Question
A ray of light strikes a plane mirror M at an angle of 45° as shown in the figure. After reflection, the ray passes through a prism of refractive index 1.5 whose apex angle is 4°. The total angle through which the ray is deviated is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKwAAADYCAYAAAB2gggPAAAgAElEQVR4nO2dWVRc933HP3dWZmVgNhh2EIsYdkmAhKzFi2LHdhJHjpsmtptzmtM0eWhP+9a39rQvfWkfetKHNG3TNE5sp14iH9uSZUWyViMJkASSRiD2RezLADPMevvg3BvQiiS2Efdzjo+PzTBzmfnO7/7+v1UQRVFEQSFBUK33BSgoPAyKYBUSCkWwCgmFIliFhEIRrEJCoVnvC0g0RFEkHo8TiUQA0Ol0qFTK936tUAT7kMTjcfx+PxMTE6hUKtLT00lKSkIQhPW+tE2BItiHIBaL4ff7GRoaYmZmBo1GQzweJzMzU7G0a4Qi2GUguQEzMzOMjIwwPT1NNBolGo3KltblcmE0GhXRrjLKu7sM4vE4c3NzjI6OMjk5KfuvoiiysLDA2NgYo6OjhEIhEjFxKH0hE+HaFQv7AERRJBAIcO7cOYLBICaTiaSkpCUfbigUYmxsDEEQcLvdJCUlJYyljcfjTE5OMjQ0hNPpxOl0otFsXFkkxru6zkQiEW7evMmpU6fw+XyEQqElPxdFkVAoxOjoKCMjIwSDQeLx+Dpd7fKJx+PMzs7S3NzM8ePHGRkZ2fDXrQh2GWi1WnJzc+nq6uLUqVP09PQQDoeXPEZyD0ZGRhgZGdnw7kE0GiUYDDI2NobP58NgMJCcnLzhox2CUq31YGKxGHNzc5w8eZJf/OIXhEIhXnrpJbZs2YJOp1siTEEQ0Ov12O32DR09GB4exufzMTc3R0lJCU6nE6PRiEaj2dCi3Xjv5AZErVZjsVioq6vje9/7HmazmS+++IL29vY7LKnkHkh+YSAQ2DC3WelwFY1G8fl8fPLJJ8RiMWw2G1arFa1Wu6HFCqD++7//+79f74tIBARBwGg0kpaWRlJSEj6fj7a2NlwuF8nJyXccVKLRqOw2GAwG1Gr1uoshGo3i9/uZnJxkdnYWm81GeXk5drsdrVa7rte2XBSX4CGJxWIEAgEOHz7MBx98gN/v5xvf+AZ5eXno9fo7/FaDwYDT6cTtdmMwGNZVtGNjYxw5coSxsTF27dpFWVkZer1+Q3yZloviEjwkarUas9nMvn37+O53v4vVauX3v/89165duyN6ALCwsMDo6CjDw8PMz8+vuXsgiqKcoZNe22QykZKSQlJS0ob3WW9HsbCPiJT5OnnyJP/2b/+G2+1mz5495Ofn3+ELCoKATqfD7XbLLsVaiSQWizE1NcXly5dJT0/HYrGg1+tJTk5Gp9MllFhB8WEfGSkakJGRgcfj4dKlS/h8PlJSUrDZbGi12iXuQSwWIxQKEY1GMRqNa3YbXlhYwOfz8atf/QpBECgpKcHhcCScZZVQBPsYCIKAVqvF6XRis9m4du0aXV1dWK1WkpOTUalUS0QRi8UIh8PEYrFVvR1L0YCJiQnm5+cxm82YTCYqKyvJyMhIWLGC4hKsCKIoMjExwZkzZ3j33XcJhUI8/fTTFBYWotPpljxWsswOh4P09PRVOYjF43Hm5+c5evQow8PDvPjii5jNZsxmM3q9fkVfa61RDl0rgCAI2O12nn32WV599VWMRiMfffQRPT09RCKRJYKUMmLj4+MMDw+zsLCwKhkxyZqr1Wp0Oh02my3hxQqKhV1RpIPYqVOneP/995mammL//v14vd47Ql6LLW1aWhoGg+GxM2LxeJyRkRHa2tpQq9V4PB70ej0ejychD1h3Q7GwK4hKpSI5OZmGhga+/e1vo1araW5upr29nWAweNeMmFSaePvPHwYpdBUOhxkdHcXn8zE5OYnH4yE7O/uJESsoFnZVEEWR2dlZTp8+zVtvvcXCwoLs0xoMhjtisXq9HqfTKVvEh7W0sViM2dlZbt26RTAYZG5uDrfbTV5e3h0+dKKjWNhVQBAETCYTu3fv5s033yQSiXDs2DFu3rx5R5UXQDgcZnx8nKGhIcLh8EMnF2ZmZmhpaeHtt9/GZDJRW1tLXl7ehq5rfVQUwa4SUsFMdXU1P/rRjzCbzZw9e1bOiN3NPZBEu5x6WlEUiUajcifEwMAAubm5JCcno9frN2yV2OOiuASrjCiKzM3N8cUXX/Db3/6W0dFRXnnllXverpOSknA4HA90D2KxGDMzM3R0dBAIBMjIyMBqtZKSkvJERAPuxZP3FdxgSFVee/bs4dVXX8Xj8fC73/2O69evEw6H7xDkYkt7vyLwUChES0sLn332GQsLC3g8HpxO5xPns96OkulaA1QqFTqdDofDgdVqpbu7m/7+fpKSkkhOTr4jTSud+EVRRKvVLslMSZ2609PT+P1+kpOTEz7d+jAoLsEasjh68Jvf/IZQKMSePXvk6MHtH4Ver8flci0pmFlYWODjjz9GEAQqKyvJzMxEq9XekQZ+UlFcgjVEih7s2bOHN954A1EUOXbsGB0dHSwsLNwhOClOK5UmhkIhFhYWaGlpYXx8XM5iJVI96+OiWNh1QKo9aG5u5q233iIej1NTUyNnxBajUqnQ6/XyAcxoNDI/P4/NZsPhcKx7Ufhaowh2nRBFEb/fz/nz5/mv//ov5ufneeGFFygsLLzDF5VcgZmZGUwmE/X19dhsticybPUgEvIvTqRJJfdCEAQsFgu7du3ijTfeID09nUOHDuHz+e6IHoiiiFqtXlK2uFlJuCiBNImlv7+faDSKIAjygSPRbo1SPa3L5cJqtTI4OEhbW5vcwrI4UyU9Vupm0Ov1CdHlutIknGDhj6Edn89Hf3+/fPhYLN7VQhTFO6quHgepfcblcmEymWhvb2dwcFAebCGJVnqdeDxOKBSSRbuZDlyQgIIVBAGNRoPBYODq1ascP36czs5OgsEgBoMBi8WyqrdMKXMVDodXrApKEl92djZOp5MrV67g8/nkeQG3D+uQ2m3i8fiatttsBDTRaJTx8XF6enqYmJhIGL9QsjRTU1N8/PHH2Gw2GhoaqKurw2KxIAjCiv8t0nN2dnYiiiJbtmxZsdcRBAG1Ws3k5CQmk4mmpiai0Sj79++nrKyMpKQkAPm1pIyYNIBuJeppEwFNPB6np6eH9957j7a2toT5pqpUKoLBIMPDw9y6dYuRkREmJiZoaWlZtQ9PEATC4TBjY2NycYvRaFyR55ZmXS0sLMjjPAcHB7lw4QIajYatW7cu8VkX19MCm2YSuBCNRsWpqSn6+/uZmZlZ7+tZNoIgMDk5ydGjR/nkk09Qq9XU1dXx8ssv43K5UKvVq/K6gUCAzz77jKmpKfbu3UteXt6KiGR6eppTp07R3d1NVVUVn376Kfv27ZMTB88///w9M2JSwUxGRgZ6vf6JFq1GpVKRkpKCxWLZMDOgHoQ0JvLDDz9kamqK7373u+zYsYPi4uJV/9D8fj8DAwP09vaSl5fH9u3bH9mHlA5w4XCY/v5+BgcHqa2txWazcezYMbZt24bNZuO9997jk08+4bnnnpOntdw+n3Z8fBxRFMnIyHiiLa1G8p1WyyKtNKIoMj8/T39/P1arlRdeeIGKigoKCgrWZIZVNBolJSWFwcFB5ubm0Gg0jyyQaDTK9PQ0169fZ35+np07d5Kenk5XV5ecxvV6vUSjUT744AOam5tRq9UUFRUteU3JPZiYmECtVuN0OjGZTE+kaBOuJF0qXFar1ezevZv09PQ1rVJSq9W4XC4ABgYGiEQij2TRJZH5fD4uXrxIYWEh1dXVCIJAX1+fbH2tVitPPfUUarWa//u//+PYsWMAFBUVYTKZ5Lvi4vm0oijKBTNP2kEs4f4aQRCwWq2Ul5fj8XjWvKROp9OxZcsW1Go1V69efehxmlLD4OzsLJOTk8zPz1NeXk5ZWdldHy8IAgaDgV27dvHaa69hNpvlSeDBYPCOhInUiCi1kCeKm7dcElKwKpXqjjrRh0WyYA8bklKr1bjdblJTUxkfH2dkZIRoNLrs35dawZuamrh48SL5+fnU1tbi8Xju+bdIRS/V1dX85V/+JVarlZaWFtra2u5op5F8Yumwlijj65dLwgn2QdxLiFL9QSwWIxaLEY1GCQQCzM7OEovFljxG+uduYpYSF1lZWaSlpd1zauHdiMViRCIRxsbGaG5uJhKJkJKSgslkemCngCAIpKSkUFNTwxtvvIFarebUqVN0dHTcdeeCtN1meHhYTjI8CSScD3s/4vE4CwsLxGKxJbn2eDxOOBxmdnaWaDQqW6GzZ88yPz/Pn/7pn2I0GgmHw8zNzRGPx9Hr9ZhMpnse4goKCuju7qalpYU9e/ZgtVrva+1FUZRnEOh0Or71rW89dDGL5B5s374dgHfeeYdPP/2USCQiJxcWC3Nx9GAjj69/GJ4YwUqhrtOnT+Pz+Th48CBZWVmo1WoikQitra28/fbbTE9Py6nOmZkZamtrga/CVW1tbXz++ef4/X68Xi/79++Xw2S3k52dzdatW2lqauLatWsYjUZSUlLuem2S5W5qaqKpqYkXX3yR4uJijEbjQxftqFQqTCYTVVVVxGIx3n//fS5cuABAaWnpkgPg4ujBk7L8LnGv/DYikQhdXV28/fbbHD58eEmaORKJ0NnZydGjR5mamiIlJQWn08nOnTupr69Ho9EwOjrKiRMnCAQC6PV6Ll26xOnTpwkEAnd9PbPZTH5+Punp6Xz++ef09vbe1Y2IRCJMT08zPz+PwWAgOztbHtH+qIU6giCQnJxMfX09r7zyCikpKZw4cYLr16/f0bkguQejo6OMjo4m/EHsibCw0u325s2bRCKROw5jkk+bmZnJ66+/zoEDB1CpVHL8Wa1Wyztk33zzTdLS0njnnXfo6upiYWHhrq8pWaxnnnmG//mf/+Hq1atyJmrxaw8PD3PixAlSU1OprKykoaFhRcoCJfdg9+7dCILAO++8w/HjxxEEgeLi4iUhL2BJGjeRQ14JL1jJgty4cYPx8XH27dvH8ePH73lgkjpYJVFLwjEajdjtds6cOYPBYGB6epotW7bct8ffaDTi9Xrxer00NTXhcDjYvXs3BoMBWHrIknzqlZxzJbXPbNu2jaSkJH71q19x4cIFQqEQFRUV8nVILBZtoroHiXW1dyEWi9HX10dPTw9qtZrs7Gx5taZ0i5ZO9rFYjNHRUTo7O+nt7WViYoJIJIIoirhcLrZv3865c+d499135dqE2z/0xWg0GlwuF88++yxjY2N89tln9PT0EAgEmJqawufzodVqefnll9mzZw82m23FY8aSe1BZWcnrr79ONBrl4sWLcmPj7SGvxe7Bo4xFWm8Srh52MdLg3kOHDqFSqdi1axcdHR10dHSwe/duebOf1PR34cIFWlpa+PDDD/n444+Zm5sjJycHs9mMwWAgIyODhoYGXnzxRXbv3k1mZuZ9s1iSxZb2BZw7d46pqSksFgs3b97kF7/4BS6Xi7KyMpKTk5e9WmhwcJCjR4+ye/ducnNzH/h70hfS5XKRmZlJd3c3TU1NmM1m7Hb7Xetpw+EwkUjkvpGQjUhCuwTT09N8+eWXjI+PU1paiiAIjIyMMDMzw9TUFJ9++ilFRUVs3bqV6upq/vEf/1Eu4fvss884d+4carWaH/7wh1gsFlm48NXtdjmHImmyS319PYFAgGPHjhGLxdi3bx/PP/+8nPdf7VuvSqUiKSmJqqoq4KuQ15kzZxBFUS6YWfy3SMvvVCrVis2nXQsSWrBzc3OcOnWK5uZmfD4fZrOZ69evMzk5yU9/+lOsVisOhwO1Wk1qaqocdpK2AXZ2dnL+/HkOHjyI2WyWRfqwqNVq7HY7tbW1nDx5ksuXL1NWVsZTTz1FamrqmglBEATMZjOVlZVEo1Hef/99GhsbEQQBr9crF4HD0gF0giAkzEEsoQVrMBiorq7GZDIRDofl0FE0GsXhcFBbW0tWVpb8ISy2MB6Ph5SUFIaGhuRs1+N8WNL+rvLycmZnZ0lLS8Nms635yEup1uKpp55CEATee+89jh07hkajuWfBTCIVgSe0YG02Gy+88ALPPPMMsVhM9mePHj3Km2++SUlJCQaDgZGREW7cuIHJZKKoqAi9Xk9vby9zc3N4PB7ZCj8KsVhMDqklJSWxf/9+zGYzLpdrXeezqtVqtm3bhlqt5re//S0nT54kGAxSWVmJ0Wi8o552dHQUURRxu90bOnqQ0IKV2p4BeVbq0NAQ8/Pz9PT0UFZWhkajYWpqijNnzjA5OUl1dTVGo5Hm5mYsFgv19fWyO/CwxGIxgsEg7e3tnD9/nrq6OkpLSzfErVVyD6qqqlCpVPzsZz/j6tWraLVatm7duiRevLhgZnFGbCNa2o35NXoEYrEYQ0NDtLa2EolEuHjxIsPDw4iiSEpKCtnZ2QwMDPDTn/6Uf/7nf2ZwcJCnnnqKAwcOLPHtHub15ufnGRoaYmxsjOLiYnJzczdUvl4SbU1NDT/+8Y9JTk7m9OnTXL9+XS5NlJB82o1empjQFnYxWq2Wmpoa/uM//kMuXpFCSQ6Hg29+85s8++yz8hjLpKQkjEaj3Cb9sExOTnL58mVaW1t59dVX5XTrRuvckFrIKyoqUKvV/PznP5cTKxUVFXdUiS0+iEkFMxuJJ0awUs3o4kC/ZEFUKhUajQaLxbLkdx6lSyAejxOJROjp6eHGjRt4PB6Sk5NXrHt2NVCpVBgMBoqKinj99dd5//33aWlpQRRFvF6vHNJaXJq5Ed0BeIIEK3G/IP/jEo/H8fv99Pf3EwgEqKurw+Px3DcbtlGQMmJSddoHH3zAiRMnUKvVbN26VT6I6fV6eTLiRrtbwBMo2NUkEAhw/Phx2tvb2bt3r1zOt1F81uWg1WrletoPPviAL774Qq6nTUlJwW6343a7MZlMG/LvUgS7DKLRKLOzs3KpYU5Ojrw0YyNaofshZcQqKyvRaDT8+te/pr29naysLIqKiuQZXxtRrKAI9oGIokgwGOTcuXPyeEyz2UxSUlLCiVVCGvVZWVmJIAgcPnwYk8lEWlraho7BgiLY+yJVe83NzfHJJ5+wa9euJZ0CiYwgCCQlJVFdXU1ZWRlqtToh3BtFsPcgGo0yMDBAKBTCZrPxgx/8ALfbjdVq3fAf6nKR6mml0FUifAkVwd6GFNYJhUJ8+eWXdHd38+KLL941ZvmkkAhClVAEextSjW0kEiEzM5OkpCRSUlIS1l990lAEu4hYLMbw8DBffPEFJpNJrg141FoDhZVHEewipP0JQ0ND2O12zGbzEztULVFRBLsItVpNWloar7zyCgaD4YmIBjxpKIJdhNTukpWVlZBbaTYDimBvI5Fm5W5GlJOEQkKhCFYhoVAEq5BQKIJVSCgUwSokFIpgFRIKRbAKCYUiWIWEQhGsQkKhCFYhodiUgl3ptfQKa8emqyWYnp6mqalJHl9kt9uVIpcEYtMJdmxsjH/5l38hIyODr3/969TU1JCSkiJ3wSqF2hubTSdYaXZUOBzm5z//OWazmW9961vU19fjcrk2xORBhXuz6QQrUVNTg9vtpr+/n48//pjPP/+cnTt3sm/fPlwu15qssld4eDalYAVBwOPxUFVVRUZGBm1tbQwMDNDY2EhHRwcVFRVs374dt9uNwWBYkb1aCivDphQsfNUdKy05zsrKYmxsjKtXr3Lx4kV6e3u5cuUK5eXlbN++nfz8/DVfc69wdzatYCXi8TgqlUpeCuf1euno6ODKlSv09PTQ0dFBaWkppaWl5ObmYjab1/uSNzWbXrDwVVxWrVaj0Whwu93YbDYKCwvp7u6mtbWV5uZmtm3bRl1dHXl5eaSnp2MwGBSruw4ogv0D0hBfaVu2tFijoKCArq4urly5QmNjI0VFRbz88suUlJRgs9nkXQGKcNcGRbCLkDJg0r91Oh1paWmkpqZSUlJCX18f165d41//9V9JT0/nhRdeoKGhAavVik6nU5oX1wBFsHdh8ch0tVqNyWTCYrFgtVpJTU3F6XQyOjrK8ePHaWlpoaamhurqaux2O0lJSYqrsIoogl0G0oA4s9lMSUkJBQUF9PX1cf36dXw+H6Ojo1y6dImKigrq6upwOBxotdplrf5UeDgUwT4EoigSi8XQaDQUFBSQnZ1NZWUlra2t+Hw+BgcH8fl8lJWVUVZWRk5Ozroul3sSUd7Nh0TaDi4IAjqdjszMTBwOB6WlpbS3t9Pe3k5/fz/t7e2UlpaSn59PTk6OPCxYsbiPhyLYx0Rap2Q2m8nJyaG8vJzW1laampo4deoUDQ0NPP3002RlZWGxWORaBUW4j4Yi2MdEiigstrhOp5Oamhp8Ph+XLl3in/7pn9i6dSsHDhygpKSElJSUhBjPvhFRBLvCaDQatFotRqMRi8VCVlYWnZ2d9Pb28u677+JyuWhoaKCsrEyJ4z4CimBXASlzlpqaSmpqKtnZ2fT19eHz+eju7ub999/n3Llz1NfXU1VVJcdxlQPag1HeoVVCWvO5eMVQfn6+XFjT1dXFhx9+SGNjIzt27KCqqgqPx7Pel73hUQS7BkjhMGnfa1ZWFv39/fh8Pnp6ejh69ChXr16lqKiIqqoqotGo4iLcA0Wwa4QUCtNoNCQnJ2OxWCgqKqK7u5svv/xSjuWOj4+j0WgIBALE43F5V5gi4K9QBLsOiKIo78gqLi4mPz+fgYEBLly4wMmTJ+np6WFgYICRkREmJyfR6XRKEfkfUAS7TiyuDtPr9WRnZ+Nyuaivr+fkyZO88847/Pd//ze9vb08//zzFBcXYzKZ0Ov1m1q4imA3CHq9HqPRSEpKCoFAgFOnThGPx+np6eHtt98mOzub2tpatmzZgtVqlYtsNhub7y/eoEgHM51Oh8FgIBwO09DQwJYtWxgbG5PTvjk5OTz11FNyHHezxXAVwW4gBEEgFAoxNTVFMBikoKCAvXv3Eg6H6erq4vr16/T09PDOO+9w7tw5qqqqqKmpwWazbZqSRkWwGwhBEJifn2d4eBiLxUJqaipJSUkYDAaqqqooKCigvb2d5uZmBgcHmZiYoK+vj5KSEnJzc3E6nU98WaMi2A2CdACbm5ujr68PQLaa0s9sNhs7duygurqaq1evcubMGU6cOMHly5cpLy9n27ZtZGZmkpqauuR3nyQUwW4gBEFgbm6OGzducO3aNebn5+WfSVEFQRDQarWUl5dTWlrKwMAAX3zxBcePH+fMmTPs2rWL2tpaucP3SQuHKYLdIEhdDX6/n6mpKSoqKnA4HPLPJNFJopXmgOXl5WE2m6mqqqK1tZXr16/T3t4uZ82ysrJITU19YqrDFMFuIObm5hgcHMRgMFBTU0Nqauo9s1xSVEGr1ZKVlUV6ejq5ubn09fXR2trKxYsXOX/+PJWVlezZs4ctW7ag1+sT3lVQBLsBEASBeDzOxMQEIyMjaDQavvzySxoaGnC73ff9XUm4giDgdrtxuVzk5ORQUlKCz+ejq6uLtrY2tm7dys6dO/F6vZhMpoQ9mCmC3SCIosj09DQTExNkZGQwODgI8NCiEgQBp9NJamoqW7Zswefz4fP5GB4e5tChQ7S0tFBRUUFhYSEpKSloNJqEchUUwW4QYrEY4+PjTExMsH37dsrLy3G5XA9V+HL7wSwtLQ23282OHTtobGzk7NmzXLx4kb6+PrxeL2VlZXLrjkajSYi5CopgNwjBYJBbt24RDAZJS0t77BLDxWPxjUYj+/fvZ+fOnVy/fp3PPvuMzz77jPPnz1NdXU1lZSV5eXnYbLYNb20VwW4QpqammJ6eJjc3F5VKxZEjR0hNTSU9Pf2xnlcSvUqlwmg04vV6SU9Pp6+vj6amJhobG/H5fHi9XkpLS8nOziYlJQWdTrcSf9aKowh2AyD5r1NTU+Tm5mK1WsnOzsZkMq1YLaxkcQ0GA9nZ2TgcDvLy8hgcHKSxsZFPPvmE06dPs3v3burr65fMxt1IVlcR7Abh1q1b9PX10dDQgMfj4bnnnsPj8azKSV7qfjAYDLjdbjweD+Xl5bS1tXHixAmOHTtGQ0MDe/bsIScnZ0ON0VcEuwGYnp5mcHCQaDRKYWEhCwsLHDp0iJdeegmr1bqiopUstmRx1Wo16enpOBwO8vPzKS0t5ebNm7S3t3Pp0iW8Xi8NDQ0UFBRsiBGjimA3ACMjI8zOzuJyubDb7YyOjjI4OEgwGHxkcdzr9xYnDRb7t3q9Xk5AlJWVcebMGVpaWujs7GRsbIyioiK8Xi9ZWVlyync9rK4i2A3AwMAAkUiE4uJiAJKTk3nppZfIyMh4LB9WKvCOx+Py/5MKaRb/9+Kfa7Va3G43Bw8e5JlnnuHkyZN8/vnnHD16lCtXrlBaWkp1dbWcEl5ra6sIdp0RBIGuri6CwSClpaVyA6JOp0OlUj2yYCORCN3d3cTjcbKzs9HpdIiiyPz8PAMDA0xPT6PT6cjLyyM5OXlJ94L0mrFYjOTkZL73ve8xMzPD6dOnOXLkCD6fj6qqKrZu3UpOTg5ms3nNYriKYNeZSCTC+Pg4ALm5uWi1WmZnZ/nwww+xWCykp6c/9KrRaDTKwMAAv/jFL5ibm+Pv/u7vcDqdRCIRfD4fR44cob29HZvNxr59+9i7dy8ul2uJpRVFkcnJSX7/+9/j9XrZuXMnxcXF3Lx5k/Pnz/Ppp59y+fJlqqurKSkpIT09HZvNtuqrohTBrhOSBRsbG2NhYYGUlBQcDof8YaempqLT6eRhHA/D3NwcTU1NHD16FI/HQzgcRhRFgsEgly5dQhAEDh48iN/v58iRIxQVFZGWliYLVhAEwuEwnZ2dDA8Ps337dux2O0ajEY/Hw5YtW+jo6ODChQv88pe/lKMa9fX12O12+e6wGsJVBLtOCIJANBqls7OTpKQkMjIyUKlUxONx7HY7r732Gh6P56FcAkEQiEQidHV1EY1Gyc/PX2I14/E4s7Oz8kyE8fFxPv/8c6LR6JLnicfjjI+P4/P5SEtLIycnB61WC3w1Rj8rKwun00lhYSH19fW0trby0Ucf8d577/Hcc8/xzDPP4HQ6V2X8kiLYdSQajdLR0YHZbCYrKwtA7jo4fX/yLPgAABHqSURBVPo0+/btw2q1Lvv54vE4Y2Nj3LhxA7PZTGFhIZ2dnbJLodfr2bJlC01NTbz11ltoNBqqqqqw2+1L3I54PI7f72dkZISsrCzsdvuSg5pGo8FkMslx3MzMTNLS0vD5fPJU8srKSmpqasjIyJA7fFciqrAxosGblFAoREdHB0lJSUusqd/v5/Tp04yOji77uURRJBQK0djYyNzc3JL+Lgm9Xi/XDUQiEfR6PU8//TQOh+MO/3VhYYHZ2VmsVitms/kOsUlF5EajkeLiYg4ePMhf/MVfUFVVxfz8PGfOnOHXv/41H330EV1dXYRCocd/w1As7Log3brHx8cZGhrC6/XK3QXxeJzU1FRefPFFMjMzl+UOSD5nb28vnZ2dlJeXU1BQwKFDh+QvQVdXFw6Hg+zsbL7//e/LAtXpdEsSCfBH8fv9foxGozwS9H5I1WHf/va32bt3L2+99Rb/+7//i8lk4ic/+cmKzcRVBLsOCIJAMBikr68Pk8mE2+3GaDQuecziQ9eDPmSVSsX09DS/+93vGB0dxWw2Mzc3R2dnJ5OTkxw7doz+/n6++c1v4nQ67zgQ3R6FkAQ7Pz+PXq+X/df7EY/HCQaDdHd309HRwczMDAUFBaSlpZGeni5/MR4XRbDrgCTY4eFhPB6PLCJp5pbf7+e3v/0tFotFdhXuh0qlYmFhgQsXLjAwMMDZs2dRqVQMDQ0hCAI/+9nPKCsrkw9XiyMP9xKR1Mkgift2Kyw9Jh6PEw6HmZub4+bNm3z88cecPn2aiooK/vzP/5zy8nIcDseyrPRyUAS7DqhUKubn5+nt7cVmsy05WImiiEajIS0tjaSkpGXFYKPRKC6Xi3/4h38gFAoRi8WYmZnhl7/8JZOTk/z1X/81eXl5ZGZmEovFHvh80vh7s9lMKBQiGo3ecdqPx+OEQiGmp6dpaWnhyJEjdHd3U1lZyd/+7d9SXFyMx+PBaDSuaFJBEew6EIvFmJ2dZWhoSG5VkYjH41itVr7xjW+QmZm5LJdAFEX0ej0lJSXAVwIeGRkhJSWFubk5MjMz5U02y4nrCoKAXq/HbDYTCAQIBoNYLBb5+hYWFpicnKSlpYVTp06xsLBAWloa9fX18hJpk8kkd/auJIpg14GFhQXGxsbQarWyFZKQ4rM3btwgNTUVu92+rOdcPHBDFEU6Ozvp6OggGo3S0tJCXl4earV6STTgfs+VlJQk+8KSLxuLxWShtrS0MD09TSwWo6ysTM6ESUmD1UIR7BojFWv39/fjdDpxOByo1eol4zfHx8f56KOPyMrKIjc396F9P8kqb9u2TV4SshyhSgiCgNVqJS0tjZGREaampgiHw1y5coXLly9z69YtAKqqqti7dy/Z2dnyGNDVLoZRBLuGSAeX6elphoaG5MXLiy2SlOmSXIKHFYC0EKSuro7y8nIAkpKSMBqNyxatSqXC5XJRXl7O22+/zTvvvENycjIDAwMIgsDOnTupqqoiLS0Nq9W6pqWGimDXEOnkPTU1xdTUFA0NDdjt9jtCTElJSfIgjeX4sLejVqvRaDQYjcaHFnwsFiMcDuP3+4nFYgwODtLc3ExNTQ379++nrq6OjIwMuX1mrVEEuwYsbr8OBAIMDg4iCAKpqakYDIYluXyVSsXo6Cj//u//zuuvv8727dsf+TUXcz/hSj+LRCL4/X56eno4fPgwZ86cIRKJ8PWvf51XXnmF4uJikpOT17VdRhHsKiJltObm5jAYDCQlJTE9Pc3w8DBut1s+ed+OVqvFYrGs2SC3UChEIBDg6tWrHD58mJ6eHvLz8/nhD39Ifn6+3AmxEXq7FMGuIoIgsLCwQGtrK5mZmVitVq5du0ZfXx/V1dWYTCbC4bD8WMnHNZvNfO1rX8Pj8TySS/Cga5JKG8PhMLOzs1y7do2mpiYmJibQarXs2bOHyspKSkpKSE5OXvUa14dBEewqEw6HGRgYkIV59uxZbt26xf79+xkbGyMcDuNwOJaEtuLxOCMjI2RnZ6+4RZMEOzU1xZUrV2hqamJ4eBhRFCkqKmLnzp2UlJTc0/qvN4pgVxmtVktycjLNzc0MDQ3R29tLPB6nvb2dYDCI1+tdcvCS6gIOHTpEeno6OTk5j30NUmVVLBbj1q1btLa2cuPGDfr6+ojH45SWllJXV0deXh4Gg2HDDtEARbCrinTiz8vL4/Dhw1y8eJFYLIbFYmFwcJDKykrS09PlFKzkEhiNRurq6nA4HI/c0yX9jiiKRCIRRkZGGBwclIfDxeNxiouLqa2tJS8vD4vFsmIFKquJIthVRBRFeSW9Xq9nfn6ecDiM0+lk27ZtVFRUYLPZ7iiettlsfO1rX3vgqM0HIZ36R0ZGOHv2LC0tLcRiMWpra9m1axe5ubnyILiNLlQJRbCrjEqlwmAwYDab0el0WCwWnn32WXbt2kVKSsod4Se1Ws3w8DA//elP+f73v8+2bduW9TqSbypFJoLBID09PRw/fpyLFy9it9vZt28ftbW1slWXLGqiiBUUwa4JKpVKntnq8Xh48cUXcblcdz1QSS7AcnfMSoKLx+NEIhHm5+e5efMmzc3N9Pf3YzAYeO655/B6veTm5uJ2uxNuJuxiFMGuAYIgkJWVRUFBAW63m6KiIvR6/V0FKbkE3/nOd8jJyXlgWEuy0FL47Msvv2RgYACtVktJSQkVFRUUFxeTmpqaEPNfH4Qi2FVGEpTVaiU/P18u1r4XUozU7/cTiUTuaWFVKhUqlYqZmRkuX77M5cuX6e3tRafTsXXrVmpqati6dWvC+agPQhHsKiOd/G/duoVWq2XLli3y/7ubiKTVR0eOHMHpdJKRkXHXx926dYvOzk7a29sZGhoiGo2ydetWqqqq5BpbrVb7RFjVxSiCXQPi8TidnZ0YjUby8/Mf+HiVSoXD4VjScSAdpmZnZ5mYmKCtrY2LFy8yOTmJ1+vl6aefxuv1ynHUJ8Wi3o4i2FUmFovJRdCZmZlyyeC9LGw8HsfpdPL9738ft9stB/z9fj8DAwNcunSJCxcuAFBRUcEPf/hD8vLyMBqNcu3BkypWUAS7qkjNht3d3RgMBpxOp1ysfS9UKhWTk5O8++67HDhwQJ6SfenSJdrb2xFFkbq6OnlpnMPhkNunn2ShSiiCXUVUKhWBQIC2tjZMJpM82O1+s1vhq9lYly9fxuFw0NbWxvXr1xEEgbKyMioqKigoKJBdhs2GIthVRKrW6unpwePx4Ha77ytWtVpNOBxmbGwMjUbDF198QXZ2NiUlJVRVVVFSUoLb7d401vRuKIJdBSQ/MhqN4vf7mZubw263y5mtxWKTHuv3++no6KCtrY2rV68SCATYu3cvDQ0NlJaWyoM1NrNYQRHsqhIKhRgdHUWv1y+5hUuHrmg0yuzsLMPDw3R1dXHz5k1mZ2fRaDREIhH27NlDbW2tvGpTQRHsqhIMBhkdHcVut+NwOORgP3zlp966dYtr167R1taG3+8nKyuL7373uxgMBn7zm9/I9QeKWP+IIthVJBgMygMtpAmBMzMzjI2NcfXqVVpaWpiZmaGiooLXX3+dwsJCedrKT37yEzmqoPBHFMGuEqIoEggEGB0dxe12I4oiXV1d3Lhxg46ODoLBIEVFRfKpf3GP1+joKB9++CHPP/+8vKhD4SsUwa4C0nxVafdWJBLhzJkzXLlyhYWFBaqrq9m+fTsFBQVkZGTckeufmJjg2LFjspjXo516o6IIdgVZ3OYyNzdHS0sLfX19jIyMUFhYSGVlJV6vl8LCQlwuF3q9/q4Nfjk5OfzN3/wNXq9XEettKIJdQeLxOIFAgN7eXi5cuMDFixcxm81UVlZSV1dHdXU1aWlpD8xMSRMMN3P46l4ogn1MJFHNz88zOjrKzZs3aWxs5PLly6SlpXHgwAFeffVV0tLSlj3SZ2xsjLfffps/+7M/w263r/hii0RGeScegcVTAgOBACMjI3R2dnL9+nWam5uZmZmhtLSUH/3oR1RUVJCamvpQFlOlUsniVqzsUhTBPiSLB7qNjY3R2dlJf38/U1NTJCcn4/F45CUV27ZtkwdRPAx2u50/+ZM/eaTJhU86imCXiTQePRqNMj09zfXr17l48SK3bt1ix44d7N+/n76+PkKhENu3b6ehoQGbzfZIQf9QKMSNGzdIS0uTl3UofIUi2PuwuLY0Ho8zOjpKa2sr58+fR6VSUVZWxmuvvUZ2djbDw8NcuXKFzMxMdu/e/VhD08bHxzl8+DAFBQVkZ2crkYJFKIK9C4uHUCwsLDA+Ps61a9fo6OhAo9FQU1NDUVERJSUlZGVlMTs7y0cffYRGo6GhoYHMzMzHylC53W5ee+01cnNzlUzXbSiCXcRiaxqNRpmYmODmzZvytm2j0UhlZSVPP/006enpqNVqAoEAjY2NDA0NUVtbS01NDQaD4bGuw2AwUFBQgMViUXzY21AE+wekwpRIJMKtW7e4efMmPT09TE9PYzAYePbZZ9m7d6/ctgJfhbKuXr3Khx9+iNfrZe/evXfdGviwDA4O8p//+Z+88cYb1NTUKGGtRWz6d0IKHc3PzzM+Pk53dzdDQ0OMjY3hcDg4ePAglZWVpKamyi3T8FWv1tDQEJ9++qk8C8vj8azILVyr1aLX6xN64MVqsakFKy1F8/v9DA0Nce3aNdrb2ykuLua1116Tl6JZLJY7hDMzM0NbWxsdHR384Ac/oKysbMWm/qWmpvLaa6+Rk5OjuAS3sWkFK5X6dXZ2cvbsWcbHx/F6vfz4xz+mpKSE7OxsTCbTPQXT2NjIsWPH2Lp1K5WVlcteT7QcwuEw3d3duN3uFX3eJ4FNKVhRFLlw4QKNjY0EAgG2b99OZWUlhYWFZGZmYjQa5czU4rkA8FWMtLu7m/PnzwNw8OBBUlNTV9QSTk5O8vHHH8tt4YoP+0c23TuhVqsxGAwsLCxQUFBAbm4uDQ0NFBYWYjAY7qieCofDhEIhTCYToigyMzPDiRMnmJiY4KmnniI/P3/FBwCbTCa2bdt2x4YZhU0oWIvFwr59+8jIyGDXrl0UFxffd4b/zMwMw8PDFBYWEo/HaW5u5sKFC5SXl7Nnz55HWi30IGw2G3V1dUrHwV3YdIJ1uVz81V/9FTqdDp1O98CFE6Ojo1y6dInMzEx6enr4/e9/j91uZ8+ePatmAUdHRzl06BDf+c53sNlsimgXsekEq9PpSElJWZbQ4vE4g4ODnDt3joKCAo4ePYrf7+fll19e9U6AQCBALBZTXILb2HSChfsvWZMQRVHeAHP+/HlMJhMtLS0888wz7NixA61WSywWW5U4qcPh4NVXXyUnJ0eJw96G8m7cA1EU5WTC4OAg7733HlarlfT0dLq7u2lpaaG7u5tIJHLfWVmPgtQPFggEVvy5Ex1FsPcgHo8zOTnJ8PCwvC6+v7+fxsZGOjs7sVqt2O32VVm65vf7OXXqFCMjI4pgb2NTugTLQdpp1dPTA4DT6aSwsJDi4mLy8vLIysoiOTl5VXxMnU5HTk4OZrN5xZ870VEEew9isRi9vb0MDQ1RWFjIN77xDQ4cOIDX671nt+tKkZGRwZtvvonNZlOSBrehvBt3IRwOMzQ0REdHBzk5OTzzzDMcOHAAt9u9JguC9Xq9XBWmRAmWogj2NuLxOH6/nxMnTtDX18dLL73E17/+dVJSUtYsHioIgmJZ74HyrixCFEVCoRBffvkl586dIz8/n927d5OamqqElzYIyqewCOmg1djYiMVikd0ARawbB+WT+AOxWIz5+XmOHj3K3NwcO3bsoLy8/LHbXRRWFkWwfyAQCNDa2sqZM2fIzc1l3759a3LAUng4lE+Drw5aPT09HDp0iOzsbOrr6++5C1Zhfdn0n0gsFpMrsoaGhti7dy/FxcXyziuFjcWmFqwoigSDQc6dO0djYyP19fWUl5djtVrX+9IU7sGmFmwkEqGzs5Pm5macTifPP//8ire7KKwsmzoOK4oikUiEjIwMtm3bhsfjUeaybnAEcROXA0WjUaampggEAnLaVWFjs6kFK4qi/I8081VhY7OpBauQeCgmRSGhUASrkFAoglVIKBTBKiQUimAVEgpFsAoJhSJYhYRCEaxCQqEIViGhUASrkFAoglVIKBTBKiQU/w9KUzwNtBatdgAAAABJRU5ErkJggg==)
The correct answer is: ![92 to the power of ring operator end exponent](data:image/png;base64,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)
Related Questions to study
A rod is fived between two points at 20° The Coefficient of linear expansion of material of rad is and Young's modulus is
. Find the stress developed in the rod if temperature of rod becomes 10°
A rod is fived between two points at 20° The Coefficient of linear expansion of material of rad is and Young's modulus is
. Find the stress developed in the rod if temperature of rod becomes 10°
We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means
We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means
We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means
We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means