![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 Ram got twice as many marks in English as in Science. His total marks in English , Science and Maths are 180. If the ratio of his marks in English and Maths is 2 : 3, what are his marks in science?
राम को अंग्रेजी में दुगने अंक मिलते है विज्ञान की तुलना में यदि उसके कुल अंक अंग्रेजी . विज्ञान और गणित में 180 है और उसके अंको का अनुपात अंग्रेजी और गणित में 2 : 3 है तो उसके विज्ञान में कितने अंक है?
A.34
B.30
C.28
D.45
Q-2 In a town out of adult population 45% men and 25% women are adult population. If it is known that a man cannot marry to more than one woman and a no of the woman can marry to more than one man, then what % is the population of married to total population?
किसी शहर में वयस्क आबादी का 45% पुरुष और 25% महिलायें विवाहित है। यदि यह पता है कि कोई भी पुरुष एक से अधिक महिला से विवाह नहीं कर सकता है और न ही कोई महिला एक से अधिक पुरुष के साथ विवाह कर सकती है। विवाहित लोगों की आबादी कुल आबादी का क्या प्रतिशत है ?
A.39.14%
B.36.45%
C.34.13%
D.32.14%
Q-3 If
, then the value of (x+y+z) is
यदि
, तो (x+y+z)का मान है-
A.1
B.2
C.3
D.0
Q-4 Three persons A, B and C whose salaries together amount to Rs.36000 spend 80%, 85% and 75% of their salaries respectively. If their savings are in the ratio 8 : 9 : 20, then C's salary is
तीन व्यक्ति A, B और C जिनके वेतनों का कुल योग 36000 रु. है, अपने वेतन का क्रमशः 80%, 85% और 75% खर्च करते हैं | यदि उनकी बचत में अनुपात 8 : 9 : 20 है, तो C का वेतन है ?
A.16000
B.15000
C.17000
D.19000
Q-5 Cost of two articles were in the ratio of 16 : 23. The cost of first article increses by 10% and that of second by Rs.477. Now the costs of two articles are in the ratio of 11 : 20. The price of the second article (in Rs.) in the beginning was
दो वस्तुओं की लागत 16 : 23 के अनुपात में थी | पहली वस्तु की लागत में 10% की वृद्धि की जाती है और दूसरी में 477 रु. की वृद्धि की जाती है | अब दोनों वस्तुओं की लागत में अनुपात 11 : 20 है | प्रारम्भ में दूसरी वस्तु का मूल्य (रु. में) था ?
A.1268
B.1278
C.1219
D.1234
Q-6 P and Q can do a piece of work in 8 days, Q and R can do it in 24 days, while R and P can do it in
days. In how many days can P do it alone?
P और Q एक कार्य को 8 दिन में कर सकता है, Q और R इसे 24 दिन में कर सकते हैं, जबकि R और P इसे
दिन में कर सकता है | कितने दिन में P अकेला इसे कर सकता है ?
A.12days
B.17days
C.10days
D.19days
Q- 7 If
and
then a2b2 + 4a2 equals
यदि
और
तो a2b2 + 4a2 बराबर है:
A. 9b2
B.3b2
C.4b2
D.0
Q-8 Let ABCD be a quadrilateral. Let the diagonals AC and BD meet at O. Let the perpendicular drawn from A to CD meet CD at E. Further, AO:OC = BO:OD, AB = 30 cm., CD = 40 cm. and the area of the quadrilateral ABCD is 1050 cm2.
मान लीजिए कि ABCD एक चतुर्भुज है। विकर्ण AC और BD बिन्दु O पर मिलते है। A से CD पर लम्ब डाला जाता है जो CD से E पर मिलता है। आगे,AO:OC = BO:OD, AB = 30 सेमी., CD = 40 सेमी. और चतुर्भुज ABCD का क्षेत्रफल 1050 सेमी2. है।
What is BE equal to? / BE के बराबर क्या है?
A.30![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAABKElEQVRIDe2TfQ2DQAzFzwIasIAHJKABCzjAAQ5QgAIMYAAHeOjyY+ml2+5rCfyxZE0IR2nfa197Tm42dzO+/AmyCmcl6rpOnHPZJ8aUJWiaJpZb5E8SrOsqfd8XAcWCkgTDMMiyLLHcIn+SAHmO4/BA8zwLPp0J3dn/PtAcogQkWv3HcTy/930/0yGDCH/KogQA5JIpoG3bFP7zJm/b9hFE+yG/DazrWphTypzuORtjjeSUTdMkxBTNgECI1Kg8tZ4UU1VVtkPwzhnowHSAVIcvZJCju8aGYqzPD5mKVE8AQq0D/i6L7dwC69kTsDGQUJldTw3UtbWDR6qiLQIEAAhI0E4UnDc+vWD2XUwACIMl+X2jLNG3Zy8RichDF1faC8GVwIr1+wQP/JxPVYl+7MkAAAAASUVORK5CYII=)
B. 50![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAABKElEQVRIDe2TfQ2DQAzFzwIasIAHJKABCzjAAQ5QgAIMYAAHeOjyY+ml2+5rCfyxZE0IR2nfa197Tm42dzO+/AmyCmcl6rpOnHPZJ8aUJWiaJpZb5E8SrOsqfd8XAcWCkgTDMMiyLLHcIn+SAHmO4/BA8zwLPp0J3dn/PtAcogQkWv3HcTy/930/0yGDCH/KogQA5JIpoG3bFP7zJm/b9hFE+yG/DazrWphTypzuORtjjeSUTdMkxBTNgECI1Kg8tZ4UU1VVtkPwzhnowHSAVIcvZJCju8aGYqzPD5mKVE8AQq0D/i6L7dwC69kTsDGQUJldTw3UtbWDR6qiLQIEAAhI0E4UnDc+vWD2XUwACIMl+X2jLNG3Zy8RichDF1faC8GVwIr1+wQP/JxPVYl+7MkAAAAASUVORK5CYII=)
C. 40![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAABKElEQVRIDe2TfQ2DQAzFzwIasIAHJKABCzjAAQ5QgAIMYAAHeOjyY+ml2+5rCfyxZE0IR2nfa197Tm42dzO+/AmyCmcl6rpOnHPZJ8aUJWiaJpZb5E8SrOsqfd8XAcWCkgTDMMiyLLHcIn+SAHmO4/BA8zwLPp0J3dn/PtAcogQkWv3HcTy/930/0yGDCH/KogQA5JIpoG3bFP7zJm/b9hFE+yG/DazrWphTypzuORtjjeSUTdMkxBTNgECI1Kg8tZ4UU1VVtkPwzhnowHSAVIcvZJCju8aGYqzPD5mKVE8AQq0D/i6L7dwC69kTsDGQUJldTw3UtbWDR6qiLQIEAAhI0E4UnDc+vWD2XUwACIMl+X2jLNG3Zy8RichDF1faC8GVwIr1+wQP/JxPVYl+7MkAAAAASUVORK5CYII=)
D. 20![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAABKElEQVRIDe2TfQ2DQAzFzwIasIAHJKABCzjAAQ5QgAIMYAAHeOjyY+ml2+5rCfyxZE0IR2nfa197Tm42dzO+/AmyCmcl6rpOnHPZJ8aUJWiaJpZb5E8SrOsqfd8XAcWCkgTDMMiyLLHcIn+SAHmO4/BA8zwLPp0J3dn/PtAcogQkWv3HcTy/930/0yGDCH/KogQA5JIpoG3bFP7zJm/b9hFE+yG/DazrWphTypzuORtjjeSUTdMkxBTNgECI1Kg8tZ4UU1VVtkPwzhnowHSAVIcvZJCju8aGYqzPD5mKVE8AQq0D/i6L7dwC69kTsDGQUJldTw3UtbWDR6qiLQIEAAhI0E4UnDc+vWD2XUwACIMl+X2jLNG3Zy8RichDF1faC8GVwIr1+wQP/JxPVYl+7MkAAAAASUVORK5CYII=)
Q-9 If each interior angle is doubled of each exterior angle of a regular polygon with n sides, then the value of n is
यदि n भुजाओं वाले एक समबहुभुज का प्रत्येक अन्तः कोण प्रत्येक वाह्य कोण का दोगुना है, तो n का मान है ?
A.4
B.5
C.6
D.7
Q-10 A mixture contains milk and water in the ratio 5:1. On adding 4 litres of water, the ratio of milk and water becomes 5:2. What is the quantity of milk in the original mixture?
एक मिश्रण में दूध और पानी का अनुपात 5 : 1 है। 4 लीटर पानी और मिलाने पर दूध और पानी का अनुपात 5 : 2 हो जाता है। मूल मिश्रण में दूध की मात्रा क्या है?
A. 20lit
B.25lit
C.30lit
D.40lit
ANSWER KEY
1. B
English : Science = 2 : 1
English : maths = 2 : 3
so marks in science = ![](data:image/png;base64,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)
अंग्रेजी : विज्ञान = 2 : 1
अंग्रेजी : गणित = 2 : 3
गणित में उसके अंक है = ![](data:image/png;base64,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)
2. D
3.D
4.A
Expenses are respectively= 80%, 85% and 75%
Savings are respectively = 20%, 15% and 25%
But given ratio between savings = 8 : 9 : 20
Ratio between income = ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAL8AAABACAYAAABLLqbKAAAeFklEQVR4Ae2dV5CdxZXHhUBkG1y2MRhYQCinERKwSHYV3t0qzApKICExkqxIkJDYWkyGZbFhMby4/OKy/bB4d6tsgggSCDDRgIkC5Zxz1mjyzJ25E+49W7/zzb/VuppwYfdhZrhddaf763zO+Z/Tp/vre6eHFUKBA99QDvT4htJdILvAASuAvwCCbywHCuD/xoq+QHje4K+srAzcqqioCOnm5uaQ7g4J6Kmvr3dS9u/fH0iK6VR5nBcqdsJENpttd1aZTMaghQ9pAumGhgZPp9Pp0L66ujqkxYeQ0cUSeYFfRMKQqqoqJ7G2ttZj8rp6gIZUKhXIaGpqCumamhpD8RsbGz2PZ+rHdULlTpwA1PGcoQFQQ5cAz/RjWnmW7KmDzCV3yrq67PMCf8w0gQRm1NXVWUdWpRPj4bipxXSWl5cHwKtibAHFh64CgNbAL9mVlpY6iTEtWHgpPIXIWgEDWFJSoscuG+cFflEnJmH9BBTFqtMVY1k+rJrSArosJHRp1dPSL7egs9OcKyPRmDtvARyliJU7pld11Db3WfldIc4b/Pfcc4+dfvrpdtpppxnp7ha0vEOXQA5oHnvsMae5R48e9vzzzweypRyxdQyFnSyhuTIt5iuLj/Ju3brVevfubdD37W9/25YuXRoMG/UxdK+99pqdccYZdsopp9jy5cu7vLsj8eQF/l/96lc2efLksAl65JFH7NFHH/U+4o2wOu2KcWwdAT/W7g9/+IPdddddYcnv27evPfPMM05eV7R4rGLxvHft2mUvvvhi2Ni+++67rgSbNm2yw4cPO50bN2406N67d68bBRRl/fr1rhQoUsy3rib3vMA/ZcoUe/PNNx0QEPjll1/apEmTnNbYqnQ14jVfAQKLKJdg+/btdu2117pvKxo3bNhg5557rsn9o35XsPyiE6DGfv2+ffvss88+C3mHDh2yOXPm2B133OFNqHvbbbfZ559/HviyZcsWGz9+vLoMG+KQ0YUSeYH/1ltvdSCIrvnz59uiRYuCe6D87hDLj1+xYoVdeOGFwfdFQQD/ZZddZsuWLetypEqpNXHojPNkwR9//HH7xS9+4dVYGQYNGuQnQLiFGIGDBw96HiuBjID67Gqxg18+YGuTpww34Ic//KHdfvvtnoY57bVprZ+O8mR9FVMfAeFzEmKLpbEF1HzKvZN2/jCO+gMIn3zyifvCWDqFsrIy69Wrl/vJ5MX7BNVpLaZfzZly0US6NdcBWuN3KepTAFU7YvoVz7QK6Vnt4mf6BvR8cvuDHgzdp59+6mWrV6+2fv36hblQn0OBkSNHuuvDc6xAGq+1OHaPGUdHppoDPFK6Lb5KPooZW7RBF/QTw5OY363Nh7y8wM/E161bZ2eeeaZdfvnl4ZiLgWNBtjVIR/kilskzaVmYuJ0IhkGtCbmj8riv3LQ2uOTTt/oaNmyY4fKJxpUrV9oFF1xguEQEuUO5/eU+CyAIXH3TVn419REafIiFJsAIFPF4Mc/i8VBQBQFMz8hLcyFP/ZJmfNyg+++/33lA//j7gD+33kUXXeSrn4Cn/tuK4zHjOhwni15oY5yYRuqSJz7wrFMo8oWDuE+l2xpT5cR5gZ+KWHuEzjI4atQoiy1i3OHXTbPBjJkMUyAUIgSYmFilEVJH5fnMSeOJ0Yy9c+dO+8EPfuCnXJyG8EHwMWgFwo7GaEsYgE5jqo+4/1zaAIcAIh7gfsQKTD96RgGUVv/E9MsHnjM3FPzpp592GR85csSrsh8YOHCglwFU6hJ///vftx07dnidfBQgrsNY7C3aCqKJcurCH4JoJq080tRvjbdxHe+glT95gf+pp56yV155JYCTk56ZM2f6CUCu4FoZI68saTSCEvNjogQCBC3rpjwGULqt8vYmgYsRK17MaOZFOSB66KGH7Nlnn/WuEGgs1Pb6pywWRgxGKU9cLmsoxZZvHc9L9IoXjCFjQRowx5afPumPOmqrOZP3zjvv+OaXPOiiLSDF0LEiKGAAhwwZ4uCPgary1mLRE9dnDro+ovmoXPPO5Y34IFwIe8hOY1Cm8tbmEuflBX6I5XxXAGHTc8MNN8T9/J/T6lsdxcCCMDFG5cS0EeHtlcdt2koDLDETpjOmXu4AzI8++siuvvpqz2csCSwGZFt9K5+6Eij0xeMJ/GwkFWQE9My41OMT8wuwSAkoQz4EQKB+AbjSlNEXH+aBb693GMwP6757926f35gxY+yvf/2r94cRoN5NN93kz1+FdtHtDaM/9CFjAM/jPmMMMFcF6I2flS+c/L+Cf/bs2U6wfF/OgWEAAmhtEprMV4kFJjECZgkc9APBEBeHmDkdlcftWkvDdIGDcQALgZiz/u9973sBuORjtWJBtdan8iQM+s/lV0yDaKedaI/z4rrQq5DLO+Yf0xIrCuOLNtqvWrXKTjjhBDvppJPcrcO1GzBgQFAmlIDjTs1j+PDhvhfIHVNzaS3WXCijH/ih+YsfUg7mJoNGfRSRINmLL3oWJr1Si8KrTHltxXlZfpg+ffr04PuOHTvW+5O1aavzfPNFEJaFcW655RYXnoQt8LA0y/fGEhMQQkflHc2DcRVgHP3hd3/nO9+xnj172m9+8xsV+7wk+HyZjPBzAUiH7Jt4W37NNdeE/kmo/4ULFwZ6//a3v3mdWIHee++9UL5mzRovV1seqAst8dg88wF0+Pi8uYWnp556qisBMWf9BOoByj//+c+hjJOgGMxesYM/AjZz01zmzp0bjs+VJ2MS042hRVEYUwqDC47CMm8OIcBPLAvmnU/IC/zqSJ1CjAYTQFXn68YHDhyy0aN/bD169LRrrx3j3WDom5oSQlatWmN9+vSz0tJyq6qqsaFDi2zdug2mxQAL1qdPHz97xroMHTrUT6g0z47mJcbH9EhotEVAKkOI4kUiOObYNsM1x1QqOSunv02bNlhx8UQX4NSp0626JmXxurZ8+Uq79NJLXRFqqqrdz16/dl0gA3707dvfSkpKfQXCWvPykSBlFliUFyuGOhKNilEK0aZYPJSRoi10q1x9tRfX1iYX4w4fPmJXX/0PLmfobmxstubGJoP4dF29LV+6zAb062+11TVWV5uyIYMGe54zJ2u2bMlSGzxwkJWXlllpyRG7fMRINyLxCsDcNOf25uTgp0JrDNOSREftferrk3vfAir9pdOJjwZxhMrKo/fAlQcYPGTNMs1mTY1mryx83Ypv/pk1NmT9k82YNaQzNmXydFu+bLUzCUaQnjxpmtWl8L+b/EiSfYkCaa5kCLDkIyzRSb7oo0x+MmmBBoVoj+6kDPq4At1kzU0NyfwyZs2wBH1oNsvAioxZbXV9IuR6XCquBtTYgoUv2OQp062iuoGqLuOa6rTNvn2eff7pYs/INjbZujVrbfKESVZVUe19TZ86yxZ/vtTL4fvixYv9rbtcmlhZYzqlAFJ2eNIxjUd9cfHmGJ5lzY6UVCSTzybyqq9LAK0Ywkg3w6qs2QvzF9hN44stVZM2a8x6Xumhwzb39tm2/MsloS/SPyueZI119dZUn7Z5s+fYR+9/YNac8TprV66yKZMmBzcRWhKDxAzbDwH8cTUIFFDyWeJYZWpqjt6HB4yEQ4dKbOLE4gB8wE49rMCUKVO9jq9QmLwWBXhl4Rt280TAb4FRB/YfsUEDi+zggVJL12esIZ21ksMVnrd3z0Fj1eAIFgAjVATMlVvytIGU78igMRh4jhVEFpB8Ackn2uafjDU1YtUShJcdKbWx14+zhrqMNaLbLYvCmpWb7IH7HrYsQrMmq6ri7kydvfnWIhs3YbLV1LueWLrJ7MD+MhtedLnt33XAM5vTDVZbWWVD+g+2Pdt3W8mhMhsyqMh27zpg6frEuOCmjRgxwnnARl0gZxWMaYotJCTla71jXsT91dWlrbKi1uU3flyxIau6VAL82poGO1JSaXfO+7nLC5kiP2T98kuLbOKEKcFAwKfdW7fb31820vZs22GNtXWWTTfavh27bMSQYbZj0xb/XDl8hO3dvjPwteTAQfvx6B/Ztm3bgoQAfz4K4OCHGDFLjWQhQ495JLD2AL65+egCjsW/4YZxDni62Llzt82de2fozV2CFvDDlIULXnOLgFBZDchbv26zDRww1A4fKvNn8irKa2zQwGG2ZvUGW79+o59Hx+fjzB/w4wtLgXGN8BM//PDDYCloo80cPJBikJYihcm2mkjAXFnB/fZEsJXlNTaleLplm8zSKbOK0pTdNuuOMPfaGvYYfDuqzl586VkrnjrTqlIJ+CF53dqtdsH5F1tDbWOSmTVL4fr0H2xrV6yxTRu22uCBwxxo8AIAEnB94qsXH3zwgfv0XEUBvAKtZBtb8VZJa8nM5QU8El5wQZkD8mIVvvan1wc6N2/abvPm/qvLijr6sKo//Z//YzNn3GZVKA4sRM6r11i/3pe6oltTc9JvbcpGDCuyLRs2ennfS3on5S39sVrgGnEdBatPQKElx/boOsbyaykUc9prGJex7MZuDdYcgaAMzKe8vNJmzJhlX3yxxO666+6wSlRXs5HJursjxgD+cTdOdGbiBpG/ccNWu/iiPpaqbTDcIPJwhS65uK/7/Rs3braLL77YBSwGIJxLLrnE/X7mGlt3nVtLgJSTRgnUPqav/XTGKsoBPqtdxlI1tZZtNtu5ba/dNmuerVq+waYUz3QBN9S3+LdeN211daVu+afdMtsOlqfd7QH8iz9fZoMHFVma5QCXIJP1Zf+SCy62DavX2+aN26xP7/5WX5cABB4Cbq4dcC0DkEv4KD5y1bNkLODLMLRP47Gl8AheiX9ybQA1q8CYfx5ry5ausgcfeMQVAnmVlVZZ6ZFKlx1GDff2jjn/kmABNzHdYKuWLbcrLhtxDLjLS47Y0IGDbMWSpbZy6TIbPmSolR0u8X7ot6Ks3IYOHuIbX2hkbvmuZgH8MeBl/bXB0TLSViwfHncmEUTiy2svQLx37357+un/8g0OSiFrhXIAZAjhA1Mm3DTJFQIm8Vm6ZKVb/j27D4R6pAf0H+IKtXTpcrf8e/bsCVIijSX84osvAvBhjGijIoKH7jgPl0GA0IrQFt1JPs594vM3pOvC/LBmO7bus8cefcqBX1OZ+PvQWJfiq6BpS6WO2GuvL7QJk6dZaU3G6nD1OH5cud4u7d3fGmrTwbfdvX2HDezbz5YtXmpLv1xhQwcPtwP7W0Bg5qdT3/3ud23JkiWBBwK8MqAfxYjppax9+hIXVryAN3r/obbQhGGSsUIZHnrw350XyLamZa8jGRO/8/b79k//+FNzjEB0c8bw3/tf2seqysrNLX9Ts+3btdsuufDvHPgb1qy1Qf36G65OpqHRjULJocPWp/el/q6C+TC/XPpEf24cwK8GJ598sh/vcZSkLzmceOKJ1t7nzDO/7bv3b33rLI8Z5MiR5I4JKwIAnzXrVnvhhZfsoYf+zTeo1NEJgNwbmILlv3nilAAiNkhbt+y0Ky4fZfv3HQ755BUNY6e/zS+aXXHFFeGNIX3zJY2ioqJwDQNrIFBDq3xYAEE+R5q4RJwYEcef9minrNdJPe3Qwf0+N04poKOmqs6mTZll2zbvssk3T7MMGApLP0san3rf8F4/bqKhQo0Zc5+fzWO/fgOssvSom7d98xYbWTTcdm7dZps3brErRl6VgN/3JsmLqcGDB/v1BMkSPsiAbd68mUcPgJcvJkEjdHdEX8wL0uIRbeEdBk8bWeY+qXiqW35cHtGMW4Qi4LriHiFnVghCYzo5KADogB9XRu0O7dvvln/Pjp12eP8Bd4EqjpS6cnAQsGvHTjdy3ENS0Oqm57biAH65BWyIWM5gmiwHwGn/k5zuCMwM1uJ+uTt0zTXXmk52tm/fabNn3+ErAPXiEyLSzz0338aNS94gxuVskNesWeeWoqyswj788CMbO/bGQBcX0PDvsWy8f8Cv1/sIKgkEpOX7ks5dIuN3F1KQ9mnHD8tYY8NRy16P73vNdVZdUWdV5SnD6t99131WXVljleX4+2gCS3SdvbroZbthwiQHPwYQBQAk9957vy1asNBBkKqqtI8/eN8m3DgugKK4eLKtXbPRcB0Jv//97/3WLYJHoeXWeGH0R8CIFaRj+o7d/Mc8Utes5MgfmXCcScDdnTZthmMBV1geAmXz57/orjBtMi3+PUebd9/1c3vjtdcDnfOfe95mzZhpHCTg4tx79z323jvvhvJXFiw03hloZaJv6IEHHYUAfirCEIFBjaUU7XUkFwYCY9+fzS1nuQI+88FKsEm6/fY5Hsf9chL0xz/+t40Zc73Xoz4uEp9t23aE838EXlR0mXEWDkMRKLt9vnxCwLJh9TnuRIH5SNgxk+LrA9QRzXH93NOReL5KZ5qTkx6s1aEDh+3GseOMLE58yEMZDh8ssXt+frcrSlMjG9Qmy2bS9vh/PGoTp0y3kqr64PPjN69du95mTp3mvn59TbUVDR5ka1asdKDUp9K+4l035oaWPVW5n/Twwkd0MrfEKh/rBkjxxQfRLFpai8UD+oY3BNopzTNAv/HG8QHgUkry58yZG7pFXpwGPvHEkzZ+/ITEC8AVrE35SdiKZcvt1lm3eHrv7j02+qpR9tknnyZgz2Q9PWPadH83sH3rNvvRqNF+L4kBoDeeUxi0jYSDXwwgpgOCmCSrELcnTxZEsRQNoOuoUz5/3LatNKdEvLjq2ZPX7D3tvPPOd8DH9VkVTjyxl+FmvfXWO16kcXl47rnnfAnn6vVbb73VUp5YAFYzVgaW+z/96U+BSeTLh4V+KT+NxQPSlGFN+cR88vrBnYldm2PTFWXJZi/r/k/G9u/bZaOuGpm4VyecZAOKrrAVqze5AqAwKPz8Z56103qdZGefeYa9+doiS3b7LfsjM3cjE371OOa0Q/PlBAQ35fXXXw+WEWMW00VdAKPNq+QvPgB4rZrUi5WLZ3iRb8DwcSyN4Tr99DNdzuecc67t2bXbGurTyTFwJmsLXnrZTujRw07pdbIt+eLL4BbBF1YJynudeJKddsqp9uXiL/Id/rh6Dn5piwimlkAdtxCD4jyYwdIFYX5m7xqYdQWIl7m4TW4aQecGXCD4Sqw0dXL7RMGYg4QgWtQfgoYWuTDxddp4+aZcSkBbpblJmAsW9R1WjjzAj+D4lJWWWKIATbZv785kJTCzvSWVDvxUQ+JD+xjZjDXWpRLQc8yVzVhzut6BojnAG4X40CJOx+84Yhkjz1x+Se6UxUrOGOIJaSlJrAyaR2sxK4H0BO9AWPG6LbzxdyAtafYBvMUV34j9TXAmeSFGOW6Ql7c2YB55we2BWJbCmBnkiUj6SoBeG76+JkBpnFxgkn8MkarYSiwflVhMjvsnzdyYD0JBiF+lXEJlaC3jculk2SiTEskt0FQFdMZVO5XFAmot3cibqxahJi4PgG2yTDPuT6bl4DM56WlowTK8rqlAuBmzprRlG+sN98ef3ZXiiynJ3gqeiD7aCZDkxfKL08xdbeC3eK48yqU0MX/AxHH0B0a0nUCu8E5zQ3bwmnEZk3LNPZYrZZof7XP5r/7aHrntEgc/YIgH1DeVeGOonT7+swBKd7ThqivlJ5xwoh85ys+Tu+MvQNoeO5TIyoSMKAFxAmSUHZJShpCRk5DAVQ86c+lQE5SLKxF8CIwdgwGf+sorrww8ue+++xJj0QJsAfy4uMVapetTyRUIf6uTMV52sfrwkpbTHhzOipqjtzX9CAXwcz+CN2akm5sS94AxWwnQEBswVYEW+KxAOgYOX1rRzU5ejimIV7w9P+ecc5x2vuBz7733tvulFLUnBrAaW7H6VT3l84y8RYPkp2fV19xVrvyvEgfLTyM0WkDjtqGsAScnHIdxf0SBt6VsKg8cOOCXq0aN+pHt2rXnmE2slEFtOopRKI0v6wLjFGAAz8QwTwzoqFxWRvWI1b+Yh5XjIhl7glmzZoUrvdRlToz18ccfB+DDD77Q7qEj8DtQMw583xxnm+3oCmBWXd8YwI8CaM8E2FNVnHmnrbGuJrkwhBJYxl0n3DHmxUe8SSaUAI68XB6JHuimDD788pe/dCBDJzdnudn5/vvvH9OWZ92kxODx5favEwRyyZExhTvmRLkwoP6Vp/nGmJD8VPerxA5+DUYMULirzj1uLf0oAXf6H3zwQS9nQH7egq+5EcDnp59+7rt9Tn50ukN+EGQHs9IcIExpiOVZDIu7ENFY5nzLAYNAT7vYqqvvBQsW2E9+8hM9hhjF/O1vfxuemaNcoeMsfY4yHAU6ipx8PC+bCBs4Y5PrGjNu/ZM9FNYevwaLf/TTnE6Zv0yz47+xBB9QCD6t8SRMviUBDbzt1lcSyYav/CwNsiaAB+QfX+smX3sK+NJR0Fzgv+RGG6UZQ0GyRzbKV3vqSJnpq629mPrqKA6WXxOhgTRLMXl33nln+EkLCOZnPeI3qhUVVda//8AAfFl9bXI6mkg8vupCYBwgHIbwERPELOp1VE5d+ozbwOR47L/85S/hN4nY7GocrgvzhRasHquegtMJ2MF0Duj9OQI7tz512iMloJ/KVNp4J16VSq44kJfhVCjTbE31tdZQV2XWzHuEFiVQny2/poCcBHrNS8+SIUovWhRTVyAmLVfkgQcesCeeeEJd+X2h888/32nXBbK4XajYRkJzUDHPuYaH+eECxjKHBrVFATDGeqavmA71/VViB3/cIcCQpkm7ABuWnl9wIM0RGpfG5BZh4Q8ePGxXXTXafX8moLP/+DSirYkJfDExMXNULuHQj7SeuXZUTv3cH1YVjXFf9MMx6PTp3DM/qnjMq7i42Jd9vQnG5w2hNdCT1wJSYllr0v5CrMV1oRYnPFj/2nST6wtzS2SCRiWA9ysR2SZ3l7SSaBUL82hx51rLj/kpxVA78Y9n+ITLi6srHsyYMSO4eyg/ykFobRz1mRtrfPFdmGMMMBfLPu6XctrGc8T4qp+4Xe6YHT0Hy09FTUgdC9wcD/JVNk2Am4P8ikF8B57bkXzZmU2h2ivuaBKdoVzKxA9yXXfddWFKMXOhh70BP+8BCILPH2p/vUSsO8f3cNRVSpTp+Bod5Uiu1IOemKbYupKPG8QbU9pI3lIC2t98882+/+MbXV09BPDH2gZReoYhLIG6CYkWstnhS+0EVgIsMnuE8847z9+qCvRotDS+szNKc3777bfDz/HF7lGcRumffPJJe/jhhwNAOjN90BYDPneuUg7i3/3ud+FqS9xGv5xAW37VjU2y9oS5/XWVZwd/LFhpuzYyr776avh6HEDHUuD38bN98Ten+NIIefouKQygL/XXmRkiywbNgH/ChAmu/CguAIjpkFHgUIB9UFcJMQ3IG1pZ2UU7afY7nOjJvdRLwFiGuEXs9dgQa7XsKjzInaeDX1YPYUOQrDU35fidGiwCIOBUgKNNAn7x2rVrHRgwhC8dy12grhgYK1bu4J3lORYuVySmTp0aXEDNX9ZRvOGnvFF+5XcWWtqaBzQCdNGTW4+fL3n55ZeD7HF1ed8j5UBZpPgoiNzbmHe5fXb25+D2xK/9mTRfisCv5cM1Z+LRo0e7xcDqsfllEwjIATt35/mmvawFq0RXCvJ9cWf4vUpcGykwdAAa7YG4Ls0BAHR3hSDAo6gCs+aNvJAbv0GKjM8++2yP+a1+neaJbtpw0sWv9+kAQcZA/XWl2MGv77lCJBrOPyOAEWeddZZ/+KcEPM+bN89pkwV44403PJ8yvjRCkDKQzmW0V+iEfwAx/iu/zQktfHiLCT8QLiCAF/xjDsrYEAKo2A/uhGSFKcVKyiovaw2AkRs0YeD0hpefbPn1r3/tNLL68/OE1OHFHr/XpGsPYYAumgiWX+e2Ajb0AGSEHDMvTquNln65T7RTP2J0Z+ePaNA8oUX0xErMChFv9HLbqX1nituzzqIFo0egLjKO7/OQD90CvVYS8oUBb9zF/gTwwwQBO7ZoEi5MiUEQM5Q6Akq8RMZ1ugJfpLCaq2jnWfSpDDAQxDPld+ZYhgw5xkYp10UV3aJRz9AmBSAtxenMNLc3twD+9ioVygoc6I4cKIC/O0q1QFNeHCiAPy82FSp1Rw4UwN8dpVqgKS8OFMCfF5sKlbojBwrg745SLdCUFwcK4M+LTYVK3ZEDBfB3R6kWaMqLAwXw58WmQqXuyIEC+LujVAs05cWBAvjzYlOhUnfkQAH83VGqBZry4kAB/HmxqVCpO3KgAP7uKNUCTXlxoAD+vNhUqNQdOVAAf3eUaoGmvDhQAH9ebCpU6o4cKIC/O0q1QFNeHCiAPy82FSp1Rw4UwN8dpVqgKS8O/C8a5f+BgLa37wAAAABJRU5ErkJggg==)
= 2 : 3 : 4
C's income = ![](data:image/png;base64,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)
व्यय क्रमशः हैं = 80%, 85% और 75%
बचत हैं क्रमशः = 20%, 15% और 25%
लेकिन बचत का दिया गया अनुपात हैं = 8 : 9 : 20
आय में अनुपात = ![](data:image/png;base64,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)
= 2 : 3 : 4
C की आय = ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIYAAAA5CAYAAADz5VMxAAARTklEQVR4Ae1caZCU1bluCerVAJZcl5TsyyyAIDCswfwUMVW4YJBVDBLMRlCTi6RuyDW53txrpWKV94dF1YWKpcTcKCJ6FVAIBkGWMCwDDJswjAyzMPt0z9LTsz23nrd9Ps+03dPTdP+x019Vzznfec95z7s85z3v+b4PfB0dHejs7ESsq62tzUjt7e0IBALdutXW1na7z9ykjwV8XV1dX9GGbfqRePr0aa9Pc3MzCKbW1lavLVNJPwv4XJUYORRBWGeU0MX2qqoq3VoZDVTdOmRuvrYW8CIGnRxtS8nPz8fy5cu7bSMETFNT09dW6Yzg8S3gRYzICBEKhXD16lVkZ2fjscceA+/549XY2Gil7uNPk+nxdbOABwxGDG4XvAiSkpIS7N+/H6+99hruv/9+aycQGC0yW8jXzc2Jy9ttK3GHFxcXY+fOnXjzzTexZMkSA4MihLaRDEBci6VX3YsYLS0t3kmEdUYKnjy2bduGBx54wIsmihgESbScJNI8bgLr1tmP8/DiSYcX6e7xWBGMdOVA0U5DopOHxrigjUe3yZP4Iz04t9/v95J2LiDJo0XFaagjbcdScpIuO7iiJEt3eSVS91EpGZslf5s3b8aZM2eMz1tvvYUnn3zS69PQ0JAIf68vDSRgkIeMqQ6cNxgM2i1LGVRjVLKD+rr9XKOSLoCJTyy65k+2JCDc5zwuEMg71kIiQCivLkVjykudk6WLb6KlRQwKpqNofX09Dh06ZI5h+/bt23Hfffd5CScnoNB0imuIWBMT8XV1dUZ2ncsGjuccLthomEijylgcI0BpJbHNdbr6utEsHt2Eu8Y/1MGdi3XaRtGAugiknIJ19lGb5GU/VyeJkyxdfBItfUQ6Lwm6evVq3HXXXbjxxhvh8/lw/fXX44YbbrD6gQMHPP6RTvYIMSpauVSehmGpNg7hSUcy8J51goBG5iXwsJ1zK1pojPQgbxqZ9wRdPLoxT8Efyi8ZyU7gpgy6KAvl4yWAsy59SJNebOciTQXdmCT4xyIGBZKTWOejbt2//vrr9hxDSlPRWBEg2tylpaVec3V1tdXd1aFVoujDeSsrK70xAgYbOE6A1JGZpWRVyb5aafHo3kRJVDRXJAuBQDKT7gJCdUVr0gVwV5dk6ZFy9ebecgy981DIpbPkEJ5KmGO4womxnKn7nkoprNLtW1NTY7dcUTKIQCTgqD/BQYPT2O5qJJ3tlJs08okcG4+uORIp5XyO4Qp35aLjKyoqjJ3bTzpSPrW74FKdZbL0RHRx+3qnEjXK2QqFH374IWbPnm1kOoKCqo+E1thopRtd+LCsT58+6N+/P3bv3m1hXqGeY9mXjt2xYwduvfVWjBo1yhzM+Qio9957z9viysvLvahABzCibd26FX379rVt78qVK17uEY8eTe5E2uj85557DnPnzvWGuQuJduKie//9921rHjRoEMrKyqwv9f3kk09MZm7d+/bts3ZF6GTpnkAJVuw5hiIFxwoQrLPdDYORKzRyRcaaOxBowuLFS1FZGd5KPvhgO4YNG4FgMAR0AS1NzVb66xswNW8Khg8dhkCDH+jsQrC5xWinTxUia9RoNNTVGy17dBZOFpxAo7/J6KdOFGJMzlg0BZqtLXt0DgpPno5LjyVzb9tpr5ycHHMsn/fQZtrmGBloP0bEiRMnIi8vD5cuXfJY034njp/E0MHD0NoSQqChEfd++zv4687dplOwuTUuvaCgAEOGDLEFxcUza9Ys7Nq1y+bQVuVNmEDFIoaSHIUwjtdKJmJ5RQNIW1uHKdBQH3YOndwW6rK25qaw00Otnaiuqrc2f0MYAJVXa/HovAUouvA5wFysE6irrMXdOeOwbu2vvDbRgoEW/PDJp3DkYD7Ah7OdwOmCQjz64Dx0hQB/TQA/WflT7Pv4U2/swb2HsGDewrj05sbws5RoNqOTudoVGV0byD5aHDziL1iwwCIcaaJz5U+fPh2rVq3ypiAfgiYUbMMPnliJE0dOor2lw2Q/efQUHn3we6ZnqCk+fdnSJ3Ds2DFv69+7dy8efvhhb65rrXxlK9G+RrBQeBpFK4CTKKLwPcr8+QsgUDQ3taEx0IqmxhAWL3rCgNBJJxpYCJhwnffVVQ34r//8g9HoZH91Pdb/9yuYek8eqssq0RlsNyO1N4esvHyhGDPzpqP881I01zdaW8XlMsyYPA2lRaW4/FkJZk25F6VFZQgF2syo5cUVmD5xhrXFok+bNB0VZVctV4mMhtEM6uYEtIkLlLfffhuLFi3yAMHxtN1LL72E22+/3dhxjEDGhoufFWFG3kwUnblkMrf6Q/BXBTB1wjRcuViKskvlmDn52zHppcVlmJo3DXxKrfnolylTpoBJv3xlxAT/+BgRxECKKoK4vGg4TqrEibSGhgAeevBRNDW2mpOLL13Bj3/0s7DDGTg6gZrqhi/A0YWW5jbU1zViyeIwcAgSRYDBdw7CxvUbMOWePHzD1weTx09CY13AQMDokDMy2+67Qp3W5q9psD5cbecLP8PYrHEIBloBflfUCXC1jc+dYKuxJ/rJglOumnZqEEiUKDNy6KfOshXBwh+BsXjxYuunPkzqBw8ebK8Vpk6dattNbm6u2ZF9zp05bzKWfV5uMncEOy1yTLp7Mo4eOobPTl+IS8/NHuPxo28o5/jx48G34i4IJVNvSy9iyBiRoKABlAiRKSfj3sX+NEhdbQBPLFuBQweP4OnVv0BjIGhACPhb0MHPOej8LoBbynvvboPP1xf/dGM//PPAO9Ea7EBrYxAF+cdBYCxf+n20+JvNSA9990FMGDMe9VV1OHfqLMbn3o2qskqj0fE1FdXImzAZRw4exdmT50Bj1lc1eHRuLxPHTeqRPuHue5D/9yPe8ZsnoRdeeAEDBw40J950001W8pkOn+cwIV67dq1nD0VXbhtbtmyxd0pKzGmrs2fPYsCAAbbFaFU/88wzGD58uNmPYZ8RQ8CgXhUlVzF98gwc3p+PMyfO9khnDjV5Yl634z0jxaRJk/Dpp5/2FgNR+3XLMdhDK0Fg0F5JIwiR7KfcI9jSjislFdjwP69afkFnMzIQDIwYAora2L5j+y7073crXv3jJnNk/oHDGDV0JGqv1oQd29aFg3sP4M6Bd4C0i2cvYMi3BiNQy4QUYNQgYNh2/HABCo+fxvBBIxCoDW8z7FNVVo1hdw3vkT5k0FBLUCOTNHfrlD24IAgcRVfaQNGT5TvvvIPHH3/cOynRbkePHsXQoUM9w7Pt1KlTBjY+LOQb7OwROairrP9Cb6CytAojBo+0SMd8oyd6wbETGD0yy6IE5eJC5Wlo2LBhNjfvr/UyYEh5PuHkcfK6667DyJEjTYF+/fpZySMmj1O89IyB4OHcy7+/Em/+ZQt+uXadRQY6X9sL6/wxejBqsM5kdOGCpXh36wfo6gDOF57D2KwxYJLZ3tJmRmqorse47LE4tO+gRYes4aPREWwP0zuA6vIqsK38cgVKiq4gZ2Qu2prbbQshMLj/5o4a0yOdJxeeEhRy6ThFTuopx0czrhaGaEw+eSoRcMjr3LlzdmLQlkR70dbjxo3Dnj17zIlZo7hFNpnO3EpYHzV0tEWOyxdLTK9Y9OKiz+1IT2BzXvLmHPQdQZc0MLRiuFI4AZlTMV40Go3lnlg0IfvNnj0Hzc3hk0tRUTGeeupHsNOKRR9m9HzcHX57Sn52RAXw+9//AR9/vAed7V2oq6nHrJn3Yv++A+GVQ/BU1oChvry0wrL3Nb94Drs++qsBiWD648ZX8ezTP0d7qMOOev/y8zV2zGtrbTfwbXrtT1i96um4dOomAFD3l19+2XtWokXBhcJFwR9fGQgUrk34hHjevHkeL9qN9pk2bRoOHz7sPfEsKioC8w2GfG471OHD7R+ZzNTlrb9sxqqf/Mx0oi7x6Dzt8LkPZadfKAfbXNkE3kRKL8cg2rRy5HgCRqCRomLOPXPp0qUeKBg5Ojq64Pc3YuXKH1rJvu3t4XcDTFRbWsLvDUpKSrF8+QpjRWMwimzZ/A7G5o6DHR87gbVrfonf/NtvDTg81h07chzfmzff+jbU+S0b37tnnweko/nHsGTRUnS0daKyogr33zcHH+3YGZcunQkO2sC1A+thHcIfJ8kubHMNTx7r16/HnDlzvAVlAwF7qDVixAgDCce8+OKLePbZZ41Mfn8/eBgrlv/Anre0NAUxY9pM/G33HlsMtEs8Ol94rlixwviTKZ+XML8gUJK5DBgKdWQmY7BOhZVMyWiazN2H1RarPHDgEPr3vwU+Xx/06zcAc+c+hLq68Ot7PaCi8//j33+Hvn2ux3W+Plj3r782ENg21Bbegria+vi+gf7fHICtW95NDT2W0L1sp7MnTJgAJao8EZw/f94AIuc8//zzFm34VHbdunXeyzGjdwF//tP/mk7fvKkfPvi/baYXIyl1569HOoA33ngDjG4333yzAZGiKwr2Uo2vdPNpy9AKcPfYSBpHS1m331e4Og2treEtSdGCJP0zFttivlCe2wN/zA9kEJUWRb7op61CNJZJ0R1Zr7Wqd00cr/zL5cXIQLtp0bk0Rjjp4tb51JPtbptbF93l6dYV6d25Eqn7hCwpROY8smoShU+BRPsrJ1Gf3k7I/gQgeX0JML5GD283kXy4PSl/4Tal3EXt4TKcv1APyUiZeZ5XSb6x6JFzJnqvBSU7cTz15MKhjiy1XYk3+1Ie2Y9O1HiOkU/EO1m65k2k7PaAi06ngBs3bvRC3yuvvGL8XOWkUG8m4rho6KXBZAyXDyOMoozbzjrbCQYCJBT68t+8qJ94usATLTw+PGcsutu3t3WBkU4U2F1buXzYTttF6u2CIZptk6W7MvS27iWfzKB58S3hmjVrrM43lHzuvmnTpm78Yjm7W6eIGypMI3I1yDDkw22F20xTU4slrxpGAPDlG0vSuO0wargX28mLTmHOo5WmPmyPR1ffay3JX/q4PCiL61DRqDPbuQj5U34nuuSl7OSRLF18Ey19FJIXnXbhwgU88sgj9qGOGPF8zpdA/HiGQisZVal+sUqtAJU0TE+JK53PaEBA6FJOwnuCwc1X2EaeumjQyAgVj66x11pq62XE4hYWeXF+yuVuw5F9aBMtzkga75OlR+PZU5t9qKMO/DeqfDhCAbVHU6k77rjD3uC5RidI5GyNj1ZGM4brKDqZQHB8240Ntw89++hGYI7a9eWHwZE03lNGOiuaDKJHG5dMGxeYoiP5aKsRT+pOmdhO+dxL9yyjRZtk6e5c8ereVkJhjx8/Dp65L1686I0rLCxEVlaWAUONfJnGS4KqPVZJYzAscg6Bgvf86SIwmDswEWVdP9mONDdSKA+RDDS0Gyk4F694dM2fbMmF5M7v8qPOBKeis2iUjT8XuOyjBccyWbrmSrT0SQgKwP2MIJg/f76nJD8E4RdH/GKKCkhY9s9c6WsBixjcv7Tvcxvh279bbuEDqfBjYL6UEZ2AIKozwEhfUFAzA4YbdplHMCwz/BEACxcutBc+jCYMl9oKODgyNKa3qf6xtPMp2xU4qL7q/LiWXyW5T/ZI58OwWPvpP5b50ldbL/mkivpymfVly5bZf4Ggr7wZLSKPqJntJM2BwW2CSSW/Zr7tttsst9iwYYNpTTDoyKU8Q+ZwTxVqy5TpYQEv+aQ6ig6KBJHbBfMLAkiAUL/0MEVGC9cC3ttVbhW8mF8oxyAQlGyqzR0smtuWqaeHBbrlGOmhUkaLVFggA4xUWDENeWSAkYZOTYVKGWCkwoppyCMDjDR0aipUygAjFVZMQx4ZYKShU1OhUgYYqbBiGvLIACMNnZoKlTLASIUV05BHBhhp6NRUqJQBRiqsmIY8MsBIQ6emQqUMMFJhxTTkkQFGGjo1FSplgJEKK6Yhjwww0tCpqVApA4xUWDENefw/YLsN81YgZl0AAAAASUVORK5CYII=)
5.C
Let the cost of both articles are 16x and 23x
According to the question
16x ×
: 23x + 477 = 11 : 20
320x ×
= 253x + 5247
352x - 253x = 5247
99x = 5247
x = 53
Cost of second article= 23 × 53 = 1219
माना दोनों वस्तुओं की लागत 16x और 23x हैं |
प्रश्नानुसार,
16x ×
: 23x + 477 = 11 : 20
320x ×
= 253x + 5247
352x - 253x = 5247
99x = 5247
x = 53
दूसरी वस्तु की लागत = 23 × 53 = 1219
6.C
P + Q = 8 15 units of work
per day/15 मात्रक कार्य प्रतिदिन
Q + R = 24 120 5 units of work
per day/5 मात्रक कार्य प्रतिदिन
R + P = 60/7 14 units of work per
day/14 मात्रक कार्य प्रतिदिन
According to the question/प्रश्नानुसार,
P + Q + R = 17 units of work per day/मात्रक कार्य प्रतिदिन
P = 12 units of work per day/मात्रक कार्य प्रतिदिन
Required number of days/अभीष्ट दिनों की संख्या = 120/12 = 10 days/दिन
7.A
8.A
9.C
10.A
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