![](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi4XAKQJvm9iTjciKqCF22Qr_YeUHhAzD-SRDfGbVq7UK5lq3o62yedy-V_ZePVKN8NVQHoBiZB0B4y-EIbN-MWjE1P1vZZp4mZU-xw6h5qoZqHpNyRen48J0Myqri8kZq5672nnaOyQRXv/s320/300X300+SBI+RBI+maths.jpg)
Dear Readers,
Mahendras has started special quizzes for IBPS RRB Exam so that you can practice more and more to crack the examination. This IBPS RRB 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 RRB Exam.
Q-(1-5) What should come at place of question mark (?) in the following question?
प्रश्न चिह्न (?) के स्थान पर निम्न प्रश्न में क्या आना चाहिए?
(1) 188.21 - 27.54 - 11.93 = ?
(1) 147.74
(2) 148.74
(3) 138.74
(4) 137.74
(5) 157.74
(2) 1268 ÷ 8 ÷ 2 = ?
(1) 80.25
(2) 78.25
(3) 79.25
(4) 68.25
(5) 72.25
(3) ![](data:image/png;base64,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)
(1) 9.4
(2) 7.4
(3) 9.2
(4) 7.2
(5) 6.5
(4) ![](data:image/png;base64,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)
(1) 780
(2) 725
(3) 775
(4) 760
(5) 785
(5) (3894.98-1993.02-1900.12) of 349.95× (?)=30999.95+499.86
(1) 42
(2) 48
(3) 52
(4) 44
(5) 60
(6) Fifteen movie theatres average 600 customers per theatre per day. If six of the theatres close down but the total theatre attendance stays the same, then the average daily attendance per theatre among the remaining theatres is
चलचित्र थियेटरों में औसतन प्रति दिन प्रत्येक थियेटर में 600 दर्शक आते हैं | यदि उनमें से 6 थियेटर बन्द हो गए किन्तु थियेटर में आने वालों की कुल उपस्थिति वही रहती है तो शेष थियेटरों में से प्रत्येक थियेटर में दर्शकों की औसतन दैनिक उपस्थिति क्या है?
(1) 900
(2) 1000
(3) 1100
(4) 1200
(5) None of these
(7) 25 men could finish a work in 36 days but when some more men joined the work was finished in 5/6th of the time. Find the number of more men joined.
25 आदमी किसी कार्य को 36 दिनों में पूरा कर सकते हैं लेकिन जब कुछ और आदमी कार्य में जुड़ जाते हैं तो कार्य पूर्व समय के 5/6 समय में पूरा हो जाता है। जुड़ने वाले अतिरिक्त आदमियों की संख्या ज्ञात करें।
(1) 12
(2) 10
(3) 5
(4) 8
(5) 4
(8) A trader bought 20kg of sugar at the rate of Rs.30 per kg. He sold 30% of the total quantity at the rate of Rs.40 per kg. At what price per kg should he sell the remaining quantity to make 15% overall profit (approximate)?
एक व्यापारी ने 20 किलोग्राम चीनी प्रति किलोग्राम 30 रुपये की दर से खरीदी। उसने कुल मात्रा का 30%, 40 रुपये प्रति किलो की दर से बेचा। तो कुल 15% का (अनुमानित) लाभ कमाने के लिए उसे प्रति किलोग्राम किस मूल्य पर शेष चीनी की मात्रा को बेचना चाहिए?
(1) Rs.25
(2) Rs.36
(3) Rs.22
(4) Rs.32
(5) Rs.18
(9) A woman ordered 8 pair of diamond earrings and some pair of gold earrings. The price of diamond pair is double that of gold one. While preparing the bill the jeweller interchanged the count of gold and diamond pair. It decrease the bill by price of 3 pairs of golg earings. Then find the ratio of diamond and gold pair of earring in the original order?
एक महिला ने 8 जोड़ी हीरे की बालियां और कुछ जोड़ी सोने की बालियों का ऑर्डर दिया। हीरे के जोड़ी की कीमत सोने की कीमत से दोगुनी है। बिल तैयार करते समय जौहरी ने सोने और हीरे के जोड़ी की गिनती को आपस में बदल देता है। तो इससे बिल में 3 जोड़ी सोने की बालियों के दाम के बराबर कमी हो जाती है। तो वास्तविक आर्डर में हीरे और सोने की जोड़ी के बाली का अनुपात ज्ञात करें?
(1) 5: 8
(2) 7: 2
(3) 8: 5
(4) 8: 3
(5) None of these
(10) In a competitive exam, 50% of total candidates failed in current affairs, 40% of candidates failed in aptitude and 10% in both. Find the percentage of those who passed in both the sections?
एक प्रतियोगी परीक्षा में, कुल विद्यार्थी का 50% करंट अफेयर्स में असफल हो गए, 40% विद्यार्थी संख्यात्मक योग्यता में और दोनों में 10% विद्यार्थी असफल हो जाते है। तो दोनों वर्गों में उत्तीर्ण होने वाले विद्यार्थी का प्रतिशत ज्ञात करें?
(1) 10%
(2) 20%
(3) 30%
(4) 40%
(5) None of these
Answer Key-
Q-(1) Sol-(2)
188.21 - 27.54 - 11.93 = 148.74
Q-(2) Sol-(3)
79.25
Q-(3) Sol-(1)
Q-(4) Sol-(3)
Q-(5) Sol-(4)
Q-(6) Sol-(2)
Total number of customers in 15 movie theatres
= 15 × 600 = 9000
Required average number of customers ![](data:image/png;base64,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)
Q-(7) Sol-(3)
25×36=x×30
x=30
required answer=30-25=5
Q-(8) Sol-(4)
Total quantity of sugar = 20 kg
Total CP of sugar = 20×30 = Rs.600
30% of Total Quantity = 30% of 20
= (30/100)×20 = 6
SP = 6×40 = Rs.240
SP = 600×(115/100) = Rs.(69000/100)
= RS 690
SP of Remaining Quantity = 690- 240 = Rs.450
Remaining Quantity = 20 – 6 = 14 kg
Sugar per Kg = 450/14
= Rs.32.14
Q-(9) Sol-(3)
Diamond :
Gold
8 a (pairs)
2 1 (price)
according to given condition,
16+a-2a-8=3
a=5
Required answer=8:5
8 a (pairs)
2 1 (price)
according to given condition,
16+a-2a-8=3
a=5
Required answer=8:5
Q-(10) Sol-(2)
Percentage of candidates failed = 50 + 40 - 10 = 80
Percentage failed in current affairs or aptitude or both = 80%
Hence percentage passed = (100 - 80) % = 20%
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MAHENDRA GURU