{"id":38838,"date":"2019-12-05T15:58:16","date_gmt":"2019-12-05T10:28:16","guid":{"rendered":"https:\/\/cracku.in\/blog\/?p=38838"},"modified":"2019-12-05T16:08:09","modified_gmt":"2019-12-05T10:38:09","slug":"syllogism-questions-for-ibps-so-set-2-pdf","status":"publish","type":"post","link":"https:\/\/cracku.in\/blog\/syllogism-questions-for-ibps-so-set-2-pdf\/","title":{"rendered":"Syllogism Questions for IBPS-SO Set-2 PDF"},"content":{"rendered":"<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"p-rich_text_block\" dir=\"auto\">\n<h1 class=\"p-rich_text_section\"><span style=\"text-decoration: underline;\"><strong><span style=\"font-family: 'times new roman', times, serif;\">Syllogism Questions for IBPS-SO Set-2 PDF<\/span><\/strong><\/span><\/h1>\n<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"p-rich_text_block\" dir=\"auto\">\n<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"p-rich_text_block\" dir=\"auto\">\n<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"p-rich_text_block\" dir=\"auto\">\n<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"p-rich_text_block\" dir=\"auto\">\n<div class=\"c-message__content c-message__content--feature_sonic_inputs\" data-qa=\"message_content\">\n<div class=\"c-message__message_blocks c-message__message_blocks--rich_text\">\n<div class=\"p-block_kit_renderer p-block_kit_renderer--absorb_margin\" data-qa=\"block-kit-renderer\">\n<div class=\"p-block_kit_renderer__block_wrapper p-block_kit_renderer__block_wrapper--first\">\n<div class=\"p-rich_text_block\" dir=\"auto\">\n<p>Download important Syllogism PDF based on previously asked questions in IBPS-SO and other Banking Exams. Practice Syllogism for IBPS-SO Exam.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/downloads\/7662\" target=\"_blank\" class=\"btn btn-danger  download\">Download Syllogism Questions\u00a0 Set-2 PDF<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/pay\/71pFg\" target=\"_blank\" class=\"btn btn-primary red\">5 IBPS SO Mocks For Rs. 117<\/a><\/p>\n<p><b>Instructions<\/b><\/p>\n<p>In each of the following questions below are given three statements followed by three conclusions numbered I, II, III. You have to take the given statements to be true even if they seem to be at variance from commonly known facts. Read all the conclusions and then decide which of the given conclusion logically follows from the given statements disregarding commonly known facts<\/p>\n<p><b>Question 1:\u00a0<\/b>Statements:<br \/>\nSome flowers are bins.<br \/>\nSome bins are handles<br \/>\nAll handles are sticks<br \/>\nConclusion:<br \/>\nI: Some sticks are bins.<br \/>\nII: Some handles are flowers.<br \/>\nIII: Some sticks are flowers.<\/p>\n<p>a)\u00a0Only II follows<\/p>\n<p>b)\u00a0Only III follows<\/p>\n<p>c)\u00a0Only I and II follows<\/p>\n<p>d)\u00a0Only I and III follows<\/p>\n<p>e)\u00a0None of these<\/p>\n<p><b>Question 2:\u00a0<\/b>Statements:<br \/>\nSome towers are windows.<br \/>\nAll windows are houses.<br \/>\nSome houses are temples.<br \/>\nConclusions:<br \/>\nI: Some towers are temples.<br \/>\nII: some houses are towers.<br \/>\nIII: Some temples are windows.<\/p>\n<p>a)\u00a0Only I follows<\/p>\n<p>b)\u00a0Only II follows<\/p>\n<p>c)\u00a0Only III follows<\/p>\n<p>d)\u00a0Only I and II follows<\/p>\n<p>e)\u00a0None of these<\/p>\n<p><b>Question 3:\u00a0<\/b>Statements:<br \/>\nSome walls are doors.<br \/>\nSome doors are cots.<br \/>\nSome cots are chairs.<br \/>\nConclusions:<br \/>\nI: Some chairs are doors.<br \/>\nII: Some cots are walls.<br \/>\nIII: No chair is door<\/p>\n<p>a)\u00a0Only II follows<\/p>\n<p>b)\u00a0Only III follows<\/p>\n<p>c)\u00a0Only either I or III follows<\/p>\n<p>d)\u00a0Only I follows<\/p>\n<p>e)\u00a0None of these<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ibps-so-prelims-mock-test\" target=\"_blank\" class=\"btn btn-info \">Take IBPS SO Mock Test<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/banking-study-material\" target=\"_blank\" class=\"btn btn-primary \">Free Banking Study Material &#8211; 15000 Solved Questions<\/a><\/p>\n<p><b>Question 4:\u00a0<\/b>Statements:<br \/>\nAll trees are garden.<br \/>\nAll gardens are stones.<br \/>\nAll stones are fences.<br \/>\nConclusion:<br \/>\nI: Some fences are gardens.<br \/>\nII: All gardens are fences.<br \/>\nIII: Some stones are trees.<\/p>\n<p>a)\u00a0Only I and II follows<\/p>\n<p>b)\u00a0Only I and III follows<\/p>\n<p>c)\u00a0Only II and III follows<\/p>\n<p>d)\u00a0All follows<\/p>\n<p>e)\u00a0None of these<\/p>\n<p><b>Question 5:\u00a0<\/b>Statements:<br \/>\nAll books are leaves.<br \/>\nSome leaves are jungles<br \/>\nNo jungles is box<br \/>\nConclusions:<br \/>\nI: Some jungles are books.<br \/>\nII: No book is box.<br \/>\nIII: Some leaves are boxes<\/p>\n<p>a)\u00a0None follows<\/p>\n<p>b)\u00a0Only I follows<\/p>\n<p>c)\u00a0Only II follows<\/p>\n<p>d)\u00a0Only III follows<\/p>\n<p>e)\u00a0Only I and II follows<\/p>\n<p><b>Instructions<\/b><\/p>\n<p>In each question below are given two\/three statements followed by two conclusion numbered I and II.You have to take the given statements to be true even if they seem to be at variance with commonly known fact.Read all the conclusions and then decide which of the given conclusion logically follows from the given statement disregarding commonly know facts.Give answer.<\/p>\n<p><b>Question 6:\u00a0<\/b>Statements: All rings are circles.<br \/>\nAll square are are rings.<br \/>\nNo ellipse is a circle.<br \/>\nConclusions:I. Some rings being ellipses is a possibility.<br \/>\nII. At least some circles are squares.<\/p>\n<p>a)\u00a0if only conclusion I follows.<\/p>\n<p>b)\u00a0if only conclusion II follows.<\/p>\n<p>c)\u00a0if either conclusion I or conclusion II follows.<\/p>\n<p>d)\u00a0if neither conclusion I nor conclusion II follows.<\/p>\n<p>e)\u00a0if both conclusion I and conclusion II follows.<\/p>\n<p><b>Question 7:\u00a0<\/b>Statements: No house is an apartment.<br \/>\nSome bungalows are apartments.<br \/>\nConclusions:I.No house is a bungalow.<br \/>\nII.All bungalows are houses.<\/p>\n<p>a)\u00a0if only conclusion I follows.<\/p>\n<p>b)\u00a0if only conclusion II follows.<\/p>\n<p>c)\u00a0if either conclusion I or conclusion II follows.<\/p>\n<p>d)\u00a0if neither conclusion I nor conclusion II follows.<\/p>\n<p>e)\u00a0if both conclusion I and conclusion II follows.<\/p>\n<p><b>Question 8:\u00a0<\/b>Statements:Some gases are liquids<br \/>\nAll liquids are water.<br \/>\nConclusions:I.All gases being water is a possibility.<br \/>\nII.All such gases which are not water can never be liquids.<\/p>\n<p>a)\u00a0if only conclusion I follows.<\/p>\n<p>b)\u00a0if only conclusion II follows.<\/p>\n<p>c)\u00a0if either conclusion I or conclusion II follows.<\/p>\n<p>d)\u00a0if neither conclusion I nor conclusion II follows.<\/p>\n<p>e)\u00a0if both conclusion I and conclusion II follows.<\/p>\n<p><b>Question 9:\u00a0<\/b>Statements :<br \/>\nAll seconds are hours.<br \/>\nNo second is a day<br \/>\nConclusions :<br \/>\nI. No day is an hour.<br \/>\nII. At least some hours are seconds<\/p>\n<p>a)\u00a0if only conclusion I follows.<\/p>\n<p>b)\u00a0if only conclusion II follows.<\/p>\n<p>c)\u00a0if either conclusion I or conclusion II follows.<\/p>\n<p>d)\u00a0if neither conclusion I nor conclusion II follows.<\/p>\n<p>e)\u00a0if both conclusion I and conclusion II follows.<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/pass\" target=\"_blank\" class=\"btn btn-danger \">Get 790+ Mocks For Rs,100<\/a><\/p>\n<p><b>Question 10:\u00a0<\/b>Statements:Some teachers are professors.<br \/>\nSome lecturers are teachers.<br \/>\nConclusions:I.All teachers as well as professors being lectures is a possibility.<br \/>\nII.All those teachers who are lectures are also professors.<\/p>\n<p>a)\u00a0if only conclusion I follows.<\/p>\n<p>b)\u00a0if only conclusion II follows.<\/p>\n<p>c)\u00a0if either conclusion I or conclusion II follows.<\/p>\n<p>d)\u00a0if neither conclusion I nor conclusion II follows.<\/p>\n<p>e)\u00a0if both conclusion I and conclusion II follows.<\/p>\n<p><b>Question 11:\u00a0<\/b>Statements:Some teacher are professors.<br \/>\nSome lecturers are teachers.<br \/>\nConclusions:I.No professor is a lecture.<br \/>\nII.All lectures being professors is a possibility.<\/p>\n<p>a)\u00a0if only conclusion I follows.<\/p>\n<p>b)\u00a0if only conclusion II follows.<\/p>\n<p>c)\u00a0if either conclusion I or conclusion II follows.<\/p>\n<p>d)\u00a0if neither conclusion I nor conclusion II follows.<\/p>\n<p>e)\u00a0if both conclusion I and conclusion II follows.<\/p>\n<p><b>Instructions<\/b><\/p>\n<p>In each question below are two statements followed by two conclusions numbered I and II. You have to take the two given statements to be true even if they seem to be at variance from commonly known facts and then decide which of the given conclusions logically follows from the given statements disregarding commonly known facts.<br \/>\nGive answer<\/p>\n<p><b>Question 12:\u00a0<\/b>\u2018\u2019Statements\u2019\u2019 some trees are bushes. All flowers are bushes.<br \/>\nConclusions: I. Atleast some bushes are trees.<br \/>\nII. Atleast some flowers are tress.<\/p>\n<p>a)\u00a0only Conclusion I follows<\/p>\n<p>b)\u00a0\u00a0only Conclusion II follows<\/p>\n<p>c)\u00a0either Conclusion I or II follows<\/p>\n<p>d)\u00a0neither Conclusion I nor II follows<\/p>\n<p>e)\u00a0\u00a0both Conclusions I and II follow<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/previous-banking-papers\" target=\"_blank\" class=\"btn btn-danger \">200+ Banking Previous Papers (Download PDF)<\/a><\/p>\n<p><b>Question 13:\u00a0<\/b>\u2018\u2019Statements\u2019\u2019 All colours are paints. No paint is a brush.<br \/>\nConclusions: I. Atleast some brushes are colours.<br \/>\nII. No brush is a colour<\/p>\n<p>a)\u00a0\u00a0only Conclusion I follows<\/p>\n<p>b)\u00a0\u00a0only Conclusion II follows<\/p>\n<p>c)\u00a0\u00a0either Conclusion I or II follows<\/p>\n<p>d)\u00a0neither Conclusion I nor II follows<\/p>\n<p>e)\u00a0\u00a0both Conclusions I and II follow<\/p>\n<p><b>Question 14:\u00a0<\/b>\u2018\u2019Statements\u2019\u2019 Some chemicals are organics. All organics are fertilizers.<br \/>\nConclusions: I. Atleast some fertilizers are chemicals.<br \/>\nII. All fertilizers are organics.<\/p>\n<p>a)\u00a0only Conclusion I follows<\/p>\n<p>b)\u00a0only Conclusion II follows<\/p>\n<p>c)\u00a0\u00a0either Conclusion I or II follows<\/p>\n<p>d)\u00a0neither Conclusion I nor II follows<\/p>\n<p>e)\u00a0\u00a0both Conclusions I and II follow<\/p>\n<p><b>Question 15:\u00a0<\/b>\u2018\u2019Statements\u2019\u2019 No air is solid. Some solids are liquids.<br \/>\nConclusions: I. No liquid is air<br \/>\nII. Some airs are definitely not liquids.<\/p>\n<p>a)\u00a0\u00a0only Conclusion I follows<\/p>\n<p>b)\u00a0only Conclusion II follows<\/p>\n<p>c)\u00a0\u00a0either Conclusion I or II follows<\/p>\n<p>d)\u00a0neither Conclusion I nor II follows<\/p>\n<p>e)\u00a0both Conclusions I and II follow<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/banking-study-material\" target=\"_blank\" class=\"btn btn-danger \">Free Banking Study Material (15000 Solved Questions)<\/a><\/p>\n<p><span style=\"text-decoration: underline;\"><strong>Answers &amp; Solutions:<\/strong><\/span><\/p>\n<p><strong>1)\u00a0Answer\u00a0(E)<\/strong><\/p>\n<p>The syllogism can\u00a0 be better explained with the help of a Venn diagram.<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" src=\"data:image\/png;base64,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\" alt=\"\" \/><\/p>\n<p>Some sticks are bins. This conclusion is true<br \/>\nSome handles are flowers. This conclusion, apparent from Venn diagram, does not follow.<br \/>\nSome sticks are flowers. The sets of sticks and flowers are disjoint as apparent from Venn diagram. Hence, this conclusion does not follow.<\/p>\n<p><strong>2)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>The syllogism can be explained with following Venn Diagram.<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" 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\" alt=\"\" \/><\/p>\n<p>Some towers are temples. This conclusion cannot be made.<br \/>\nSome houses are towers. This conclusion is true.<br \/>\nSome temples are windows. This conclusion again cannot be made with surety.<\/p>\n<p>Only II follows.<\/p>\n<p><strong>3)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>The syllogisms can be intrepreted as:<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" 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\" alt=\"\" \/><\/p>\n<p>Some chairs are doors. We cannot make this conclusion.<br \/>\nSome cots are walls. We also cannot makes this conclusion as both them are disjoint sets.<br \/>\nNo chair is door. This conclusion is true and follows.<\/p>\n<p><strong>4)\u00a0Answer\u00a0(D)<\/strong><\/p>\n<p>The given information can be intrepreted in Venn diagram form as:<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" 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\" alt=\"\" \/><\/p>\n<p>Here, if we assume &#8211; trees, gardens, stones and fences as sets then<br \/>\nTree is subset of gardens. Gardens is subset of stones. Stones is subset of fences.<br \/>\nTherefore, all the conclusions are true.<br \/>\nOption D is correct answer.<\/p>\n<p><strong>5)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>The syllogism can be intrepreted in Venn Diagram form as:<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" 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\" alt=\"\" \/><\/p>\n<p>Some jungles are books. This can&#8217;t be said with surety.<br \/>\nNo book is box. This also cannot be concluded with any assurance.<br \/>\nSome leaves are boxes. The defibnite position of box set with respect to other sets is not known.<br \/>\nHence, none of the conclusion follow.<\/p>\n<p><strong>6)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>ll rings are circles. Some circles are rings.<br \/>\nAll square are are rings. Hence, some squares must be circles. Since no circle is an ellipse, no ring can be ellipse.<br \/>\nThis can be seen from the following venn diagram.<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" src=\"https:\/\/cracku.in\/media\/uploads\/text4146_tWReZnp.png\" \/><\/p>\n<p>Only statement II follows.<\/p>\n<p><strong>7)\u00a0Answer\u00a0(D)<\/strong><\/p>\n<p>No house is an apartment.<br \/>\nSome bungalows are apartments. We cannot establish a relationship between bungalows.<br \/>\nNeither of I and II follow.<\/p>\n<p>Therefore, option D is correct.<\/p>\n<p><strong>8)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Some gases are liquids. All liquids might be gases.<br \/>\nAll liquids are water. Hence, all liquids might be water.<br \/>\nTherefore, only statement I follows.<br \/>\nOption A is correct answer.<br \/>\n<strong>9)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>The venn diagram for above statements is\u00a0:<\/p>\n<figure><img decoding=\"async\" class=\"img-responsive\" src=\"https:\/\/cracku.in\/media\/uploads\/25467_C4wBM9a.PNG\" data-image=\"25467.PNG\" \/><\/figure>\n<p>Conclusions :<\/p>\n<p>I. No day is an hour = false<br \/>\nII. At least some hours are seconds = true<\/p>\n<p>Thus, only conclusion II follows.<\/p>\n<p>=&gt; Ans &#8211; (B)<\/p>\n<p><strong>10)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Some teachers are professors. All professors might be teachers.<br \/>\nSome lecturers are teachers. All teachers might be lecturers. Hence, all professors might be\u00a0 lecturers.<br \/>\nTherefore only statement I follows.<br \/>\nOption A is correct.<\/p>\n<p><strong>11)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>Some teachers are professors. All professors might be teachers.<br \/>\nSome lecturers are teachers. All teachers might be lecturers. All lecturers might professors.<br \/>\nTherefore only statement II follows.<br \/>\nOption A is correct.<\/p>\n<p><strong>12)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>The data can be intrepreted in Venn diagram form as:<br \/>\n<img decoding=\"async\" class=\"img-responsive\" src=\"data:image\/png;base64,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\" alt=\"\" \/><br \/>\nConclusions: I. Atleast some bushes are trees. This is a true conclusion as apparent from Venn diagram.<br \/>\nII. Atleast some flowers are tress. This cannot be conluded with surety.<br \/>\nOnly I follows.<br \/>\n<strong>13)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>The data can be intrepreted in Venn diagram form as:<br \/>\n<img decoding=\"async\" class=\"img-responsive\" src=\"data:image\/png;base64,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\" alt=\"\" \/><\/p>\n<p>Conclusions: I. Atleast some brushes are colours.<br \/>\nII. No brush is a colour. This statement is true.<\/p>\n<p><strong>14)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>The data can be intrepreted in Venn diagram form as:<\/p>\n<p><img decoding=\"async\" class=\"img-responsive\" src=\"data:image\/png;base64,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\" alt=\"\" \/><\/p>\n<p>Conclusions: I. Atleast some fertilizers are chemicals. This is a true conclusion as apparent from Venn diagram.<br \/>\nII. All fertilizers are organics.This\u00a0 is incorrect conclusion.<br \/>\nOnly I follows.<br \/>\n<strong>15)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>The given data can be intrepreted in Venn diagram form as:<br \/>\n<img decoding=\"async\" class=\"img-responsive\" src=\"data:image\/png;base64,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\" alt=\"\" \/><\/p>\n<p>Conclusions: I. No liquid is air.<br \/>\nII. Some airs are definitely not liquids. Statements I and II form universal set and one of them is true.<br \/>\nEither I or II is true.<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/play.google.com\/store\/apps\/details?id=in.cracku.app&amp;hl=en_IN\" target=\"_blank\" class=\"btn btn-info \">Download High Rated Free Preparation App<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/banking-online-test\" target=\"_blank\" class=\"btn btn-danger \">Daily Free Banking Online Test<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"<p>Syllogism Questions for IBPS-SO Set-2 PDF Download important Syllogism PDF based on previously asked questions in IBPS-SO and other Banking Exams. Practice Syllogism for IBPS-SO Exam. Instructions In each of the following questions below are given three statements followed by three conclusions numbered I, II, III. You have to take the given statements to be 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