![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 tan θ =
, 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,iVBORw0KGgoAAAANSUhEUgAAACsAAAAxCAYAAABDEFA9AAAHUElEQVRoBe1ZW09UVxSehhiDIiAgCIIgl4LQgmkam2hS+uAvaG1j4g/wSbAXX018MPEH+NomfaQJTWpiYlIkJmhFCnIRtFwsV5H7ZWCGuZ35mm8Na3M4OHAc6IMtOzmz99ln7b2+/a3L3ueMB+9R8bxHWLEP9t+y1t4xGwXwtsuB3CkSAcDLTdkHu4lhB2X7zDoI2fnWSZneO0Zqt9b7PusgaOutUuWsHZLOx/99ZsPhsHAQDAaxtrYm7VAoZHhZXV2VdiQSy4qWZYEXi4yNAlYwBCscMflW2gA4TzQajV2UtyImYYSiFrx+n9GzXcPkWYJkUTBsUwGBzMzMoK6uDh6PR66bN2+K7MrKitSUo/bAqg+hQBCVFafx4PcmXPzyK5G/ceOGyMmc63tHMBxCIBQEwSa0KShgTrq8vCwKCOj69evo7OwEn4+OjiI7OxsTExOyGC6OMn7vCqKhML74vBYfeDwoLjqFNZ8fDx8+RG5uLsbGxuD1egWghahhNmGfFYYAMa+avaenBxcuXBDgNDsXoYtaWlrasEQUeDM+gefdPcJsZ8czeJeWMTc3hzNnzsjilNm1YACRKCHHttqg5Y5b4wZqfp/PZ8D4/X7cvXsXly9fNn4sqG0/NTU1Yuq0wymoqfoIg/0D+LC0DM1ND8R/JycnkZOTg5aWFuOzmhEEdKJnA4LTQtAsra2tKCoqwuzsrNwHAgGQURat2Q76/HLNTE0j82gGenueI+CPBWpqaio6Ojok0JZXvMYF6LNr4VBiPmtXTkZYaPbz58/j9u3b0D76671796CuIoJWLMim30yh6GQh6Aawomhvb0dxcbGApRxZ9QfWpE6YWXu6Upfg5Ew7DAwqTEtLE5NfunQplq4EJUC2qZ0BVVpcIgFWcCIfj1seobCwUMbk5+cLcHUB1qFIWEAzM7gpxmdVWNnSvGsPOs2tidR2AqiLbqauprp3qg1Yph+d0DnJ4uLiTvO4es55NTfrAJIiltGObWoD1inDCWh+dQ9OupuL82vKY5sBq+Q4dce7N2AJTF3AHmgcaM8S8SbaqV+3bieTIyMjOw01zw1Y9nAipwsos/Td3VxcsAJmW4kxSFw0DFiaXYHSXJxMM4GLeVyJ2C2mLsFgTchndVBKSgp48eBSVlYmtR5idlMnJSWZudLT06XNdKgk7bRiwywF6QYsdPyFhQVp05f3qujhiO6kut4lHjaBtedPBciJdeWqgM/U/9inUW1XrG1drMrbx7JNnW6LATs/Py9j1PEJwg6ObQLXQuUKkn26ILbtwHg/NTUlwzi3uho7GLxclAaxCG3zY8A6ZdRk7KcCZYptO2i2FRxZ5KL0nmPjAbGDdsuuAUuWlB3uMsPDw3IeePLkyaZ1EIhGsh2UKle2ddfTRWo/J+N46iJILlZdZZOit9wYsHymCqanp+UMeuDAAXlD4DO+2lCJnQU7AAVut4imKj4jwwRmdy3OpW73FmxbugxYZYAr5qQ84ScnJ6OtrW3LIHZQRmuySuAKzsmUfVEcw+cEb7eSTLbDzxawOhn3buZYHr5VuW6NVE727UWZ1T4FriSQUQaxEzjl1a10bLzagKWAmovtgYEBlJSUoLm5GVeuXJEEXl5ejv7+fplLA0drHkx7urqRcywbL3r78G39NTnX/vDd94hGLHxz8Wscy8zCtbp6OZRTfmlhUdrhYALnWSrWlRMUX2cyMzMxPj4uGeHWrVuoqKgQ/9XV05epeGriNfKP5yLJ40FOZhZej46h9dFjHEk+hGNHMzA5No7ujmcoLTqFv3r7Yq8M628X0G8NOmmcehOzlNEAYKBkZWWZ1xE+Y0BUVlYKu7SC+q0c9yMWxl8N4+Py0+hqawciUbwZHUdJQWHs3gJedj/HuU/PSg3uBRawPDsfA76RwuNAxcZ/CuqDDDACoX/yleT+/ftmMBmurq7GnTt3JECqqqqQl5cn5v6kugbP2v5E6qHD6O3qlpdH78IisjMy8fTxHwKIL5VF+QXo6+4BIhamX09uAH0XsIpImeWuw0MLa+0bGhpCbW2tpDj1VT1DkN2/BwZRVV4RM3M4It8RKkrL0N76FL5lL/r7XuBEznF0tXcYkPyKEwmFY/cKIk5t3IDpR6OesoODg/JxoqmpScAylV29ehX19fUyFRegmwjbkUAQi7Nz4pO/Nf4qyvmVJj3lCAZevJR7MluQmye+S/DqPub7WByQ2m3Aagf9kBcDraGhQdjl0e7gwYNobGwUgJqmyK7uXL6VVZw7+5kEGNlrbPgFJ/NOyD2D7ucff0JGapq4CT+IjAy9ioGl+RloLooByy3WmHR9oO5oBET27PmQTGsOpUWYfvgqzg9zTFVkzb/qk1rvhUnNAMRnk3GBdSPAVFj9U99CyZ72qdk1vXEMQUuJwvgezeoEqoC5KPVR+WKz/r1B9W9XG2a3E3L1bJ0pYS+Rtgsl/1OwLpjZrcjeMbtbJC7G7x3YKLC8uGSinwGl+VMDalt/dgH2H5NMIi/UwMh0AAAAAElFTkSuQmCC)
(B) ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACgAAAArCAYAAAAKasrDAAAHcElEQVRYCeVYWW9VVRQ+phTbglAp0lbUlpZCEZFCpESJb/wDEjXhQQ0Jg09AUtE/QIIaTdCEoYKF9AGeQFTkAUFB7UBLoUChc6HQeZ5vh/uZb9HvuHttuURyiYk72XftYe29vv2ttfY553p40hIEert7gCAQHJ+wOjE2bv3x0TGTnJuxhrHvhZkPPx0ERkcCMwN4FDjOhSlPDHAsMGrgyJ6xNBEEWGlc8lEgnxZAuZPuVfs/AXC62PLZfBRzmos0gwT4oPH+lBj0GRSIR8lIA2SCnP3xJ8vekaFhA6q4lJyOZX8s0gD7enpx6MBBMPaGB4emJMdjMRkO4NjYmKkEAgEMDw9be3R0dMqy8fFxaGxiYgLsU7IQ1PG8Y8YgWQkMj1j1GZocU193JvsDff1T7EzX8QiMhUZVgsEgCLytrQ2bNm1CTEwM5syZg61bt0rFANraIPDFZ59D7pRsa2nF0rR0FBUU4sP3P8Aznoc9OR+bns80YzNMsXtQIKnb29trS/r7+5GTk4OioiLrX7hwAWlpaaisrMSuXbsQFxcHz/PMMI279b133kX2G+sQFxOL+c/NQ3trG36/dBlJixLBkCB7kmHwwQCSMRa6bWBgwNrl5eXYuHEjRkZGoPnQzSwkgsD3p07b447XC5OG8VhdWWWAaqtrDGBPVzfWrM5CWenVv8E9DoNy7eDgIMTk0NAQzpw5g82bNxs4xSkB9vT0+LFKva6OTnx7ONdY0SOPcXb/XiPSUpcYc2SMQFcsz8TtWxUPE0lXT+ipQ/rGIA2pEChLYWEhUlNTLTbJog4iPV8GgW/2f43+3j4zTMBKgIULElB6pcT6zQ+azOXl167bk4Z6luX+RtM3DCBZUWlqarImY3HDhg3YvXs3dADK48ePW0aLbd59eUe/MxC6BwmQTKUvSTNJRmuqqrFyxau4/Nsl0/UTRYZnkJ57tbgs8Vrp6+tDdna2JQMzmTHpFrreN8R3hMnXLLKZ9fpqSxyyeO7sz1ibtcb6yYlJqK+ts2y2R6K74TRtY5DjSg7FmxKDiRPJStu0KXJ03wqrx+tEk4o/TXZ3d6sZMenaUCgpfGjUZ1AImBB0rVzP00Wyyi6JUnFZ9AhG7nWThco6kRZGSvLyV+nq6lLTpDFIhkLdKwYZi5GsLhphUMhxzqNLNUHfk01lsLs4Um26ljaZiIq91tZW35wxSJAsc+fOtcpnbEZGhl0vbEey8pkeHx/vJyq96RbfxRwktYoBxubTKkoQxbw8SvsG0L3nBIpxJ0Ut5JxOyMPornRjmHupKJYkNU6PaR+NzSS9zs5Om1Mmc6G72DVIRcYnY0U6ynz1qaOD8QC6Mrimo6PDx8E5xZw/OE3DGHTH9T7IMZ6U9BMks1qMcc41ThBi2W3rcJTuWiWGa3emtkf6dWIurK+vtxfTgoKCKWsIUMkU6jKx5C4gOxp341kHoa6uMnddaNsY1OOG6Z2YmIjo6GiUlZWZLt1C97kMyDiBHjlyBFzPede4wHGTmcZDwUzX97SYLNIIAcXGxqK4uHg6fR8owTFu8/Lypui1t7f7T6bm5mZfn0ryAO3QW27cTtnE6fgAOUZX0ADvQL6wyjU1NTW2hBvyQ8ot+fn5djXpoDJKACzsKwHZ1zjbilFTnOHHXEx3KB6qqqqQnp4OfiRt27bNLunMzExwnEVACJ7Gcw8dthdQvqTyu4Pyetk1LIh/Hg119dixbbu9B3665xP7M+mj7Tuszy886oYrBpDgFPh8cPNVPyEhAY2NjZZA+/btQ1ZWlrG3d+9ei1E+XWbPisazUbOsRnkeWN9+8y0kzI/H3JhYJL+wCJW3KtBy/4HNZSxJQ3PjfZRfLUN6Siru1dXbiysP6ma6G+/+NUMlFl4zCxcuRGlpqX84xidBl5SU2BhdRtb5kZR74CAGu3sB3s+TtaOpBSnJi/Hnr5eA0XF0NrciM20pLv9y0XQaqmqwMmM5OlvbfBYJiiBVZdzTg5kgaLShoQEpKSk4d+6cdCwu169fj/PnzxurmuC/CPl5x3wX6++2G2XXsCJjGW7fuGlztZVVWDBvPu7W1mF8JIDB3j4s40f9H3/6ALknwdGTlCr/YLClpcXijlKsMklWrVqFiooKW6dsZMYfPZyL9uYWBCf/7u1qazejLyUlG4CJwCjamprBPl3L/oO797A4MQmVt+9MAUgWVX2ANKZs5WB1dbXFG9lSbGzZsgU7d+7UGpMC/8Op08Dkx5IFfRC4c/MWXstcgUsXLhqAuqpqLE9fagCpU1F+wwCXFF+x/3HoOZc115DPoJCT4pMnTxqLUVFRJk+cOOGv4WaMQW7IsFDm0r2BwSGLq3Vr1lpSxEbPxv4vv8KSl1+xPpOIIcFkiZkVjReTkm0PkqQk9Q1NNuyjSa9YmtSTRa4kEG7AbNcDXpKM8CNc/yroL7fB/oGH7pv8B4H/xfAzU5+p0qONx2JQLtNFSjAc0yXrgiXbKp3tHQaEH+0CKckkEhC5n2Nqk3V5TvuFSt/FoROP3dd/LP9WhjH0PwAYhoEnnf4LvWniWgxU7tgAAAAASUVORK5CYII=)
(C) ![](data:image/png;base64,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)
(D) ![](data:image/png;base64,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)
Answer Key-
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)
⇒ 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