A man sold two shirts at Rs. 800 each. On one shirt he gains 25% and at the other he loses 20%. How much does he gain or lose in the whole transaction?

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Rs. 100 loss

Rs. 90 gain

Rs. 50 loss

Rs. 40 gain

answer is D.

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Detailed Solution

Concept- Here selling price of shirt is given i.e, Rs 800. In one shirt he gains and in another shirt he loses. We need to find out the cost price of both the shirts and then compare the two with their selling price and find out whether he is gaining or losing.
The cost price of two shirts = ${"mathml":"<math class="image_resized" style="width:48px;height:11px"><span style="font-family:$ = Rs 1600

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oKt/R9v/2bBpTfNmeGflnr2p99+W78fi/YcPB9039XvNAth39XXLtQsAAABOiHnzvY+6y3wo727+R7RrZOUDRRd5P9r+r4uO9eQa9bo5dqY29f5jOyww72tfg/P6fWYB7Lv6uuXaBQAAACdEjlEZ/oU/7xxfVY47+Tza8CDv5l40F/3ZaPuzLh42rSiPrdfLyr1qU+8/phtifmA+b+78Pgbn9XvMAth39XXLtQsAAABOgJxxXf+F/8miY3mPRLtW1o+GTQMPR9ubdcuwaUU3R7teVr632tT7jyVnpc8LzHO2+lUxm9Nev7ZvwXn9/rIA9l193XLtAgAA4Lw1747qqeuFWE8G2vVay84zr+Vd1l9Gu959w6aBG6Ptzbpn2LSiPLZeLyv3qk29/xgyMP8k2v0yMO8f+pnjc/IhoHXPPgXn9XvLAth39XXLtQsAAIDz1kkKze+Ndq0Hi47VzBt5cth6GdzW/b8vOlaTx9br5R6LTL3/JjLwnheY57idPjDv7XtwXr+vLIB9V1+3XLsAAAA4b52k0Pz+aNd6qOhYzaPRrndYaP6naPvPFh2reTXa9R4vOkpT77+uVQLz3j4H5/V7ygLYd/V1y7ULAACA89ZJCs3vjnatTULeeSF83s2+yA+j7f86Fj889DB5TD54tF7vpmFTZer917EoMM/AflFg3jssOP/OoG/X6veTBbDv6uuWaxcAAACcAPPmeueIlXXNC82PCo3fjfaYO4qO5dwV7TpvFR3zTb3/KjIwnzdSZpnAvLePwXn9XrIA9l193XLtAgAAgBPggq4+i/Iv/J8WHas5HeVa+WDQ3OMwP402dDhTdCznmWjXOVV0zDf1/sv6bmwemPf2LTiv30cWwL6rr1uuXQAAAHBCzHt45W1Fx/JeiXKdZUa9ZKj+XpTH5YiUK4ZNR/hWtKNR3ik6Fpt6/2WMGZj39ik4r99DFsC+q69brl0AAABwQmTgW89pf73oWM63o1zjq66uLjoWuzXa4OG3Rcfh/hDt8TmvfFlT73+YDLDnBeZnu7pk0LeODNz3ITiv988C2Hf1dcu1CwAAAE6Q+6L9i/+vio6j1XeZ/0/58pF+HeXxeed2zvA+yry57KeLjuVMvf8818X2AvNeBuevRbvHLoPzeu8sgH1XX7dcuwAAAOCEeTTav/wvE5xf3NXTUR73u6JjeU9Euc6Hcfjd6td09VGUx/yx6FjN1PsPLQrM88OJsQLzXgbnf4t2r10F5/W+WQD7rr5uuXYBAADACXRvtKNa3jz39YsGfSn//1TMZnf3vTmSJR+suYlHopwPng8mzTWH++effxbtQ0x/MehZ19T7pwyxFwXm+SHFNiwKzvNDgfrcj63eMwtg39XXLdcuAAAAOKFyxnnecZ0PwxwGARkkZ4D8blefnPv/4WtPxWyu+RhyLMrZKPfP9/PBuarfW/Ze/58jxzH1/umBKPfYZmDeq4PzPK93FB3bMfw++wLYd/V1y7ULAAAATrjLYxbc/qWrt7r6ImZ3kmfl3ej5sNAMyrPninPHjC3D65w1/mLM7uru988/v3DutWXmjq9r6v37WfMvx/YD814G56/GbN+7qte2pQ6dBE/AcVBft1y7AAAAAHbgtthdYN7L4PyW+otbVIdOgifgOKivW65dAAAAAIyiDp0ET8BxUF+3XLsAAAAAGEUdOgmegOOgvm65dgEAAAAwijp0EjwBx0F93XLtAgAAAGAUdegkeAKOg/q65doFAAAAwCjq0EnwBBwH9XXLtQsAAACAUdShk+AJOA7q65ZrFwAAAACjqEMnwRNwHNTXLdcuAAAAAEZRh06CJ+A4qK9brl0AAAAAjKIOnQRPwHFQX7dcuwAAAAAYRR06CZ6A46C+brl2AQAAADCKOnQSPJ1cd3T1WlcX1y+M7MquHunq2a4+6uqrrr7u6vOuXunqsa6u/W/3+Kben92or1uuXQAAAACMog6dBE8nz/e6OhsH5/fS8uXRZFj9ZFf/joO9Mqx+v6tPqq9nZaidx4xl6v3ZreG57AsAAAAANlaHToKnk6MPkevzu43QPO9i/ywO9siQ+iddXTjouayrR7v6YtD3aVe3D3rWNfX+7F79e50FAAAAABurQyfB0/GX4fBvYnaXdX1us8YOzU9Fuf6HXV1ddJRuiFlYPTzmrqJjNVPvzzSG5y8r/yUBAAAAAGws5z3X4RPH0wVd/Txmd1nX53RYY4bmd0a7/o1Fx3y3RnlMBvw3FR3LmXp/plOf97yWAQAAAMDGhOYnQ94p/c+u/tbV77p6Mdrz2tdYofl1UY46yXq86DjcmSiPzTvELy86Djf1/kxreO6yhOYAAAAAjKIOHbPyjmWOjwzIn4pZiDz0arTnNmus0PyNKNfN8RhXFx2Hy976vf256Djc1PsznYuiPXd5LQMAAACAjdWznbMykOL4uKr+wjk/i/bcZo0Rmj8U7brPFx3LeSnadXLm+FGm3p9pXRLtecsHwQIAAADAxt6JNnwaI1RlevdEe27HOL/5LxE+iHbd+4ZNS7o/2nUyyD7M1PszvW9Ee94+LjoAAAAAYE3zZl//oOjguNpWaJ7hdL1mjkZZZx54HlOvlVWPmhmaen+md0u058yHHQAAAACM4rlow6fbiw6Oq22F5i9Hu+abRcdq3o52vXyY6SJT78/07oj2nOW1DAAAAAA29pdow6c7iw6Oq22E5jlLOu/qrtc8M2xaUR5br/dR0XFg6v3ZD3dHe87yWgYAAAAAG3si2vBpndnQ7J9thOY/jna9rFPDphXlsfV6WTcOm86Zen/2wwPRnq8/FR0AAAAAsKafRBs+PVZ0cFxtIzT/Q7TrZf1o2LSiPLZeL+vRYdM5U+/Pfpj3e+B8AQAAADCKeWMOzhQdHFfbCM3PRrte1hXDphVdFe16Wc8Om86Zen/2w9PRnq/8fQcAAACAjeVDP+vw6a9FB8fVNkLzr6JdL2eMb+KCaNfMmjdXfOr92Q8vRHu+PMAYAAAAgFFkgFqHTx8UHRxXY4fm835Xsj4fNq3pi2jXzbpo0DP1/uyPPOf1ufpm0QEAAAAAG6jv3t30zl32w9ih+S3RrpX13rBpTflBTb1u1vcGPVPvz37IDzLq85TXMAAAAAAYzevRhlDfLjo4jsYOze+Mdq2sHJWxqRejXTfrjkHP1PuzH26M9jy9XXQAAAAAwIbmPVTvrqKD42js0PzeaNfKem7YtKbno103Kx9U25t6f/bDvN/rvIYBAAAAwGgejjaE+kXRwXE0L1zMWjc0PxXtWlljPDg216jXzbp/0DP1/uyH30d7nk4XHQAAAACwoRxBUYdQzxQdHEdjh+YPRrvWWL8ri0LrBwY9U+/Pfpj3rwL8yxgAAAAARpUhah1C/avo4DjaVWg+xmiMDL7rdbNyz97U+7Mfvoz2PH2z6AAAAACAEbwfbRB1WdHBcTN2aJ53XddrZY0RWj8b7bpZw9B66v2Z3rXRnqNPig4AAAAAGMlfog2j7iw6OG7GDs3vi3atrF3NFJ96f6Y373dgjPE8AAAAANCYN/ri/4oOjpuxQ/O7o10r67lh05pyjXrdrNyzN/X+TO+paM/Rz4sOAAAAABjJddGGUa8VHRw3Y4fmt0e7VtYLw6Y15Rr1uln5kNre1PszvfeiPUc3FB0AAAAAMKKPogyj/t3VJUUHx8nYofk10a6V9cawaU35AU29btb1g56p92daV0Z7fj4tOgAAAABgZH+ONpS6q+jgOBk7NL8gZh+k1Ot9NmxaU4af9bpZuWdv6v2Z1rwRUmM8BBYAAAAAFsqAvA6lMkjneBo7NE/vR7ve10XHenKNet0Pi46ZqfdnOvMe1npv0QEAAAAAI7sw2vDw46KD42Qbofmz0a6XdfGwaUV5bL1eVu5Vm3p/pjHv2pT/6uDyYRMAAAAAbMO8uzlvLDo4LrYRmj8c7XpZtwybVnRztOtlPTJsOmfq/ZnGndGen5eKDgAAAADYkhx3UIdTvys6OC62EZrnByj1elm517oWvc95H9ZMvT/TeDLa8/NQ0QEAAAAAW3JRV19GGU79q+jguFgUBm8Smqcc2VOv+fuiYzV5bL3eYWOBpt6f3crRLF9EeX5yVMtlwyYAAAAA2KZ8+GcdIv6w6OA42FZo/qdo1zxbdKzm1WjXe7zoKE29P7v142jPT46RAgAAAICduSnakCqDdI6XbYXm+QFKvWbe+Zt3BK8qj8kHOtbr5e/gIlPvz249H+35ua3oAAAAAIAdeCfKkCpHtlxcdLDvthWap3ejXfeOomM5d0W7zltFx3xT789ufCvaDzXeLzoAAAAAYEd+Gm2Y6MF7x8s2Q/N5vx9nio7lPBPtOqeKjvmm3p/d+GW05+cXRQcAAAAA7Eg+EPSTKMOqN4sO9t290QaOWWOE5hd09V6U6+aIlCuGTUeYdxdx/guHZUy9P9uX5/iDKM9P/osXDwAFAAAAYDKPRRlYZZn1fHycjvb8ZV07bNrArdGu/dui43B/iPb4VR44O/X+bNe8B4D+X9EBAAAAADuWd+1+FWVo9VzRwT57LdrQMSvvQB/Lr6NcO+/c/l7RMd+N0b6v00XHcqben+35W5TnJ/8lwZVFBwAAAABM4H+jDRfHulOZ7bk/2vPW19sxzoiW3hNRrv9hV1cXHaVruvooymP+WHSsZur9Gd+8DzXyXwYAAAAAwOS+0dUXUYZXGVKyP3L288VdfTdmIy3+Gm3gWNf7MXug4o+6ujxmM+xznXU9EuV88E9j9rDOXLeXf/5ZV58N+rLGeLDj1PszruejPEfuMgcAAABgr/wqygArw8mriw6m9GCU52fdyhnhm8ixKGejXDPDznyYY1b+efha9l7/nyPHMfX+jCM//Bmep6zfFB0AAAAAMLG8izlHXgxDLHebs0iG1zlr/MWY3dWdc/Gz8s8vnHttmbnj65p6fzZT/0uJj7u6rOgAAAAAgD2QD48cBll5t7nZ5sCYvh/tXeYPFR0AAAAAsEfORhlm5R2hAGN5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width="368" height="147" alt=

The total selling price of two shirts = S.P. of 1st shirt + S.P. of 2nd shirt
${"mathml":"<math class="image_resized" style="width:128px;height:38px"><span style="font-family:$ Here, S.P.>C.P.
So, case of profit
Hence, Gain

S.P. - C.P.
${"mathml":"<math class="image_resized" style="width:128px;height:38px"><span style="font-family:$ Hence the correct answer is option 4.

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