Dear maths lovers, Let your practice begins in minuteness but ends in magnificence.It is impossible to study maths properly by just reading and listening. So, practise, practise & more practise. For that, we are providing here Quant Quiz of 15 Miscellaneous Questions in accordance with the syllabus of SSC CGL.We have also provided Study Notes and quizzes on all the topics.
Q2.√784÷7=√(? )-5
(a) 9
(b) 81
(c) 27
(d) √3
Q3.If the HCF of two positive integers is 26. Then, their LCM cannot be
(a) 78
(b) 104
(c) 144
(d) 234
Q4.30 pineapple trees, 45 orange trees and 60 mango trees have to be planted in rows such that each row contains the same number of trees of one variety only. What is a minimum numberof rows in which the trees may be planted?
(a) 10
(b) 15
(c) 25
(d) 9
Q5.What is the greatest possible length of a scale that can be used to measure exactly the lengths 300m, 510m and 1290 cm?
(a) 30m
(b) 50m
(c) 70m
(d) 80m
Q6.Jagatram, a milk seller has certain quantity of milk to sell. In what ratio, he should mix water to gain 5% by selling the mixture at the cost price?
(a) 1 : 10
(b) 1 : 5
(c) 1 : 20
(d) 1 : 15
(e)None of these
Q7.A trader marks his goods at such a price that he can deduct 15% for cash and yet make 20% profit. The marked price of an item which cost him Rs. 90, is:
(a) Rs. 1996/21
(b) Rs. 2208/21
(c) Rs. 2160/17
(d) Rs. 1766/13
Q8.A fruit seller buys lemons at 2 for a rupee and sells them at 5 for 3 rupees. His gain percent is:
(a) 10%
(b) 15%
(c) 20%
(d) 25%
Q9. A person sells an article for Rs. 75 and gains as much percent as the cost price of the article in rupees. The cost price of the article is:
(a) Rs. 37.50
(b) Rs. 40
(c) Rs. 50
(d)Rs. 150
Q10.A shopkeeper claims to sell his articles at a discount of 10%, but marks his articles by increasing the cost of each by 20%. His gain percent is:
(a) 6%
(b) 8%
(c) 10%
(d) 12%
Q12. If one angle of a triangle is equal to the sum of the other two, then the triangle is:
(a) Right-angled
(b) Obtuse-angled
(c) Acute-angled
(d) None of these
Q13. ABC is an equilateral triangle and CD is the internal bisector of C. If DC is produced to E such that AC = CE then CAE is equal to:
(a) 45°
(b) 75°
(c) 30°
(d) 15°
Q14. The side AB of a parallelogram ABCD is produced to E in such way that BE = AB, DE intersects BC at Q. The point Q divides BC in the ratio
(a) 1 : 2
(b) 1 : 1
(c) 2 : 3
(d) 2 : 1
Q15. In triangle ABC, P and Q are the mid points of the sides AB and AC respectively. R is a point on the segment PQ such that PR : RQ = 1 : 2, If PR = 2 cm, then BC =
(a) 4 cm
(b) 2 cm
(c) 12 cm
(d) 6 cm
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