Dear Readers,
Mahendras has started special quizzes for IBPS PO & Clerk Exam so that you can practice more and more to crack the examination. This IBPS PO & Clerk Exam special quiz series will mold your preparations in the right direction and the regular practice of these quizzes will be really very helpful in scoring good marks in the Examination. Here we are providing you the important question of reasoning ability for the IBPS PO & Clerk Exam Exam.
(1) Ankita has some money, she spends 37.5% of her money on rent, 40% of remaining on food and remaining is divided among her two son Ashu and Aman in ratio 12 : 13. If difference of Ashu and Aman is Rs. 60. Find the amount Ankita hand.
अंकिता के पास कुछ धन था। उसने 37.5% किराये पर तथा शेष का 40% खाने पर खर्च किया और शेष अपने दो पुत्रों आसु तथा अमन में 12 : 13 के अनुपात में बांट दिये। यदि आसु तथा अमन को मिले धन में 60 रूपये का अन्तर है तो अंकिता के पास कुल कितना धन था?
(1) 4000 Rs
(2) 3750 Rs
(3) 4250 Rs
(4) 4800 Rs
(5) 6000 Rs
(2) 7 years ago ratio of age of Mohan and Shyam was 7 : 4 and 4 years ago ratio of Mohan and Shyam was 5 : 3. Find the sum of their present ages.
7 वर्ष पूर्व मोहन तथा श्याम की आयु का अनुपात 7: 4 था तथा 4 वर्ष पूर्व मोहन ओर श्याम का अनुपात 5: 3 थां उनकी वर्तमान आयु का योग ज्ञात कीजिये।
(1) 76 years
(2) 80 years
(3) 72 years
(4) 84 years
(5) 90 years
(3) A and B started a partnership by investing in ratio 5 : 8. Investment time of A was 1.5 years, find the investment time of B if total profit was distributed among them in ratio 3 : 5.
A तथा B ने 5 : 8 के अनुपात में निवेश के साथ व्यापार प्रारम्भ किया। ।यदि A का निवेश समय 1.5 वर्ष था तो B का निवेश समय ज्ञात कीजिये यदि कुल लाभ 3: 8 के अनुपात में बाँटा गया ।
(1) 18 months
(2) 20 months
(3) 24 months
(4) 30 months
(5) 12 months
(4) Find the total number of words formed by letters of the word 'RUSSIA'.
'RUSSIA'शब्द के अक्षरों से बनने वाले कुल शब्दों की संख्या ज्ञात कीजिये ।
(1) 288
(2) 180
(3) 360
(4) 720
(5) None of these
Q-(5-8) Read the given information carefully to answer the questions asked-
Following table chart shows the number of managers and workers who join and leave the company each years.
दिए गए प्रश्नों का उत्तर देने के लिए दी गयी जानकारी को ध्यानपूर्वक पढ़ें -
निम्नलिखित टेबल चार्ट प्रतिवर्ष कंपनी में शामिल होने वाले तथा छोड़ने वाले मैनेजरों तथा श्रमिकों की संख्या दर्शाता है-
(5) In which years total number of employees in company was minimum if company started in 2010?
किस वर्ष कुल कर्मचारियों की संख्या न्यूनतम है यदि कंपनी 2010 में प्रारम्भ हुई?
(1) 2010
(2) 2012
(3) 2013
(4) 2014
(5) None of these
(6) Find the year in which number of managers is second lowest if company started in 2010.
वह वर्ष ज्ञात कीजिये जिसमें मैनेजरों की संख्या दूसरी न्यूनतम है यदि कंपनी 2010 में प्रारम्भ हुई।
(1) 2010
(2) 2011
(3) 2012
(4) 2013
(5) 2014
(7) Number of managers in year 2014 was what percent of the number of workers in year 2011 if company started in 2010? (Approx.)
वर्ष 2015 में मैनेजरों की संख्या वर्ष 2011 में श्रमिकों की संख्या का कितना प्रतिशत थी यदि कंपनी 2010 में प्रारम्भ हुई? (लगभग)
(1) 84
(2) 91
(3) 78
(4) 71
(5) 65
(8) Find the difference of number of workers in year 2010 and years 2014 if company started in 2010.
वर्ष 2010 तथा वर्ष 2014 में श्रमिकों की संख्या का अंतर ज्ञात कीजिये यदि कंपनी 2010 में प्रारम्भ हुई।
(1) 103
(2) 113
(3) 107
(4) 119
(5) 99
Q-(9-10) What value should come at place of question mark(?)In the following question?
(9) 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)
(1) 3.4
(2) 2.1
(3) 1.7
(4) 1.21
(5) 4.18
(10) ![](data:image/png;base64,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)
(1) 1.21
(2) 0.84
(3) 0.93
(4) 1.43
(5) None of these
Answer Key-
Q-(1) Sol-(1)
800=4000
Q-(2) Sol-(2)
Q-(3) Sol-(4)
Q-(4) Sol-(3)
Q-(5) Sol-(2)
hence answer will be year 2012
Q-(6) Sol-(1)
So answer will be 2010
Q-(7) Sol-(4)
Q-(8) Sol-(3)
Q-(9) Sol-(2)
Q-(10) Sol-(3)
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