Dear Readers,
Mahendras has started special quizzes for IBPS PO & RRB Exam so that you can practice more and more to crack the examination. This IBPS PO & RRB Exam special 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 the important question of reasoning ability for the IBPS PO & RRB Exam.
(1) At constant temperature, pressure of a gas is inversely proportional to the volume. If the pressure is reduced by 25%. Find the percentage change in volume.
स्थिर ताप पर किसी गैस का दाब इसके आयतन के व्युत्क्रमानुपाती है। यदि दाब में 25% की कमी की जाय तो इसके आयतन में परिवर्तन ज्ञात कीजिए।
(1) No change
(2) 20% increase
(3) 20% decrease
(4) 33.33% increase
(5) 33.33 decrease
(2) Ankit starts a partnership with an investment of Rs. 4320. After five months Sunil joined him with an investment of Rs. 3600. Again after some time profit was distributed among them in ratio of 36 : 25. Find the investment time of Ankit.
अंकित ने 4320 रू. के निवेश के साथ एक व्यापार प्रारम्भ किया। पाँच माह पश्चात सुनील ने 3600 रू. के निवेश के साथ सम्मिलित हुआ। पुनः कुछ समय पश्चात लाभ उनमें 36 : 25 के अनुपात में विभाजित हुआ। अंकित का निवेश समय ज्ञात कीजिए।
(1) 14 month
(2) 30 month
(3) 15 month
(4) 36 month
(5) None of these
(3) A sum investment at 6.25% rate of interest becomes Rs. 6936 at the end of 2 years at compound interest. Find principal.
एक धन जिसे 6.25% ब्याज दर पर निवेश किया गया था। 2 वर्ष के अन्त में चक्रवृद्धि ब्याज की दर से 6936 रू. हो गया। मूलधन ज्ञात कीजिए।
(1) Rs. 6000
(2) Rs. 5940
(3) Rs. 6144
(4) Rs. 6232
(5) None of these
(4) A boat takes 5 hours 36 minutes to go to a place 18 km far upstream and return downstream. If speed of the current is 2 km/hr. Find the speed of boat in still water.
एक नाव 18 किमी दूर स्थित एक स्थान तक ऊर्ध्वप्रवाह जाने और अनुप्रवाह आने में कुल 5 घंटे 36 मिनट का समय लेती है। यदि धारा की चाल 2 किमी/घंटे है। नाव की शान्त जल में चाल ज्ञात कीजिए।
(1) 4 km/hr
(2) 5 km/hr
(3) 7.5 km/hr
(4) 9 km/hr
(5) None of these
Q-(5-7) What approximate value should come at place of question mark (?)
निम्नलिखित प्रश्नों में प्रश्नवाचक चिन्ह (?) के स्थान पर लगभग क्या मान आयेगा ?
(5) ?2 = 192 × 73 - 155 × 44
(1) 82
(2) 89
(3) 79
(4) 80
(5) 85
(6) ?3 = 49% of 844 + 172% of 520 + 1042
(1) 21
(2) 23
(3) 19
(4) 27
(5) 25
(7) 131.8% of 924.1 - 71.07% of 644.9 = ?% of 749.9
(1) 102
(2) 112
(3) 96
(4) 108
(5) 115
Q-(8-10) Read the following information carefully to answer the questions asked
Following table gives information about the quantity of six type of fruits purchased, amount paid and discount percent received.
पूछे गए प्रश्नों का उत्तर देने के लिए दी जानकारी का ध्यानपूर्वक अध्ययन कीजिये-
निम्नलिखित तालिका में छह प्रकार के फलों की मात्रा, भुगतान की गई राशि और दी छूट प्रतिशत के बारे में जानकारी दी गई है ।
(8) Find the marked price of 1 kg Mango.
1 किग्रा आम का अंकित मूल्य ज्ञात कीजिये।
(1) Rs . 75
(2) Rs . 72
(3) Rs . 90
(4) Rs . 96
(5) None of these
(9) If profit of shopkeeper on selling Grapes was 25%,find the cost price of 3 kg Grapes.
यदि अंगूर बेचने पर दुकानदार का लाभ प्रतिशत 25% था , तो 3 किलोग्राम अंगूर की लागत मूल्य ज्ञात कीजिये।
(1) Rs. 135
(2) Rs. 150
(3) Rs. 120
(4) Rs. 175
(5) None of these
(10) If Rajeev purchased 5 kg Papaya and 10 kg Guava, what amount he will pay to shopkeeper ?
यदि राजीव ने 5 किलोग्राम पपीता और 10 किलो अमरूद खरीदा, तो वह दुकानदार को कितना रकम अदा करेगा?
(1) Rs. 360
(2) Rs. 400
(3) Rs. 420
(4) Rs. 500
(5) None of these
Answer Key-
Q-(1) Sol-(4)
Q-(2) Sol-(2)
Ratio of their investment
4320 : 3600 = 6 : 5
Again ![](data:image/png;base64,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)
after solving
t = 30 months
Q-(3) Sol-(3)
Q-(4) Sol-(5)
Q-(5) Sol-(5)
?2 = 14016 - 6820
?2 = 7196
? ˜ 85
Q-(6) Sol-(2)
Q-(7) Sol-(1)
Q-(8) Sol-(3)
Required answer
= ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIYAAAA4CAYAAAA4uYCUAAAdyklEQVR4Ae2cCZhUVbLna/o585zpZ+/PtrUVBIURFCiKRUA2N2SHYhFUBFyQpywN0oCoFDvKKjvagIIOstnAAOIuCig7YoEghSC1UGtWVmbevPu9v/ni3EyWbl83xcNvPqw69d3Ku5w8N07E/8SJExEnU6gslRz4AQ6k/MC9yluVHKASGJUg+EEOVALjB9lSeTMlanqYPvi+j2/FwMgDs4hifIpd8D0DHA3fcrDjELPAxMIx8vG9YiwvjOU74AIaxOIWMdckbp0BdAzLQ3NcHF8DM4xnmPiuj+HauH4c19YwHI+oCZ4TBS9WLqn4gOl5+J4F8RhxyyRPSPFAbrmWje+VAmE8D1zXw3EiWMTRfVPR7dtg6T5YYJlxdDufuG9LL/HcMJ5l4dnCpHKRdkVXTrGEHz54wjUBQew02KUU+JCt+3iuCb6JYzj4AgrPw/BtfKcU1yzERUf3bPDAN8AwfTSp75fheibCz7gdBT+CZ8exNRPP8vB8AU8Uw3ExHbAdH8eKipgprwQ0x8bzTIiEMFyHXKDMCZqxDQPXKMD3I2iaje8LMGIYjonhSD9cJXTHcjC14N2ReIi4a2O6DpYVV+CyDUdGzxUt7PIQnyKCMx0vAIarg12AqxWQj08YGUkxPEfHMUw8w8FyBRgmnh7BdWS0x7A8GVk+nu5guh5R38LHwrBd4qJ1/CiWloPrCHOlUQvXCmH7JkW6i2WjgOV6OpaopXKWuOPgC4AjhQqk+UDU9bFNVxAvMME2i9HiAgwfx9ExbQfTthXodT2GZeiYZhGOE8d1wHKFLw6mbqLHY/ie0CVqsWKUFNcHxxPNYIOocitfaYwcH/JkhnBMfM/GMQ18xyZmRDFcCxwfV7cV8wzfwfMd9VzEEPFsLNuRKsSVBo7i2oW4IiTbw9MNTKOIUKwY0REKL46HaWm4on3KWXRpQOYNuwzDsxBgxGTaEM0koLFD+F5ElBqm5WEacXwX4pqD62tYdpmaB00nF1cGgenhWAqreK5MLxF8X+qIGqoYJUVGkBbXkVFTXJjPykVTuO2mGxizcBXFPmhaDMe28BwDreQ0phHG8T3Gjchg8GNDFJdkavFkCvA1ho8awtW/vYb/+b9+xTXXXMuzz00hqoUELji2zdq3VtMkNY076txBaqNU3lz3jtJW8aiJbYvG0MvNed2y+Hrvlzx6f3PadexGZnEpMVEWrkyPorI0pd0W/2UltW6vT+MGaax7ez22JdOYoUAR1b5n+dsLqJeWxh23N2XDmvcx4j6OB6YdwXXFTqlAwDBNA9d1cWyDRXNmcG+TBvzm6n9l9KJ1nEnYW7pu4ouhhgg4zqYt73JVyr/Sp+sTamawcXCJkZv9NY8/9TBtO3XgnnseoGt6P3btP5Jgp8PWNSu4v0lzDh88ooT/deZu0uqnsmbDe6qOjNZLsTGyTp2ma4f2NKhehYaNmrM7Jx8Rt65pSovhxpn3yjQe6JBOVDMJh0rocM+9vLF0eQKEGosXT6J9l86UlEWwLIt2rdqxdPGbGKIxfA/DFKO4AtkYojBd18ETVSxTffExUm+9mUEvL0XGiOXKvOoHqxPCHM86QPsOnbjlupr07TpQzboOPlGtgJcnD6fXI904mZudYHggZk3GpKMx/LFejHlmqHrmq2/ajBk5jP7/kUGpTPcCD7FgL7G8PW0Udeo0Zk92vlppBTaBx+nvvuV/17yVbV/sVtOJNL9p1RLuTKvP8exisnOyqHt7dTZt/TzxZp1tG9eRVvt2TuRkIwsWmYYqUkk512XpukXZqX3Uq16FoTOXUyLKUxlvwhIXI5bHpIkjeXfrVrq06k6frgPVqkOsggOHd/Kbn19FSkoKNerdxpQJUxF7UJaNRaaB5VpMGzuKO2vXpTCvEMczcL0YgwY9w+tvb8AUmwAXn/LbGME41lkydiCp9ZqyL7sgEKQso4A5M6dzR+06FIQjidY98rP3ckvVf2f15k9Ytmw5jVMbk1fsontCQ4SS49updfNvWPHX9QrCYoxWHH0BKdLZoMMBMPK/2cGdtW/muUWrKBKo2CZaTExE2LL6debMmkJRSSnp9/fgkfQn0B0okzpmlKxvv2HL1r9S5Zab+Jf/9jOGDBpDVFYxno3tlHH08Nc0uiOVatffQM6pr5k2axKjxk1GbATb9YnaNrZ/iWPT11g6dgD16zZjX3ZhYoRb4oihZ9duPHB/O+K+rJWkww7RkkM0SavKK8v+D/37DuOuBm0IGxB1PBw/jlb8Oc3q/Y4JcxaovhtKo6nTCvHv74ARy/6K+rdWZeCUxRQqFri4js2xzK9Z+NJLaNEImmXRvnVbenZ5SDFaGK6KWgFElSZ4pn8vrvof1/D6xk+DqciPqCp7duzmpl9cozTL8JFDCMcDYzMaMdE8ZcIGbZX3vx9jacbj1K/b/DxgmBjxUrp1TKd9265KWyh95FrESzJpeect9H76WTp1fJzeXZ4g7IgFJcXBKPqE+5r8gX7DJgQrp4rl3yJFLIhzq3OHkuNfUrfqjby46G1KPV8ZpeHifBa9MocTR46eFVf7e+/j0Yf6qGv5viMcF8+hLn6AEKW5mdS4uToDn5uO6bl4blT5DrZ/9DnPDRxIn4d68C9X/4wnR4ymsESWgxAWJ9Ol6ms/xrKMx0i7ABgGthWlS/t0OnXopQxcU+wl10MGQFqtPzIoYyo9evbnwS49xXFL4Hf1iedso3GNX9J/1MsIpEXTXCppZ5l2BZ2kiDwTTkLAJvb9AVKrV2XMvDcTwDDZ8clW0mrX4fF+T9HrkX482K8PN9/4B2rcWp1efR9ld+Yx5RTyYy5GOILnhfC1LGZNzmDQmJeIeGI9OLy9fBltW9xN/qnvFYtmz5nKv1//R0ZPWEDEEQc6lz6VeDFez+hLWt0W7MsuSkwlImqPQU8NpW2bdHTfwUw8CZ04RLVrf81r695l9PPDeeCeBkR8KFWjxCd8fDe1rv0V05e/o+iKidv9ChLsf5XUFAGF8MJX3XYInTrIHdWq8Pys15RzWp6GivPY9dlOtn34GZvf+4j3PvmIRml1aNGiGR9t20ZeaVkwnKLg6oZyf+PmMuelcUydu0yNtpJ4GZ3vb8mQxx/HNcXAC+A4edJ4WrZ7iLyYgaGs/wT7L/xQ/fx7wYh+T9z1NF7NGEBa3WYcyglsDN+XicFn88b3uOP2BhRFQpheMCfkHtxFveq38kXmCTZufovUujdyJmYoh5xnmxR/tY96N1Xno32H1dLX8IXmvy1yJ3n87bPzrs9WCTgtT+SWXIlFJednFwHSH/G+qSceAkdVJ6h09v6P7VNJscUdrl4qxECo6DR1alVnwksvq+u//Wc7Qb0O7dvSrVvXs4/P5BVQFgrsCLl5/JsDvLpgHtm5BWplY1gmTz35GPffcw+hEvGHBGX2rJl06NKdUEQ8kEE8QoJsnopT2Fiuj3hnxX1tipvb8VS8IxaL4ilXfDK24vLa7CnUrlWHk2cKVONxacP3KAyFub1OKvMXzE2+lskvPE+nDp2Ucy07+zuaNm3AzIShKaKaPWUyndu2V7THbQc3AahzOBBxCS+SR6BRhJVnD99X7fuej6us1zieuFQTRWAri3PLC+I3lmWAeH51CUZICdAgPYzEwVOgSS7pxZnw45UUx3GwJWaAR2bmQebOm82/XfNzGjZMY/369RQWFqk4iMQPPOmg62IYBg0aNKBz585BjAV44YUXaNq0KcuXL2fp0qVMnDiRb775Ro1oqS/lyJEj1KxZk0ceeYQVK1YwY8YMunXrxs6dO9Vzz3Vxxctqm9gST3FdTNNUusUQgIhx6tjYUs+1sIwY8XgEXYuwad1aunftqoza0S+O5Yvde5Sm0j0P3XH5ZNsntGvzAIvmvMLsqZPp2aM7R48eRfov79m8eQvt2rVjzpw5zJw5ky5du7J3714VW5HntgR0khJXJ6LxLjySj+VT4CKClO95totvy504sbIQGzdsZtHSJazauJEyGZgS+42FcCVOZJvgGLz/7iaWvfEaH+78WLVlyusvAIY4E368kiJevng8jmHE+eTTDxg9ehTjJ7xIRsZYJbiTJ0/j2B6WhK99FIikvgBgw4YNCiS6rpOdna3AMWLECEaPHs3hw4cV1QIKYX6yZGZmMn78eEaOHMmYMWNUvSQAJPIpoMBzsBRYZW5xicQNYpar3q3p4hPxlPscR9zwLtHSYmZMncSLL77IpEmTGTN2HOv+7ybFUF2AnNByhw4cYOTwYYx7/jkiZcGoVOkG0jFg165dDBs2jOeff55oNFiiC380TQsGgJK8/BNRXggKuVaPE+Nc1fB84rql+GdrMeKxIl4YM5rejzzB6FGj6PVQLwYNGc6ZkhK1YnKssOrXzBnz6NvvMUaNepbHBzzE2jUbMIPlkmo9cA4mtUqSs5f3U8VKgojjf253i2shGFm+chcLMJJFjSYlxOSdc5/yTBgrhwBEIf7c47NnorGkTiym4UtsQ1xdlqGimhL9NSQfwveJ2b4K2nkSxBMWyWpHOCYA+YESMcVZL/E+HwHv+UWpd9EE4jtJvP/853Iu9Cb7oGgvBzCSE4ztergyFelR5k96gbb3teFMNFj7nDl1jKaptZn+6htqSSwaZcv6tTS570GOnJJ8Ftjx+TqapTbi0O4sdS3tSu+dxMJa3fwR/imNIZ13XXFCGXjKGSUhaF2NEtcVd3jwZsnZkEOYJCpeighUQCOfwmABTZKhsVhM3ZP2Vb6HKNN4/KwGSd6Xe6ptCXr5PqUlhWjhQFXK/G45DmWRMqU1CkOlCDDicVmKin5VWTYg+RMyst1ANcvkqDkehghGxrjnYZsWrmmoxBsBhoBVaBD6heYA/MIL+YYEEDWlOZL9CVTCxWkMaUFArTymvk20OJsWNW9k0YL5yqiX4BxWGUtn/Jkbajcgs6AYqyyL3h0f4MnnFyKxXNsTTZXPgO7p/HnAaJVBIFwPbJNztooi9jL/U6l9wgjblheJ4B0cSWBJCF+EHTAvmO+FmUkhy305BBQyIuU78inXwXcC+yXZljBemC2gkjbkWs7lHVJH2RW2QeZX+3j8yQHk5Oao7pYZthLu6pUrGDdhEiEtHmgWS6YSlWWkcj1cSfoxJEnIw/J94mKwep4y7pQ4bScAhcSGEnQLnTJtyKfQJHQkAS3nyXuKkAs0xsVJIm7JoNE58fUObrvmKhbNm6O0gy5LMOJ8tnEWN92Wxqff5pH31Rbq1qzGrA2fKeG7yjTN4YUn+9KlWXscx1NLZzHxNcWRi6PhUmopYCRHvZrjlSoPRpjcl2KaF6JTBColCQA5FyYKc6Ukn8s9KcJcOZJaRuqdBUMCFMFzMVJ9YtEwM2e8RHq3LmTnBSr19bfepl2nzmzfvjPI6xDfiOPgCG1i+xgCEvU6HBGympB8NY3IXXnkSbaWrC5EMyVKkg55v5wn+5QEr9Cq+iOpj+p7wUsOfbWfiRPHMX5CBhMmZDB+fAbjxo9n/ISJjBs/kanTZvLl3oMJkhzMstO0vPk6Rgz/k9IGYsyLeD9cO5lf/+EWNuzLJXPbSv7421/z6odfKkebI4lTnOGNWVNoVKUu4VCUmC9pRxBVPUz24vJ/pggzpPNJIYoszx2+WhoKYIJDri/PIe+UQ8o5IMl7EkadG+OVV2bRsUdvXpo6md69enDo2HFV35dRHtPVCHIMS+WQCp9kehD6ZDIJ/gQgshyXI3gW1AuA/EN9EYAIPaodTyLPCd4kgOF5skIxOXLkEIsXz2fBwnksXDSX+QvmsGDhAhYsWsSChYuZt3Ap+w8dxbJdHNfEj+UyffATXPf7a1m3bUcgSS2fjIHt+XXVehw4E+LL1XOp9ocqLP/8a+VtdVQQMJ+3Zr3MTT+/gZzsEgUM0RjRH1tjiMBFvUciUcrCMSJlUXUu15FIhEikjEgknDjk+vIcubm5lJSUEA6HE4eMAxGYaCflA1UCnT17Gne1uoc9XyVWOSq5xlM5qOLgMDSDSFmEaCSqDkVftIxINEwkWpo4hP6A7mjZefV+oC9FRUWcOXNG1Q+FQpSWliotomiTRGIxhBNaNZDuP/4vuax6rFRlkWnFp3h28DNcX70WaWmNeOi+xqRefzVd+jxDvutyeNsqatx4A2s+36fSKlUqhF/AhKF/ol7VhpSGTGWfiD9Xv4Qo9D+m9MKnKTJCevd+iPr1G1I/tREN0hoH5/XTqF+/fnCkpVJfjuT1Zfhs3LgxzZo1Iy0tjdTUVDp06KjyQiSP1HMDV/bGjevo2b0jvfv157Gnh1ISCpw6ZZqFrYt5CQsXLE7Q1ZD6P0SzojtJu/Spwd/372/607x5cxo2bKh8NULf1q1bA64pT6BMJT6FhXns2f0Fu3btZPfunXy67SO+2PUlX+7arY6du/aTV1CotJhyatkR0AtV0nJBJK5WYDvf/yu3/P4XLF+9Vk0Mecd30zytLsvWbFVTkCRTyxpk8IDBtGvVG9MIDGkZOpayPy4U5uW8ShH/xf+vclZNiz2QMP4kUVfSe9a/8yZt29/Lnv37FHlTpk7hwT5PkpMnyQDBdKdLzP9HKMmpLfkptCn6ZNkpGemuw6effEDPnt3okt6JrumdlRe4a7d0OnfpSnp6d3r27suWd99X9S1NA0PiBSEcQ0APZ/JzSe/SgRHDniWs6WoJamn59OvehRHPZiijyHEtDKuMNm16sOy1D9X3lK2k3OTl22ZRXjapRB1Nk5xPQy1LVYqkmq+T87C4eu3gULZGIJTADrl0e0M0lTBbjD05l6lLrm1bY+eO93mwRzv27gs8ooHH0yVj0jQmTJpGLCYjTseQLQ1q74t4GVXqxVkbSC1jZSkrWx0kUVlVDKxQVfesLXVhH4QWsS+SxqcspYVG5YeRqURssv/Eb3I+8wMTVVbREnK2caJiGcgg9Fi5YiXNWzZldMYYYnETw5Klt8SbLDatWkmL+g34au9+1dzCZa/SpEVPjnxTHDQvZpknAyKYes9/5+U8T5GlaSAgW3nolA4LtGXiPXIhhCSCSOLUUHZA8jqw+ANGiKkXBH0UypQhGPgJg+fyX1YEwSpF3isrCPkUYdji9cTmTP53fHs8U71T0vktccWLwRXTOHgoE1MYbTnqFa4tCb/nwBpYzkKvTDVyBPEXuR+sVAIKLujTeRwVOsR3o+jyBFDip5F9K8F75KWSUS/gELe8tCPAE80rvZOYinyKB9xxxFGn49sO8VAxfxrUj7ua3kn7u9uyfuM6JDCne2DYJpZeiG1qKvH6ow3raXlnE+66qxk9+z3K/sNZyJYX5U9SDQufzsWlziP/sp0qz2eytcTqMnl53mcQaJMsK9SmIHEXG5i+o/IwhFaJXwTMTn5NhiSq49IN2UogKlgFiWQkJyAi3wpAI9JNCjO4IyKUkS6sTt5Jtn72Ux5I47INQrYxiLDEG+rLlHRuWSqnkrYX0mMYEpPwSvBkE9TZhkAGtzRnyS4H1RtR+2LXiMY8vyTUjborTxIrnvOrJM8TSzzpR3HRGXJys5WxnHwsLFVvVZpNuBGUosJCcnJyKIslMkSC1wQEqvcGPEzWv9yfF713VUaSFLPkJNs/WMfB7FwKBO2yOUdtEpINSToff/AeK9esZP07azl9OlcxWBM8iadR03DVzq6Ed1TphERfRUQKGOeYc9GdVdOJj+kbuE4MPy5q1mHvvt2sXLWGd97+q4r8hlybmO9iuVE8X/LTbLK+yWLN6rWsWrUeIxH5FJeIeCY94ngKGIF2umh6fgIVywEMk48/2ED/dq35ZUoKg+et4Zgb7GWFAuLhY8wYN5U+XXowePAQej7cmy6PPsGuw98qrRGTfYhI+DmGn4h1CAT+XmNcGjBk6SrAcJywcjWvX7ea9h07MnjwIPr06MmjD/Vlz9EsdDx0uxSPCLt3fMZTvZ7i6f8YwsOPPcbkaRmESouV3SIkuphofgxX7JNzhP4ExP7Pu3DRwPB8l/37PmPpxNE0vu53DJ7+FpL1YFga+Lls/3AlqbXv4tvMU+qtjmfy5NBhdHtiKCHdDKYamSRlm0Jit9nlAoZvyP5TcYPr4Ec5vP9T6tWqz8cffxFwwNN4esBTdOj2NCHLUVpAj8Ro37o9ry5YoupE9RC92jVi4tSp5+2Oc1V8RZxjymD95/z8ydS4aGDYXiKxvziLu2vezJ+nvqIYKPEJ2ypk6ssZtLqnB6KG8WR+hzVrV5Pe/xmyS0Qly30Pz5LtgYGL/XIBQ6JVnuMRl135fox+PdrQrX0vxOyJGxKejrLz88/4xXXNeXP9+/iY/GX6Ylo1aMv3xSE0NWfrvDt/JC1bt2Z7UVhNgcpVoEkwS2IUgZv9JyP5f9KRiwaGCFHMnaKsQzSufhOvLJquTDJRAGJ9fLJjO3+8oSrTZ8/FkRyJomyGDhjIgjdWqQRfLcg0wbN1PDtI3LlswJB80ZiBh0O07AQ9Hkgjve3DKhppuWV43mlKSwqoWa8vY6cvUim/T3UcwIBeI1VMIscSIEc5uGUuVavdzOKDh9XMoR6Wge46xJBAXmBn/ROe/iQeXzQwkiyJ5R2nca1qjJ7yHFF8ZXyK9aAbUaaNG8lVP0th6MjhLJk/n+VLV6iFrmw6kmin2mAsm6dVPCSYtgUcQdv/BeNTECs5I0F2KSMGpnNHzaYqGcqXsW6fIFxSwA3VH2TYizNw/AIaVWvGkEfHKhdzqaIgwskDy7mtZhVmvL89EK4svqKoHfxxZH9ukgs/Cdn/w05cPDBEL9s6pd8dIK1GFYZOn6Y2JEm0T3kIvDBu5BR9urdR6XW33no7n325TwFD3DoyFUnwS21Pu9w2hunjWi5xR5Z2xXy8cQm/vaYqY56fldBzZXz43iau+nlT/rLyXcLxE9S8sS4T/vyKYk5M9SDC8QOvc8N1v2LqmsDLKCEb2bIr02AQ0Dp/cfsP+XrFP7xoYChT3TOIZO2hSbUqjJq3Qv3cgPwEhezGMCOnWDB9JkvnzWXv7s9Ja1Cf31e5lXXvf6zGcVwyVlTGlfaj2Bi+42N5BpaegxX7njUrNvHLX91EwyZp3N0yjVbNmnL9Tffy2cFvcdxiGtdpxvgRM5S60mT/DFG+2r6E6264lrmbEkarOJUEGOL0qlD6gov/cTax5WWWNU7u597qVXg6Y67a2+qrrK98lq+YR73UtmR/HwS6iou/p1PXTjRs3YHv8gtVprcWjaqfUzD1mPJ0Xk4bQzyhhaX5ID+rZBSqYR4KlVFYkk9h7nGaNrqT9g8OJuI72F4J/bv3ZmDfZ9TILlHhAJvtW9+kRs1abM48GUwaKgVLQJHc7HDFK4KL7sBFawxZR4gfMHxsD22q3cikOUvUtW8ZGHo2A4Y+RcMWDxNSObSyNImxZ/cO6rZ4gF2ZxwKC5OcENPl1myCQdNmAIQ15Ppb4Mcxi0Evw1NY4+Qknh8ljX6RF05ZsP3AE+a0f3Sxm3euLadnkTrJLoxjivLNMVs+bRbuOXTmlGUrLKde/AN8PMqcqzkRSDo1xNukp/D131biZZ8ZOUMyTDHIJfG3Zspbf/dvvWLV6zVlUjhs/mfTHBlNQFkM3ZVuAhS+/0ONal1ljiL/dx1A/1RR4PYWIo99+Q9f0dHp17sXRQ8eVoVlsi0WhU3Tma+5v3ZiZM+Yrek+dzKbFXS1Y8Orryi4Sg1p5Pv0wnm8rT+jZjlWAk4vWGKJbt6xbS5tmjfnN1f+dX/7+WtIfH8Khb3NUEMzUwyycPIrba9xIq3ta0arlvTwxYDgnsvOUQHTLxjINbEPDS0QnZQTKYD+3KhFxyJ1yFvVTWw5RQwJLHqveWMLdd7emyV13MmHiJIryi9XUEvFMYp5sUhRghjia+SX9e/andcu7adHqAVZu3owuy+oEUbb8sh/FgeF5jtByEndlVr94YEg8Lxziu6xj5OZ+z8nTp8k6nUPcCJxVivO+QW7uKY5nZZGVdYJIJAgACQBE+EF6oAQ2zgn/wgVgsmY5mRk0jivhaMkyD5WQlXWM7JxzP+AiBIiddG6/WBCEKguFyTqexensIPFYvTlBlKTFuEovylK6nDRd4dXLBYwrvK+V5JeDA5XAKAezKlLVSmBUJGmXo6+VwCgHsypS1UpgVCRpl6OvlcAoB7MqUtVKYFQkaZejr5XAKAezKlLVSmBUJGmXo6+VwCgHsypS1UpgVCRpl6OvlcAoB7MqUtX/B4/VXbvBUpyWAAAAAElFTkSuQmCC)
Q-(9) Sol-(3)
CP of 1 kg = ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFcAAAAtCAYAAADbcffLAAARUklEQVRoBe2ae3AXVZbHo7tl7VZt7eOfqamtrdrRcsvZdWactVZRUd6gIC+R8jGIiIBASEAeCYQEQZQBXygQEhkEUTEQQB3lKWAUFTDkwRuBAEmAPMg7+b26+3b3Z+vc+/vFHygYnVD4RzrV+d3uvn3vud977jnfc24n0HFcNQQSrlrLHQ3TAe5VVIIEVzkoz8d2fTxlg2oEu5oGfGqkY1/huXK/GV9VE8GmAbDlmWVBMIjvRq9RKN8npDws18HHwvdt8AFP2jJFHxdXKVzPw3Y9XFeBagFVRQCHaqnqRfC8EJ4K4ap6FBGUI306BDxFk2fhOy0aGmkap56wCnHOA9t18ZWF57m6W+nX1WMRAXRt/d7V/peglIMjYDgunivSh2i58C0nay5Q64GKhDS4Hg61FUc4dfogRadPU1rXgON5EAkRqmtg/4HD1NbV6kGElI8jk6KnwAHfvwhcT8B1FY7jYisPpZSghlV/nJLKcip9H88N46kAntWCRzMHS45wrLgEQjYBX9HihIEw1XUXOHjwCOH6ChwV5qwHTgxc/xqDa9sWjnIJWTaOHWHdu8vpdOuNPJaYqjUUz8H3bILhOh7r142EhAQSrvtHXnwtC8vzqD1fSfqEGUxOSWF84igKDh5EoHLx8XF+UHMFXMexcZQiFLHxPMXOLRvpe9/t3PfAQE602Ph+RIOH28IHG9fy5IRnmTk2nRWvZlPruFi0cLQwj+GJqUyblsL8SaMpKy3hgkyT8vGcsJZA6+m10lzRIOV6eraVY/Ht4QKmjhzKI2OnanB9MRV4bNu0ihdSpnHo0FH2HvqWhkA9vl1OythJZL25Wa+wvV+v5/EnhtMYtHE8aTdmFi7VXDEFbmu/nqsoPXWMpS9M4+6e/SgJSJ+yiiIc359P7/6DONsU1DYlafgYstdvRqkgox7uy8Zdxbrv3CUvMH16KtWuhxJEVQQf79qahZhdUjK72izYZM+ZTP8nJxjN9V2CTdV0v/O33HD9DSSOnsGFmmZkwZUf3Ui3e3py5LxDRPlEIofo3KUrn+/erwfcCq4MUexu1OZ6MmzPw/PB9Cu6rvgsN4v/69KHUwGZFNFcn3mpf2Za2hwEKjzF+neX0f+pMWze9hVP9Huc+rBMgk/tiT3ccUdnCitqjSl1RfuvsVkQAx/zN8YwWizJmMjgkRNpFp1VFo4douL8KTZ9/DH33Hwr9912B4caGtj58QruurMrVc0evq2wOUvfhx5lxTsftYLreQLSpeCKGRazEXU0uqTYkZNJp+79KNWA2fiuy6BuY1j8+ko8WvBp5ovtb9O9/0BSZ67iqcFpKBdcP0Cg5hD3dLqH7QeP69Z8WTXXWnNl1i8GN8zraeMZOmYqtfqBYQvi4eUInK+lyy3/Q8pfsvhs3V/ofG9v6mwfbAuP8/Qe+AivvP6eruv5CuWE8DxxavGaqx/H9SsPFZ+uXsydXftSGjZmwQmH6HvfM+Ss3IRLHVDLVzuy+d3td/H0+CzGPDZHN6T8Oppqivmvm27mr/mHcbXc9i8R3AiLM5IZMnoKjYKHa+NYQocswrYBeO3Kt3hm7vMUbc+ha89BnJVVbQfBPkmnu3qxdsNODZzrOSgVwvdVm8DdnpPJnd1i4Gqyx58GTWL5UpksYQdBNr8/j14D+vLCKzmMHzZTt+sTpqZ0D7//3W1sO1JqZk6JabnGNvf7mmvAHTAimSZZtrYMyoAatLSn4JOP3iPrnVwCVYfp1ecRCsqkpoVTd5C+vR7l4NFKbU9dT+hWQGulpmOtNvcymvv+Yjr1eJCyiNhRAddn6fxsJk+bimOYNW8vep6Jz6ewp/AAQ+8fREvE0ppaXpjH/X36cbwxoCcW5xfg0GLgykoS2yiOZGF6Et0HD6PB8/A9xb6iYt7f9Cm241J2chc5775CYwhczyIj/SWmpMzDc5tY9trzPJs8m6AFjlZWsecCklwYZKPWQfemV2+0JNq9dXUm/337PRxvCEbZguLcyaP0uL83uw8epaasgkcffIBdR/ZjqzoSh/dn8Yq12JZiTuIYlr2ZrRUi4ii94uIdmqFkbQki4iXUC0NLaPxR1Fe0MRBJEMfi+b4m8spxeDMrk4H9+tK1e09mzZ1HKBjk8JGj9B3wECNGjOCF2alUV50xHNL3CQZCvPzSqwwf/icWL3yF5mYTNZnJkv+u5rGObTRRAgahYWHROM/XpyzfLRs/4pEhg7ivS1eSp6VRVl6OJ87WVxQf2M+Ip59h5LDh7NuzW0eBnmdTWXGaKSkZjHhyBJ+sX0ckIvEjmoloRx0dm6CjHajvYzuOjgylbzNukU8CGUf7Bt+39KrZ/PHHTHk2Fdv2cV0f26+meP8exj81njEjhvPp558TdIy/iqL/vZ8ETYm8KO9UKhotmXqeRDoioGhwdLY84U8CmfBUHVmZunJtnsi16En8KW0oHY66yiYYCuq6juujXAmFHSRYadWOKE2zZdCuZ8Ay/lB3JjLZtqNlML0bDZP78UfsWmQz8vmazzvChV0zsTIeqRcOB1EqglItlJUe5tbf3Mz9PQdqtu0on3MlX/PI4L4cPVlOS3MVT/QbyO7iYwgXutxxEbjSiZwGTPMrQtm2RFECsBE+fkIsyS+IxbXEgcjzeFCl7HP2bBlVVRW6nkSBcpw4WULEdrR2ShChrJDJB0RzAtKUI9xbgJYchNZ8M6mioTFZ4+WVdmP3pRwDVXcokskYWj0I2i/IPceR1STON0wk0sjC1+byZL+hPD5ktOH62Cx7bgbTn03VZkf8QXZqCqOTZmDWaayHi38T9IxGAXUcpxVILUgU7JjAcs8II1pmhBdQRYPlNABcCi5s2bKJiROTaGgQOgXbd2wnaeKzNDS1mKVpW9hWCBWRKExWiwFBIZrtISsoNsExeUWm2D2R6YcOeS7ylZeXc/r0aUpKSigtK+PEqVOcOVPK+YoqLbfrim8xTjs3dxXbtm4g59W3GPTgk5RpP1TLyG7389byHMQ9C3PZtjqT3oOGUf/DXetaWnNF4KtzGKBl8Bs2rCM1dSrr1+cybtxYKiortY7LwK7WIeO6cOECc+bMITk5WZ8TJ00kMWkCScnJLMnMoqUlgBfNzB09coC1uW9rcVb+OZshg0dpOmqHj9Lvj/eyZs2WqBkIs2NzFrd16sWFK9iFVs2trKykoKCAwsJCfRYXF+vfoqIi4k95HruWOrGy3DfXhRQU7OPMmdM6/DTLTdwMZGYupkePbpSfLdPX4tWVcjl5/DjFBfkUF+ZTXLRPt1lQWER+YRGFRUUXyRTf36VlkeHYsWO6bQH2chqtK8T9k1XX1NjArIwZ7NixkeLiQjImpNOt8yC+PFZMxD3BsB4PseGdzRgjGOTDVXPp3KM/jReb+bhWMclyESIvL4/09HRmzpxJRkbGzz7l/Zkz01i3bq12YEKH5Ni2bQvJyRPIyspkytTJ1Dc06jyyDCxn9WrSZ6TyXMZMZmWkR/ueRfqs58jImNVmWdLS0li6dKlxXlH/UFFRwcKFC/W4nps9m7SMdNJnzSJtZjorVq6ioaFR16+vq+WNN15l1qwZWoYhXR7klpv+l+mLFxBwy3g5cQZL5q+K2lxF7vypjJ+SFjUTF2HaepEgg4vZsda77VRQOqPms2fPbsaMGUV5uYme1qzJYXpaOk0tgYsYRzt1i/gOGZOMLRgMam0WLZdVsHdfPgWyOouKOH7iJOGwMAQJMWMqaH5XzV/EkEHDMGkgiwObd9Cnz1DKwg5WSy0pD/flg607CF1B6AQRRE7xwDGBRJN/7imAiimwrDC2LW06epmVlp7WTMJxhN+6fLV7D2fPV+qBOZKXUJahYzp/7Gr+a9iC8fI/Jo/ILqc4MTkFMBmXOL5Lj3gPIzbf2H0fKxJAueKyLFa+/BoPP/woVQK78vCtFla8u4bHRiaR/NQwPln9No2OouUKLkPbXBFGhIgHN8YQYr+XCijXIrc5DYUTLy/gyim8VgOp05hST9hERN8Twi5H2DIUT9KeeMYuy33hCkKndQJG17z4X0ymGPeOfyqTIKAKfxamINcyLnlHggbX93Bk+yd27XpYVkxm+Q3g+0FCzXU01zfhSirV8XB92dxSnC+tpPTMCd1l2POxvj93reJotiAdyyGCyPGd8AY0WTKRcJDszNcZNWoUiYlJNDUHkeoCgqlvoimBRoOll5lwZaMnsXt6vywWhEQT5nKvrqaSrJdmMz1jNlURycTJDohHJNDEsiVvMHrUKIY9/hgHDphcsbHlPtmZi+jevRs9evZm3sI3sYSieT5hzYsFVBU9ffxowGDGKLJ/h4yMXSbL1XlgMRNRlZRgQ1/JXqAZi6Qy5ZD9wsspgDxv0+6vLLHVq5bxxWdbaGpqYuzYCUyaPANXGm8VQ0pxQunuL/9PAJVJCduGW/913RoGd7mDu3sN4IwG19YAf5T7Pl9sN/0uXbSQm278T44eOaxtZHXlWSYnjWfc2DGMGJXIJ3nfEHYh4kNYByuyQuSMt6mXl6m9n7QJXImgaqrKQO8OwPbteTz19FgsJTTfzLGZzZ8GroSwsvMsNlda2bX+Te7o8gCnJPMj6UInQn1dNfg2TiRAOBTgD3/4A8uXL9cTkzJ5Er+9+UZ278rTuEgrASW7z7KbLeG2mBqRKaZx7Q3fldtrE7jGkypt8D/P+4xx4yZw8tQZYxdbwRWYZRDfLbUrdW1yDT6OJFBkax2Hbe8t4u6eAzgVEpPg4joRXFvC4rAuC7iDBg1kx44d2ilmL13C6JEj+Ifrr2dc0mRqAg4Bx9dbTrKqDLCiub90cH3FB+ty6NO7F//yz//K6pzcS8AVKK/gOi9BWpyddj7aDsp7NtveXcRdPQZwOuzgWGGscIt2dCoiHtyjsGAf6ekZUfpknKLs8u78dCu/+vVveGPZe9rByrcQSk9YzFTJCjMh9SViXNXLK2qu2MSYoZePQ2SAyrZ4acFL/OrX/86psrNxZkEc23fJnR+TWhxcxLL1RyGGD9vk5WZrzS0Jmm8dZBdETIPnWjQ11pOZuUTnA0QnbSfq9ITCAfMWvMbQYWPMBy6Sz9V5EQHXnK37aT8mWDs+vyy4IlzrodONshNotKW5pZl7u3al+NARXUU8ptQ2A4p7r7WB7xd0ItuXFKCnv74Rzd36zut07jWAkpCkIJXeBZEtJmEOH364QWfSpCXpQedjxcPLdo6KsHvvPlLT55jJFmYnOQs9BlkVmtxFv6X4vixX684PgisgxbihdCw8+FxZKXbIxCPfHj/GM4njuVBXrwcj2+Pxc9EWYcXOChXSn1Fpuuby5fpsOvfqzzkNjmivq/fv5r84lw0b1lNVVc3Zc+fJ3fABVTU1mrnovnyPtbnr+HL3Xo28NKes6GdUUYBFc2Wj/crp7bZI3vY6PwiuvB4DV4AOtgT4/S238PjQoSxYsIC5Lz5PYXGR0SBxGz8DXIncYl/6yFc/+3Z/RuKjA/inf/sPUl5ZSV1dLc1NDUxOTtJf+Vx33XX83d/foMuyQ5JfWEzPXr21PPPmzmbnzu161JL8Vrb6zrdGF5IB13wH1HZ4/raalwU3tsRjWnzs0CG++jyPvLydVF+o0l8EiCY4QrxjHKFtFsGAoL/0cbFksw2fc2eO8c0XG9mV/w2b8g8SamkmEmym8Ju95O/9mvz8fezZm883BYXUNTbpRHthYTHbtm3lwP4ClLKQSdJyCwOxYxGOAciAK9+v/QQh/zZs2xZE/FAfsrzkT+9zxSr8JLlNZRMlSVlso7Hp5r9Eh21nH1JXnK/empK9Occ1xjkmW5Qv/CQRW9/9eYXLau7Pa67jrXgEOsCNR6Odyx3gtjOg8c11gBuPRjuXO8BtZ0Djm+sANx6Ndi53gNvOgMY31wFuPBrtXO4At50BjW+uA9x4NNq53AFuOwMa39z/A+J4CNotV6rTAAAAAElFTkSuQmCC)
Required answer=40×3=120
Q-(10) Sol-(5)
Required answer
= ![](data:image/png;base64,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)
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