![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.
(1) A double bed is marked at Rs. 7500. The shopkeeper allows successive discounts of 8%, 5% and 2% on it. What is the Net selling price?
एक डबलबेड की कीमत 7500 रू. चिन्हित की गई है। दुकानदार उस पर 8%, 5% और 2% की आनुक्रमिक छूट देता है। निवल बिक्री कीमत बताएं।
(A) 6234.56
(B) 6423.90
(C) 6500
(D) 6543.78
(2) X purchased an item at a discount of 10% and sold it to Y at 10% profit. The marked price and the price for which Y purchased the item are in ratio.
X ने कोई मद 10% छूट पर खरीदी और Y को 10% लाभ पर बेच दी। अंकित कीमत और उस कीमत जिस पर Y ने मद खरीदी का अनुपात क्या होगा?
(A) 99 : 100
(B) 100 : 99
(C) 101 : 100
(D) 100 : 101
(3) A man engaged a servant on the condition that he would pay him Rs. 90 and a turban after service of one year. He served only for nine months and received the turban and an amount of Rs. 65. The price of turban is
एक व्यक्ति ने एक सेवक को इस शर्त पर रखा कि वह एक वर्ष की सेवा के पश्चात उसे 90 रू. और एक पगड़ी देगा। सेवक ने केवल 9 महीने काम किया और उसे पगड़ी और 65 रू. की राशि प्राप्त हुई। पगड़ी की कीमत बताएं।
(A) 50
(B) 20
(C) 10
(D) 25
(4) If diagonals of a rhombus are 24 cm. and 32 cm., then perimeter of that rhombus is -
यदि किसी समचतुर्भुज के विकर्ण 24 सेमी. और 32 सेमी. है तो उस समचतुर्भुज का परिमाप बताएं।
(A) 80 cm
(B) 60 cm
(C) 64 cm
(D) 72 cm
(5) The inradius of an equilateral triangle is √3 cm., then the perimeter of that triangle is -
यदि किसी समभुज त्रिकोण की आन्तरिक त्रिज्या √3 सेमी. है तो उस त्रिकोण का परिमाप बताएं।
(A) 36
(B) 27
(C) 21
(D) 18
(6) Let A, B, C, D be the angles of a quadrilateral. If they are concyclic, then the value of cos A + cos B + cos C + cos D is -
A, B, C, D चतुर्भुज के कोण है। यदि वे एक वृत्तीय हो तो cos A + cos B + cos C + cos D का मान बताएं।
(A) 0
(B) 1
(C) 2
(D) – 1
(7) If / यदि
, then find the value of /तो
का मान ज्ञात कीजिये?
(A) 1/21
(B) 2/21
(C) 4/21
(D) 8/21
(8) The digit in unit's place of the product 49237 × 3995 × 738 × 83 × 9 is
49237 × 3995 × 738 × 83 × 9 के गुणनफल का इकाई के स्थान का अंक बताएं।
(A) 0
(B) 1
(C) 2
(D) 3
(9) If / यदि
and / और
then / तो ![](data:image/png;base64,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)
(A) 990
(B) 970
(C) 1000
(D) 1100
(10) If the common factor of y2+by+c and y2 + my + n is (y + a), then the value of a is?
यदि y2+by+c और y2 + my + n का उभयनिष्ठ गुणनफल (y + a) हैं, तो a का मान ज्ञात कीजिये ?
(A) ![](data:image/png;base64,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)
(B) ![](data:image/png;base64,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)
(C) ![](data:image/png;base64,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)
(D) ![](data:image/png;base64,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)
Answer -
Q-(1) Sol-(B)
The net selling price /निवल बिक्री कीमत = ![](data:image/png;base64,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)
Q-(2) Sol-(B)
M.P /अंकित मूल्य = 100
C.P / क्रय मूल्य = ![](data:image/png;base64,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)
Ratio/ अनुपात = 100 : 99
Q-(3) Sol-(C)
Let the price of turban be Rs. x / माना पगड़ी की कीमत X रू. है।
Q-(4) Sol-(A)
AD =
= 20
⇒ Perimeter of rhombus/समचतुर्भुज का परिमाप = 4 × 20
= 80 cm / सेमी
Q-(5) Sol-(D)
a = 6 cm
Perimeter of triangle/त्रिभुज का परिमाप= 6 × 3
= 18 cm/सेमी
Q-(6) Sol-(A)
Q-(7) Sol-(A)
Q-(8) Sol-(A)
0
Q-(9) Sol-(B)
Q-(10) Sol-(A)
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MAHENDRA GURU