![](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi4XAKQJvm9iTjciKqCF22Qr_YeUHhAzD-SRDfGbVq7UK5lq3o62yedy-V_ZePVKN8NVQHoBiZB0B4y-EIbN-MWjE1P1vZZp4mZU-xw6h5qoZqHpNyRen48J0Myqri8kZq5672nnaOyQRXv/s320/300X300+SBI+RBI+maths.jpg)
Dear Readers,
Mahendras has started special quizzes for SBI / RBI Main Exam so that you can practice more and more to crack the examination. This SBI / RBI Main Exam quiz series will mold your preparations in the right direction and the regular practice of these quizzes will be really very helpful in scoring good marks in the Examination. Here we are providing you important question of Quantitative aptitude for SBI / RBI Main Exam.
Q-(1-5) What value will come in the place of question mark in the following questions-
दिए गए प्रश्नों में प्रश्नवाचक चिह्न (?) के स्थान पर क्या मान आएगा ?
(1) 215.54 + 308.96 = 23.93 – 5.02 + ?
(1) 425.05
(2) 465.49
(3) 491.29
(4) 505.59
(5) 545.03
(2) 143 × 4 + 57 × 8 =?
(1) 1008
(2) 1028
(3) 1058
(4) 1078
(5) 1098
(3) ![](data:image/png;base64,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)
(1) 4076
(2) 4160
(3) 4182
(4) 4198
(5) 4225
(4) ![](data:image/png;base64,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)
(5) ![](data:image/png;base64,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)
(1) 269
(2) 279
(3) 289
(4) 299
(5) 309
Q-(6-10) Answer the questions on the basis of the following piecharts .
Distribution
of foreign tourists visiting India during a year
Country- Wise Distribution- Age Wise Distribution
Country- Wise Distribution- Age Wise Distribution
Total number of Tourists= 80 Lakhs
निम्नलिखित पाईचार्ट का ध्यानपूर्वक अध्ययनकर नीचे पूछे गये प्रश्नों का उत्तर दीजिए।
एक वर्ष के दौरान भारत आने वाले विदेशी पर्यटकों का वितरण
देश के अनुसार वितरण आयु के अनुसार वितरण
पर्यटको की कुल संख्या = 80 लाख
(6) What is the number of American who visited India during the year and are in the age group of 20 - 40 years ?
वर्ष के दौरान भारत घूमने आये अमेरिकी पर्यटकों जो की 20 - 40 वर्ष की आयु के अंतर्गत आते है, संख्या कितनी है ?
(1) 518200
(2) 421800
(3) 471200
(4) 529,800
(5) 550190
(7) What is the difference between the Australian tourists whose age group is below 40 years and Japanes tourists whose age group is above 40 years ?
आस्ट्रेलियाई पर्यटक जो 40 वर्ष से कम आयु के है तथा जापानी पर्यटक जो 40 वर्ष से अधिक उम्र के है, के बीच कितना अन्तर है ?
(1) 61,200
(2) 63,300
(3) 47,800
(4) 57,600
(5) 60,500
(8) How many tourists were below 20 years but neither American, nor Australian nor Birtish ?
20 वर्ष से कम आयु के पर्यटकों की संख्या जो न तो अमेरिकी, न आस्ट्रेलियाई तथा न ही ब्रिटिश हो बीच क्या है ?
(1) 604800
(2) 656700
(3) 724900
(4) 50,6000
(5) 525,000
(9) What is the ratio of Russian tourists between 40-60 years to the Japanrs toursists between 20-40 years ?
40 - 60 वर्ष के रूसी पर्यटकों और 20 - 40 वर्ष के जापानी पर्यटकों का अनुपात क्या है ?
(1) 403 : 588
(2) 488 : 511
(3) 588 : 403
(4) 111 : 181
(5) 181 : 588
(10) Tourists from other countries above 20 years is approximately what percent of Russian tourists below 20 years ?
20 वर्ष से अधिक आयु के अन्य देशों के पर्यटक 20 वर्ष से कम आयु के रूसी पर्यटको का लगभग कितना प्रतिशत है ?
(1) 168
(2) 155
(3) 165
(4) 185
(5) 174
Answer Key-
Q-(1) Sol-(4)
? = 505.59
Q-(2) Sol-(2)
? = 1028
Q-(3) Sol-(5)
? = 65 x 65 = 4225
Q-(4) Sol-(4)
Q-(5) Sol-(2)
? = 279
Q-(6) Sol-(3)
Required tourists = 80,00,000 × ![](data:image/png;base64,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)
Q-(7) Sol-(4)
Required difference
= 8000000 ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKgAAAAtCAYAAAA6NiDfAAAFXklEQVR4Ae2cgZKzKgyFndHtunr7/o/LnYDRiAGiIuD8caajFTSHLwdKrbYzuiiBhgl0DWtTaUrAqEHVBE0TUIM2nR4Vxxq06zrT9735+x3X1zxNSksJZCUAnqIeA8+B9+iyf7eUQKX5Tw1JQen28wTAc48Z9DtPZuh6M07fQ0u+02j6rrPBQYB99aOZ52Pdw8EP7HB69lqd/k1j/5kfiJw+ZYjjd57N2DegT5jLUDtiBB416DQAvH3SUcx3HExX0ZCoA9Zbojet675FI76vYdIQR7t/cJ9q2Jlq6JPmMtQOmgt/+xGDIiw3Mm5Jp8HnT2+6BS7dX2Pbaul705POZKGT96DL7RvMVGiUj3HkRnzXjvKfQqlcxtqRyvczBoXRcZgMBxEFQW+q0dsxPq6dxsFM9mNq60ycGWPtwfPlXFsNCY40Xi2DpnJ5th27Nj06B/WSjoGxR+E3NDfSlhuZNh1uDjeM30NncgbdDAvHuH2dgfolF0nHQKbFtdnvGe4Kz/pdouNzKWmHz/WRERSDhAS5/fsR1O3jG4bny72mH02+Vkw4TkNwDgpJKG6CQEcHHlRXjTn9mVz6jCX5rGJQThgaolTy/Q7BwUNN61x6hCsP+1GVa0vufZw2LoYb4ct2clbHMqr6uZS2g57znzWoHT3x8pa39sEisCuA8dg7a2lc7FAh/Xc0nDk2pEPaDhqrikG5nu4aVX50Qhg+PP891Kv1JYTTEmZYdgoS1nHMJdcO5B9a1zHocoGZ9nTb0IrXRX1469wOrzMuF6Op5hDU3Pt9bXB+1Ef11GB4RgfXjhSrKgZ1gOFXpu1XkBoTfAqHg4cfVfjtlJqBHvv0NqfNMdz/klSLoc8ppCPUjhi/Rw0aC6xlSkBCQA0qoaR1qhF4rUFBOLf8N8161xUHhtn3BoavNejv59fAiy5gzp9hUINSKJHtNzB8rUGBOwWM5pzGv0hKtMgn0DrDVxuUmhRGTjWnbz/ZezRpiwyzGBQvwzy5DqGGkRPifn5+QlX2N0XTS1uZt6kA0BN6jb/7qQkc9yQ7em6qEbclDEtpRE24zmJQPFnpNYAFE0AjcBQoreHt8Vpn+FqDAlj/I0lNeq67vIHhKYPC03atLDBycnNOMGlLOlvhxel4A0PIJUxR6LJ/t5RApVTiUzd8uGdSlp83md/dU+VUJPT+0BIri2mUxJfUCemS7i+lMcYpVhbTB21MMUqVU05ZDeoCH+9igYD0TiC8wQBvBpaUU9F3tkMaU/pU40Y9xFDCSMJ5i2TsoHh7BHU9Cm/8OBoUy+nNFvQ2rVQ5FXx1G2O4b7R7jVgW0gcxJXWuasPjMEarGmP6JIzw+BhnZIHrLCOoNVvk4S7uLhYqNlWOYu+sYxol8SV17uiDY1vXGNNn9TOPptzNcxaDYmK4JK7gvQepdsLhKdBIOZ4/x5rTaMEn4kvq5NBneXGJFjAqpZFjaHUnNF7RV92g8OhxTHjuR5M5uJL4kjq1DIqMSmnkGKYMejXP1Q0K85EYWDpfyWEADq4kvqRODn020TqCrihPGRQumsYWLvlB4OTJP+44OgWIxTxbxsbiDEH0SdpwVkesfusaOX0SRtxxqTyfulB/2aBesm1jyHyFE8mNWLGkSsukkPz4qnEjzDG0OX0gz0UMCuLttTPvj7joddBU+Ybn3lYIriS+pM49de7o1jWG9IH6FKNUuc+vmEFX8XgHEfPHYVZ8pNwXf+V9Em4ivmo0h78J8vOQYpQqp+fLalB6Yt1WAjkIqEFzUNRzPEbglEH1P+ofy4OeeCFw+T/qlaASaIUAe7tdK+JUhxJQg6oHmiagBm06PSruf2vi/0XBZjCYAAAAAElFTkSuQmCC)
= 8000000
× = 57,600
Q-(8) Sol-(1)
Required tourists
= 8000000 ×
= 604800
Q-(9) Sol-(3)
Russian tourists = 8000000 × ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFEAAAArCAYAAAAANmSRAAADAElEQVRoBe2Zi5KrIAyGmdG2Vo/v/7iciTQ0YiBG42V36UwHJRh+PiI3na+/3QTcbg/Vga8QDYKgQjwT4jj0vnXOu/hvfT+MrIRQtvFdz9vZh3ZmSvrGYfBdQ/Q3nR8y+rVSVkViFNj20X/fOu8yQiabOw+ipC8CJHpL+mMjV16sg9i13iVQxr7zTZo3i9YTIQr6WK2M/pXMFsVWQVw85b1nhUFj2p61cT6OzKP66DXWyeWhTZtuhlh6HSwFahuE5am+W7zOKAzT4dksXm+0QXo1xJy+MFZ/JhcyPlLtW67VkRgEOt92+Zn3SoicvnTiiZHp8isMDUwVxNCT8oRxFcScvnGaeObALDWuhhh6eC4k11uWAnN1pPklfbeAqIWiLZ8C0d5L9aWvM/inE4+2vrT8qkjEcea7W/mu/LmxUWpUKmLv/Rp9ESTuuK6cWPY2+Dc+vyoSf2PDLdt0C4jD+7snp4371w8+Z6Plrr6+BcTX8+XhT38A8NG2FSKFIl1TkAiw797SY7ew3yISkQSChAj8KQBB+wIit4yxzkNoaQoRCHU9H4/UNLu31sP5m1Uo3CwgCuUPMwNAgAcTCUbkYZUZO74FRG4M/EkgbwERIpAbAwHk+9UZx429uyLEsFXiT22ksznJTpsCkZj7lWwlfeBP0iDZc5rS/CLEUMkS4rRX/ew949kc+Ygl2VMRW+9z+sCfpEGyazSxEOeb9TlEtNGDB3rUJNk14nJlsY4wq871wTNoP0sjD7HwwYk7oaGiJXsOjCZ/6rTCBzFJg2TXaIGyLER0wlbGnRJ/PpVCz9OojH6IHfMsUk4f+JU0SHatNlOIzXMoNgDslr8tEI/QaAqxRiITIlxPs3nkdZXsTDWbs7i6wBmXf+S4rY9EAgxbT8cYKpazY55FysECv5IGya7VpoYIFUzrs8I6UbJrRebK5yCerXETxCgSP/qQhTY2OCyEPx+0GDuW25OWIJ6psQhxTwP/0rMVokFvV4gVogEBAxc1EitEAwIGLmokGkD8D9XeQQjOQ/fFAAAAAElFTkSuQmCC)
= 470400
Japanes tourists = 8000000 × ![](data:image/png;base64,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)
= 322400
ie. 588 : 403
Q-(10) Sol-(5)
= 174% (Approx)
0 comments:
Post a Comment
MAHENDRA GURU