![](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 SBI / RBI Main Exam so that you can practice more and more to crack the examination. This SBI / RBI Main Exam 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 important question of Quantitative aptitude for SBI / RBI Main Exam.
Q-(1-6) What approximate value should come at place of question mark (?) in the following question?
निम्नलिखित प्रश्न में प्रश्न चिह्न(?) के स्थान पर लगभग क्या मान आना चाहिए ?
(1) 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)
(1) 8
(2) 3
(3) 11
(4) 6
(5) 2
(2) 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)
(1) 144
(2) 49
(3) 256
(4) 81
(5) 8
(3) 12.8972+13.0432-17.9962=?
(1) 40
(2) 34
(3) 24
(4) 39
(5) 14
(4) 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)
(1) 26
(2) 41
(3) 29
(4) 50
(5) 62
(5) 18.97×45.23-35.88×12.11=?% of 845.66
(1) 25
(2) 30
(3) 45
(4) 65
(5) 50
(6) ![](data:image/png;base64,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)
(1) 100
(2) 95
(3) 105
(4) 85
(5) 75
(7) The simple interest accrued on an amount of Rs. 8500 at the end of four years is Rs.3400. What would be the compound interest accrued on the same amount at the same rate of interest after three years?
8500 रुपये की राशि पर चार वर्ष के अंत में अर्जित साधारण ब्याज 3400 रुपये है । तीन वर्ष पश्चात उसी ब्याज दर पर समान राशि पर अर्जित चक्रवृद्धि ब्याज क्या होगा?
(1) 2560.25 Rs
(2) 2813.5 Rs
(3) 2740 Rs
(4) 2944 Rs
(5) None of these
(8) Ratio of age of father, mother and son is 9:8:3. Five years hence sum of their age will be 95 years. Find the age of son 5 years ago.
पिता, मां और पुत्र की आयु 9: 8: 3 है पांच वर्ष पश्चात उनकी आयु का योग 95 वर्ष होगा । 5 वर्ष पहले पुत्र की आयु ज्ञात कीजिये।
(1) 12 years
(2) 7 years
(3) 10 years
(4) 15 years
(5) None of these
(9) Ganesh, Shankar and Sameer invested Rs. 4200, Rs. 8400 and 5400 respectively while starting a business. At the end of the year, they earned a profit of Rs. 24,000. Sameer invested 32% of .his share of the profit in a saving scheme. How much amount he is left with?
गणेश, शंकर और समीर ने क्रमशः 4200 रु, 8400 रु और 5400 रु निवेश के साथ व्यापार प्रारम्भ किया । वर्ष के अंत में, उन्होंने 24,000 रुपये का लाभ अर्जित किया। समीर ने अपने लाभ का 32% हिस्सा बचत योजना में निवेश किया। उसके पास शेष धन क्या है?
(1) 4280 Rs
(2) 4652 Rs
(3) 5520 Rs
(4) 4896 Rs
(5) None of these
(10) In a mixture of milk and water milk is found to be 28%. When 16 litre water is added in the mixture new percentage of milk in mixture becomes 20%. Find the initial quantity of mixture.
दूध और पानी के मिश्रण में दूध 28% है। जब मिश्रण में 16 लीटर पानी मिलाया जाता है तो मिश्रण में दूध का नया प्रतिशत 20% हो जाता है। मिश्रण की प्रारंभिक मात्रा ज्ञात कीजिये।
(1) 42 litre
(2) 48 litre
(3) 36 litre
(4) 40 litre
(5) None of these
Answer Key-
Q-(1) Sol-(1)
48×87÷72=?2-8
?2=66
?=8.12 ˜ 8
?2=66
?=8.12 ˜ 8
Q-(2) Sol-(2)
Q-(3) Sol-(5)
169+169-324=14
Q-(4) Sol-(1)
14+33-13=34=25.95%of132
Q-(5) Sol-(5)
19×45-36×12=423=50% of 846
Q-(6) Sol-(3)
Q-(7) Sol-(2)
CI=
Rs
Q-(8) Sol-(2)
sum of their present age=95-15=80 years
present age of son=![](data:image/png;base64,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)
required answer=12 - 5=7 years
Q-(9) Sol-(4)
Ratio of profit sharing=7 : 14 : 9
share of Sameer=![](data:image/png;base64,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)
required answer=68% of 7200=4896
Q-(10) Sol-(4)
taking
percentage of milk
28 0
20
20 8 = 5 : 2
now 2=16
so 5=40
28 0
20
20 8 = 5 : 2
now 2=16
so 5=40
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