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.
Q-1 In how many 7 prizes can be given to 3 boys, if all boys are equally eligible of getting the prize.
3 लड़कों को कितने तरीके से 7 पुरस्कार दिए जा सकते हैं यदि सभी लड़के पुरस्कार पाने के लिए समान रूप से पात्र हैं।
1.343
2.344
3.354
4.453
5.433
Q-2 There are 459 students in a hostel. If the number of students increased by 36, the expenses of the mess increased by Rs 81 per day while the average expenditure per head reduced by 1. Find the original expenditure of the mess?
एक छात्रावास में 459 छात्र हैं। यदि छात्रों की संख्या में 36 की वृद्धि हुई, तो मेस के खर्च में प्रति दिन 81 रुपये की वृद्धि हुई, जबकि प्रति छात्र पर औसत व्यय में 1 रु की कमी आई है| मेस की वास्तविक खर्च ज्ञात कीजिए?
1.7343
2.7433
3.7344
4.7685
5.7890
Q-3 Sumi can swim 6 kmph in still water. If the velocity of the stream were 2 kmph, the time taken by her to swim to a place 24 km upstream and back, is?
सुमी स्थिर पानी में 6 किमी प्रति घंटे से तैर सकती है। यदि धारा का वेग 2 किमी प्रति घंटा था, तो उसके 24 किमी उर्धव्प्रवाह और वापस उसी जगह पर तैर कर आने में लगने वाला समय ज्ञात कीजिए?
1.4
2.7
3.6
4.9
5.2
Q-4 A container has 30 L of water. If 3 L of water is replaced by 3 L of spirit and this operation is repeated twice , what will be the quantity of water in the new mixture?
एक कंटेनर में 30 L पानी होता है। यदि 3 L पानी को 3 L की स्पीरिट से बदल दिया जाता है और इस प्रक्रिया को दो बार दोहराया जाता है, तो नए मिश्रण में पानी की मात्रा क्या होगी?
1.24.3lit
2.23.4 lit
3.34.2lit
4.42.3lit
5.41.3lit
Q-5 Rs 61105, is divided between Ram and Raman in the ratio 3 : 8 .What is the difference between thrice the share of Ram and twice the share of Raman?
61105 रु को राम और रमन के बीच 3: 8 के अनुपात में विभाजित किया गया है। तीन बार राम के हिस्से और दो बार रमन के हिस्से के बीच क्या अंतर है?
1.32885
2.31885
3.38885
4.34885
5.36885
Q-6 The prices of two articles are in the ratio 3 : 4. If the price of the first article be increased by 10% and that of the second by Rs. 4, the original ratio remains the same. The original price of the second article is:
दो वस्तुओं की कीमतें 3: 4 के अनुपात में हैं। यदि पहले वस्तु की कीमत में 10% की वृद्धि हुई है और दूसरी की कीमत में 4 रुपये की, तो मूल अनुपात समान है। दूसरे वस्तु की मूल कीमत है:
1. Rs.45
2. Rs.67
3. Rs.89
4. Rs.70
5. Rs.40
Q-7 Three pipes A, B and C can fill a tank in 15 minutes, 20 minutes and 30 minutes respectively. The pipe C is closed 6 minutes before the tank is filled. In what time the tank will be full.
तीन पाइप A, B और C क्रमशः 15 मिनट, 20 मिनट और 30 मिनट में एक टैंक भर सकते हैं। टैंक भरने से 6 मिनट पहले पाइप C बंद किया जाता है। कितने समय में टैंक पूर्ण रूप से भर जाएगा।
1.5 minutes
2.8 minutes
3.5 minutes
4.7 minutes
5.9 minutes
Q-8 A dealer offers a cash discount of 20% and still makes a profit of 20%, when he further allows 16 articles to a dozen to a particularly sticky bargainer. How much percent above the cost price were his wares listed.
एक डीलर 20% की नकद छूट प्रदान करता है और फिर भी 20% का लाभ कमाता है, जब वह आगे एक विशेष रूप से सौदा करने वाले को एक दर्जन वस्तुओं पर 16 वस्तुओं को देने की अनुमति देता है फिर लागत मूल्य से कितना प्रतिशत ऊपर उसके वस्तुओं की कीमत सूचीबद्ध थे।
1.300%
2.120%
3.200%
4.100%
5.350%
Q-9 What value will come in place of question mark in the following questions ?
दिए गए प्रश्नों में प्रश्नवाचक चिह्न (?) के स्थान पर क्या मान आएगा ?
(128.5 x 64) + (13.8 x 465) =? x 25
1. 585.64
2. 586.64
3. 587.64
4. 588.64
5. 589.64
Q-10 What will come in place of question mark (?) in the following question?
निम्न प्रश्नों में प्रश्नवाचक चिन्ह (?) के स्थान पर क्या आयेगा ?
40% of 265 + 35% of 180 = 50% of ?
1.890
2.897
3.678
4.338
5.456
ANSWER KEY --------
Q-1 (1)
Q-2(3) ![]()
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459x + 81 = 495(x -1)
495 + 81 = 495x – 459x
x =
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459 × 16 = 7344
Q-3 (4)
Q-4 (2) ![]()
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Q-5(3) ![]()
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Q-6(5) ![]()
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Q-7 (2) ![]()
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Q-8(4) ![]()
MP=
![](data:image/png;base64,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)
Now he is selling 16 goods to a dozen(ie 12), so his loss
=![]()
![](data:image/png;base64,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)
Then the actual MP
![](data:image/png;base64,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)
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Hence, he has marked the MP 100% above the CP
अंकित मूल्य =
![](data:image/png;base64,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)
अब वह 16 वस्तुओं को 12 वस्तुओं की जगह पर दे रहा है =
![](data:image/png;base64,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)
तो वास्तविक अंकित मूल्य ![]()
![](data:image/png;base64,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)
इसीलिए अंकित मूल्य 100% बढाया गया है|
Q-9(1)
? x 25 = 8224 + 6417
? = 585.64
Q-10(4)
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