Quantitative Aptitude Questions with Answers for SSC CGL

Quantitative Aptitude Questions with Answers and Solution for SSC CGL- Mock Test of Maths MCQs set for online practice of upcoming Competitive exams.

Subject : Quantitative Aptitude (Mathematics)
Medium : English
Level : SSC CGL
All type Questions with Solution
As per latest exam pattern and syllabus
Set of 25 Questions – New Questions practice Set in Every Attempt

 

Results

#1. A merchant sold an article for Rs 75 at a profit per cent equal to its cost price. The cost price of the article was :

#2. The average weight of A, B and C is 45 kg. If the average weight of A and B be 40 kg and that of B and C be 43 kg, then the weight (in kg) of B is :

 

#3. The average of 15 numbers is 7. If the average of the first 8 numbers be 6.5 and the average of last 8 numbers be 9.5, then the middle number is :

#4. A tap can fill a tank in 6 hours. After half the tank is filled, three more similar taps are opened. What is the total time taken to fill the tank completely?

#5. \dfrac{(2.3)^3+0.027}{(2.3)^2-0.69+0.09} is equal to

#6. When 335 is added to 5A7, the result is 8B2. 8B2 is divisible by 3. What is the largest possible value of A?

#7. If a = 4011 and b = 3989, then the value of ab = ?

#8. Given A is 50% larger than C and B is 25% larger than C, then A is what per cent larger than B?

#9. A sum of money placed at compound interest doubles itself in 4 years. In how many years will it amount to four times itself ?

#10. 15 litres of a mixture contains alcohol and water in the ratio 1 : 4. If 3 litres of water is mixed in it, the percentage of alcohol in the new mixture will be

#11. The greatest number, which when divide 989 and 1327 leave remainders 5 and 7 respectively, is :

The largest number which when divide the numbers a, b and c give remainders as p, q, r respectively is given by H.C.F. of (a – p), (b – q) and (c – r)
Required number
= HCF of (989 – 5) and (1327 – 7)
= HCF of 984 and 1320 = 24
HCF = 24

#12. A cricket player after playing 10 tests scored 100 runs in the 11th test. As a result, the average of his runs is increased by 5. The present average of runs is :

#13. If X = (0.25)^{\frac12} , Y = (0.4)^2 , Z =(0.216)^{\frac13} , then

#14. If 28 men complete \frac78 of a piece of work in a week, then the number of men, who must be engaged to get the remaining work completed in another week, is :

#15. In an examination, 19% students fail in Mathematics and 10% students fail in English. If 7% of all students fail in both subjects, then the number of students passed in both subjects is :

#16. If \sqrt7 = 2.646 , then the value of \frac{1}{\sqrt{28}} up to three places of decimals is :

#17. A shopkeeper allows a discount of 10% on the marked price of a camera. Marked price of the camera, which costs him Rs 600, to make a profit of 20% should be :

#18. \sqrt{110\frac14} is equal to

#19. The next number of the sequence 2, 5, 10, 14, 18, 23, 26, 32 … is

#20. The next number of the sequence 51, 52, 56, 65 is

#21. A cricketer had a certain average of runs for his 64 innings. In his 65th innings, he is bowled out for no score on his part. This brings down his average by 2 runs. His new average of runs is :

#22. A worker suffers a 20% cut in his wages. He may regain his original wages by obtaining a rise of

#23. If the discount is equal to one fifth of the marked price and the loss is half the discount, then the percentage of loss is :

#24. The number 96 – 11 when divided by 8 would leave a remainder of

#25. \frac{3\sqrt{2}+2\sqrt{3}}{3\sqrt{2}-2\sqrt{3}} is equal to

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