": "2. To respect National Flag and National Anthem", "is_ans": false}, {"text": "3. To preserve India’s rich heritage and composite culture", "is_ans": false}, {"text": "4. To respect the elders", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. To protect public property"}, {"is_ans": false, "type": "TEXT", "text": "4. To respect the elders"}, {"is_ans": false, "type": "TEXT", "text": "3. To preserve India’s rich heritage and composite culture"}, {"is_ans": false, "type": "TEXT", "text": "2. To respect National Flag and National Anthem"}], "imgs": []}, {"q_num": 5, "page": 23, "text": "Which of the following states has a higher potential for solar energy?", "raw_options": [{"text": "1. Odisha", "is_ans": false}, {"text": "2. Rajasthan", "is_ans": false}, {"text": "3. Tamil Nadu", "is_ans": false}, {"text": "4. Kerala", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Tamil Nadu"}, {"is_ans": true, "type": "TEXT", "text": "1. Odisha"}, {"is_ans": false, "type": "TEXT", "text": "2. Rajasthan"}, {"is_ans": false, "type": "TEXT", "text": "4. Kerala"}], "imgs": []}, {"q_num": 6, "page": 23, "text": "Which of the following chemical compounds is a naturally occurring orange/yellow\npigment extracted from turmeric, which is used as a spice, in food colouring and as a\ntraditional herbal medicine?", "raw_options": [{"text": "1. Carmoisine", "is_ans": false}, {"text": "2. Tartrazine", "is_ans": false}, {"text": "3. Curcumin", "is_ans": false}, {"text": "4. Cochineal", "is_ans": false}, {"text": "Telegram (Previous year papers PDFs [SSC,Railway,DSSSB,UP SI]): \nhttps://t.me/RBE_S", "is_ans": false}, {"text": "YouTube (Free lectures and job updates): https://www.youtube.com/c/RBERevolutionByEducation", "is_ans": false}, {"text": "Shubham Sir Maths", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Cochineal Telegram (Previous year papers PDFs [SSC,Railway,DSSSB,UP SI]): \nhttps://t.me/RBE_S YouTube (Free lectures and job updates): https://www.youtube.com/c/RBERevolutionByEducation Shubham Sir Maths"}, {"is_ans": false, "type": "TEXT", "text": "2. Tartrazine"}, {"is_ans": false, "type": "TEXT", "text": "3. Curcumin"}, {"is_ans": true, "type": "TEXT", "text": "1. Carmoisine"}], "imgs": []}, {"q_num": 7, "page": 24, "text": "According to Census 2011 of India, which of the following group of states have the\nhighest female literacy rates?", "raw_options": [{"text": "1. Rajasthan and Bihar", "is_ans": false}, {"text": "2. Kerala and Mizoram", "is_ans": false}, {"text": "3. Kerala and Tamil Nadu", "is_ans": false}, {"text": "4. Sikkim and Nagaland", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Rajasthan and Bihar"}, {"is_ans": false, "type": "TEXT", "text": "2. Kerala and Mizoram"}, {"is_ans": false, "type": "TEXT", "text": "4. Sikkim and Nagaland"}, {"is_ans": false, "type": "TEXT", "text": "3. Kerala and Tamil Nadu"}], "imgs": []}, {"q_num": 8, "page": 24, "text": "Who appoints the Attorney General of India?", "raw_options": [{"text": "1. Chief Justice of Supreme Court", "is_ans": false}, {"text": "2. Prime Minister", "is_ans": false}, {"text": "3. President", "is_ans": false}, {"text": "4. Minister of Law and Justice", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Minister of Law and Justice"}, {"is_ans": false, "type": "TEXT", "text": "3. President"}, {"is_ans": false, "type": "TEXT", "text": "2. Prime Minister"}, {"is_ans": true, "type": "TEXT", "text": "1. Chief Justice of Supreme Court"}], "imgs": []}, {"q_num": 9, "page": 24, "text": "In which of the following dances from Assam do the movements by the dancers\nresemble butterflies and birds?", "raw_options": [{"text": "1. Bihu", "is_ans": false}, {"text": "2. Deodhani", "is_ans": false}, {"text": "3. Jhumar", "is_ans": false}, {"text": "4. Bagurumba", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Bagurumba"}, {"is_ans": true, "type": "TEXT", "text": "1. Bihu"}, {"is_ans": false, "type": "TEXT", "text": "2. Deodhani"}, {"is_ans": false, "type": "TEXT", "text": "3. Jhumar"}], "imgs": []}, {"q_num": 10, "page": 24, "text": "Who among the following has completed his term as the Chair of Governing Body of\nInternational Labour Organization in 2021?", "raw_options": [{"text": "1. Amitav Ghosh", "is_ans": false}, {"text": "2. Apurva Chandra", "is_ans": false}, {"text": "3. HPS Ahluwalia", "is_ans": false}, {"text": "4. Vikram Rana", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. HPS Ahluwalia"}, {"is_ans": false, "type": "TEXT", "text": "2. Apurva Chandra"}, {"is_ans": false, "type": "TEXT", "text": "4. Vikram Rana"}, {"is_ans": true, "type": "TEXT", "text": "1. Amitav Ghosh"}], "imgs": []}, {"q_num": 11, "page": 24, "text": "In _________, BR Ambedkar negotiated the Poona Pact with Mahatma Gandhi.", "raw_options": [{"text": "1. 1932", "is_ans": false}, {"text": "2. 1930", "is_ans": false}, {"text": "3. 1933", "is_ans": false}, {"text": "4. 1931", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 1930"}, {"is_ans": false, "type": "TEXT", "text": "3. 1933"}, {"is_ans": false, "type": "TEXT", "text": "4. 1931"}, {"is_ans": true, "type": "TEXT", "text": "1. 1932"}], "imgs": []}, {"q_num": 12, "page": 25, "text": "In 1662, who described the equation P1V1 = P2V2, where P1 and V1 are the initial\npressure and volume values, and P2 and V2 are the pressure and volume values of the\ngas after the transformation?", "raw_options": [{"text": "1. Robert Boyle", "is_ans": false}, {"text": "2. Amedeo Avogadro", "is_ans": false}, {"text": "3. Joseph Gay Lussac", "is_ans": false}, {"text": "4. John Dalton", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Robert Boyle"}, {"is_ans": false, "type": "TEXT", "text": "3. Joseph Gay Lussac"}, {"is_ans": false, "type": "TEXT", "text": "2. Amedeo Avogadro"}, {"is_ans": false, "type": "TEXT", "text": "4. John Dalton"}], "imgs": []}, {"q_num": 13, "page": 25, "text": "General Election to the Legislative Assembly of which of the following States did not\ntake place in February-March 2022?", "raw_options": [{"text": "1. Punjab", "is_ans": false}, {"text": "2. Manipur", "is_ans": false}, {"text": "3. Uttar Pradesh", "is_ans": false}, {"text": "4. Rajasthan", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Uttar Pradesh"}, {"is_ans": true, "type": "TEXT", "text": "1. Punjab"}, {"is_ans": false, "type": "TEXT", "text": "4. Rajasthan"}, {"is_ans": false, "type": "TEXT", "text": "2. Manipur"}], "imgs": []}, {"q_num": 14, "page": 25, "text": "Mouma Das, who received Padma Shri Award in 2021, is a player of which of the\nfollowing sports?", "raw_options": [{"text": "1. Table Tennis", "is_ans": false}, {"text": "2. Cricket", "is_ans": false}, {"text": "3. Badminton", "is_ans": false}, {"text": "4. Golf", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Badminton"}, {"is_ans": false, "type": "TEXT", "text": "4. Golf"}, {"is_ans": true, "type": "TEXT", "text": "1. Table Tennis"}, {"is_ans": false, "type": "TEXT", "text": "2. Cricket"}], "imgs": []}, {"q_num": 15, "page": 25, "text": "Which of the following was known as the forerunner of the Brahmo Samaj?", "raw_options": [{"text": "1. Prarthana Sabha", "is_ans": false}, {"text": "2. Atmiya Sabha", "is_ans": false}, {"text": "3. Paramhansa Sabha", "is_ans": false}, {"text": "4. Hindu Sabha", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Hindu Sabha"}, {"is_ans": false, "type": "TEXT", "text": "3. Paramhansa Sabha"}, {"is_ans": false, "type": "TEXT", "text": "2. Atmiya Sabha"}, {"is_ans": true, "type": "TEXT", "text": "1. Prarthana Sabha"}], "imgs": []}, {"q_num": 16, "page": 25, "text": "In which year was the first reliable measurement on the properties of gases made by\nAnglo-Irish scientist Robert Boyle?", "raw_options": [{"text": "1. 1661", "is_ans": false}, {"text": "2. 1663", "is_ans": false}, {"text": "3. 1662", "is_ans": false}, {"text": "4. 1664", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "2. 1663"}, {"is_ans": true, "type": "TEXT", "text": "1. 1661"}, {"is_ans": false, "type": "TEXT", "text": "4. 1664"}, {"is_ans": false, "type": "TEXT", "text": "3. 1662"}], "imgs": []}, {"q_num": 17, "page": 26, "text": "Where was Babur buried for the first time in 1530?", "raw_options": [{"text": "1. Kabul", "is_ans": false}, {"text": "2. Agra", "is_ans": false}, {"text": "3. Delhi", "is_ans": false}, {"text": "4. Fargana", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Delhi"}, {"is_ans": true, "type": "TEXT", "text": "1. Kabul"}, {"is_ans": false, "type": "TEXT", "text": "2. Agra"}, {"is_ans": false, "type": "TEXT", "text": "4. Fargana"}], "imgs": []}, {"q_num": 18, "page": 26, "text": "Who achieved fame for the Pandanallur school of Bharatanatyam?", "raw_options": [{"text": "1. Anita Ratnam", "is_ans": false}, {"text": "2. Padma Subramanyam", "is_ans": false}, {"text": "3. Mallika Sarabhai", "is_ans": false}, {"text": "4. Meenakshi Pillai", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Meenakshi Pillai"}, {"is_ans": false, "type": "TEXT", "text": "3. Mallika Sarabhai"}, {"is_ans": false, "type": "TEXT", "text": "2. Padma Subramanyam"}, {"is_ans": true, "type": "TEXT", "text": "1. Anita Ratnam"}], "imgs": []}, {"q_num": 19, "page": 26, "text": "What is a ‘Gopura’ in South Indian temple architecture of the medieval period?", "raw_options": [{"text": "1. A sanctum sanctorum", "is_ans": false}, {"text": "2. An entrance gateway", "is_ans": false}, {"text": "3. A parapet wall", "is_ans": false}, {"text": "4. A pillar-like structure", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. A parapet wall"}, {"is_ans": false, "type": "TEXT", "text": "2. An entrance gateway"}, {"is_ans": false, "type": "TEXT", "text": "4. A pillar-like structure"}, {"is_ans": true, "type": "TEXT", "text": "1. A sanctum sanctorum"}], "imgs": []}, {"q_num": 20, "page": 26, "text": "‘Courage and Commitment: An Autobiography’ is written by which Indian Politician?", "raw_options": [{"text": "1. Margaret Alva", "is_ans": false}, {"text": "2. Rahul Gandhi", "is_ans": false}, {"text": "3. LK Advani", "is_ans": false}, {"text": "4. Shashi Tharoor", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "4. Shashi Tharoor"}, {"is_ans": false, "type": "TEXT", "text": "3. LK Advani"}, {"is_ans": false, "type": "TEXT", "text": "2. Rahul Gandhi"}, {"is_ans": true, "type": "TEXT", "text": "1. Margaret Alva"}], "imgs": []}, {"q_num": 21, "page": 26, "text": "The Koraput Revolution occurred in _________ during the Quit India Movement.", "raw_options": [{"text": "1. Orissa", "is_ans": false}, {"text": "2. the United Provinces", "is_ans": false}, {"text": "3. Bihar", "is_ans": false}, {"text": "4. Bengal", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Bihar"}, {"is_ans": true, "type": "TEXT", "text": "1. Orissa"}, {"is_ans": false, "type": "TEXT", "text": "2. the United Provinces"}, {"is_ans": false, "type": "TEXT", "text": "4. Bengal"}], "imgs": []}, {"q_num": 22, "page": 27, "text": "Which biome is found in the northern parts of Asia, Europe and North America where\n300 to 900 millimetres (12 to 35 in) of rain can be expected per year?", "raw_options": [{"text": "1. Taiga forests", "is_ans": false}, {"text": "2. Temperate deciduous forests", "is_ans": false}, {"text": "3. Coniferous forest", "is_ans": false}, {"text": "4. Mediterranean forests", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. Coniferous forest"}, {"is_ans": false, "type": "TEXT", "text": "4. Mediterranean forests"}, {"is_ans": false, "type": "TEXT", "text": "2. Temperate deciduous forests"}, {"is_ans": true, "type": "TEXT", "text": "1. Taiga forests"}], "imgs": []}, {"q_num": 23, "page": 27, "text": "When was the Ayushman Bharat Digital Mission launched?", "raw_options": [{"text": "1. 27 September 2021", "is_ans": false}, {"text": "2. 2 October 2021", "is_ans": false}, {"text": "3. 27 January 2020", "is_ans": false}, {"text": "4. 17 February 2021", "is_ans": false}], "ans_found": true, "options": [{"is_ans": false, "type": "TEXT", "text": "3. 27 January 2020"}, {"is_ans": false, "type": "TEXT", "text": "4. 17 February 2021"}, {"is_ans": false, "type": "TEXT", "text": "2. 2 October 2021"}, {"is_ans": true, "type": "TEXT", "text": "1. 27 September 2021"}], "imgs": []}, {"q_num": 24, "page": 27, "text": "Which of the following is the largest city of Myanmar?", "raw_options": [{"text": "1. Naypyidaw", "is_ans": false}, {"text": "2. Mandalay", "is_ans": false}, {"text": "3. Pathein", "is_ans": false}, {"text": "4. Yangon", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Naypyidaw"}, {"is_ans": false, "type": "TEXT", "text": "2. Mandalay"}, {"is_ans": false, "type": "TEXT", "text": "3. Pathein"}, {"is_ans": false, "type": "TEXT", "text": "4. Yangon"}], "imgs": []}, {"q_num": 25, "page": 27, "text": "Which nation-wide campaign was initiated by the Government of India on Gandhi\nJayanti, 2014?", "raw_options": [{"text": "1. Swachh Bharat Abhiyan", "is_ans": false}, {"text": "2.  Mahatma Gandhi Pravasi Suraksha Yojana", "is_ans": false}, {"text": "3. Mahatma Gandhi Bunkar Bima Yojana", "is_ans": false}, {"text": "4. Gandhi Shilp Bazar", "is_ans": false}], "ans_found": true, "options": [{"is_ans": true, "type": "TEXT", "text": "1. Swachh Bharat Abhiyan"}, {"is_ans": false, "type": "TEXT", "text": "2.  Mahatma Gandhi Pravasi Suraksha Yojana"}, {"is_ans": false, "type": "TEXT", "text": "4. Gandhi Shilp Bazar"}, {"is_ans": false, "type": "TEXT", "text": "3. Mahatma Gandhi Bunkar Bima Yojana"}], "imgs": []}]}]
}