![SSC CHSL Quiz : Quantitative Aptitude | 23 -03-2020 SSC CHSL Quiz : Quantitative Aptitude | 23 -03-2020](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhaNQtukPFfUWKbN4H9mhOc1cd7sSWatPUOHocVsRfMsoakPM00v6mybgf5277YXuZjXSYrGmiZbePvkKj4GQuXUXj1UcHd4UIFOZ6pV2sweskdGWN2_w4kbyEFjD_GCq98eMn6GFtx34M/s1600/Maths+quiz.jpg)
As SSC CPO notification is out and candidates have started their preparation for this exam. Mahendras also has started special quizzes for this examination. This series of the quizzes are based on the latest pattern of the CPO examination. Regular practice of the questions included in the quizzes will boost up your preparations and it will be very helpful in scoring good marks in the examination.
Q- 1 If the 8- digit number 789x531y is divisible by 72, then the value of (5x-3y) is?
यदि 8- अंक संख्या 789x53y, 72 से विभाज्य है, तो (5x-3y) का मान है?
A. -1
B. 1
C. 0
D. 2
Q-2 If
, then find the value of
?
यदि
, तो
का मान ज्ञात कीजिये ?
A.3
B.6
C.5
D.1
Q-3 If
, then the value of
is?
यदि
, तो
का मान ज्ञात कीजये ?
A.17
B.18
C.19
D.16
Q-4 A takes 30 minutes more than B to cover a distance of 15 km at a certain speed. But if A doubles his speed, he takes one hour less than B to cover the same distance. What is the speed ( in km/h) of B ?
A को एक निश्चित गति से 15 किमी की दूरी तय करने में B से 30 मिनट अधिक समय लगता है। लेकिन अगर A अपनी गति को दोगुना कर देता है, तो उसे समान दूरी तय करने में B से एक घंटे कम समय लगता है। B की गति (किमी / घंटा में) क्या है?
A.7
B.4
C.5
D.6
Q-5
is similar to
. The area of
is 100 cm2 and the area
is 49 cm2. If the altitude of
=5cm, then the corresponding altitude of
is( in cm)?
A.7.5
B.4.5
C.5.5
D.3.5
Q-6 Renu bought an article for Rs. 1240 and sold it at a loss of 25%. With this amount, she bought another article and sold it at a gain of 40%. Her overall percentage profit is?
रेनू ने 1240 रुपये में एक वस्तु खरीदा । और इसे 25% की हानि पर बेचा। इस राशि के साथ, उसने एक और वस्तु खरीदा और उसे 40% के लाभ पर बेचा। उसका कुल प्रतिशत लाभ है?
A.8%
B.4%
C.5%
D.3%
Q-7 If length of each side of a rhombus PQRS is 8 cm and ∠PQR = 120°, then what is the length (in cm) of QS?
यदि एक समचतुर्भुज PQRS के प्रत्येक भुजा की लंबाई 8 सेमी और ∠PQR = 120 ° है, तो QS की लंबाई (सेमी में) क्या है?
A.8
B.4
C.6
D.3
Q-8 PQR is a right angle triangle in which angle R=90. If RS is perpendicular to PQ, and PR=3cm and RQ= 4cm , then what is the value of RS ( in cm )?
PQR एक समकोण त्रिभुज है जिसमें कोण R = 90 है। यदि RS, PQ के लंबवत है, और PR = 3cm और RQ = 4cm, तो RS (cm में) का मान क्या है?
A.2.4
B.4.6
C.6.5
D.3.1
Q-9 The marked price of an article is Rs. 315. It sold for Rs. 288, if there is a loss of 4% , then by what percent above the cost is the article marked?
एक वस्तु का चिह्नित मूल्य 315 रुपये है . इसे 288 रुपये में बेचने पर यदि 4% की हानि होती है, तो लागत से कितने प्रतिशत अधिक वस्तु का अंकित मूल्य है?
A.2%
B.5%
C.4%
D.1%
Q-10 Two circle of radii 10cm and 8 cm intersects at point P and Q. If PQ=12cm and the distance between the centers of the circle is x cm. the value of x is?
10 सेमी और 8 सेमी त्रिज्याओं वाले दो वृत्त बिंदु P और Q पर काटते है यदि PQ = 12 सेमी और वृत्तो के केंद्रों के बीच की दूरी x सेमी है। x का मान है?
A.12.9
B.12.5
C.14.6
D.13.3
ANSWER:
Q-1 (A)
The Number must be divisible by 8 and 9 both so ,
By checking divisibility by 8, y=2
By checking divisibility by 9, x=1
5×1-3×2=-1
संख्या 8 और 9 दोनों से विभाज्य होनी चाहिए,
8 से विभाज्यता की जांच करके, y = 2
9 द्वारा विभाज्यता की जांच करके, x=1
5×1-3×2=-1
Q-2 (C)
Q-3 (C)
Q- 4 (D)
B=6km/h
B=6 किमी/घंटा
Q- 5 (D)
Q- 6 (C)
Q- 7 (A)
Q- 8 (A)
Q- 9 (B)
Cost price of the article =![](data:image/png;base64,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)
Percent above the cost Price to marked price =![](data:image/png;base64,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)
वस्तु का लगत मूल्य=![](data:image/png;base64,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)
अंकित मूल्य की लागत मूल्य से प्रतिशत अधिकता =![](data:image/png;base64,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)
Q- 10 (D)
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