<p><img src=\"data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJIAAACOCAIAAABVDcY5
ID: 2055825 • Letter: #
Question
<p><img src="data:image/png;base64,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" alt="" width="139" height="135" /></p><p> </p>
<p>Given that the angle between the polarization direction (along E) and the x direction is <img src="http://www.webassign.net/images/theta.gif" alt="" /> = <span>52.9</span>°, what is the ratio of the E-field in the y direction to that in the x direction?</p>
<p>Ratio of E<sub>y</sub> to E<sub>x</sub>: ????</p>
<p>2.</p>
<p><img 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FOVSiUu0WB+pqfR/HhErTP4Uz+IC1uE7yXwv4N9hMXT9/1isYi1F3RtNpuNRsMYw+VUly4SkV6vx6sURVGhUNBqk5lFqjNdDHP0hnXap+LVUXcwGLTbbWbwUfXBp/P5vXl9eklR1r6h3xKlofEpTbV6va7livF4HMcx0voXjoe/22g0dNoTSuFp94bsuyE9nU65vwBPer0eQvONMWdnZ8YY/Mnj9TRHaf3Dhw/tdhuLKo6ns0pm7gx8ynV7kzrtU/HqqCsiruseHR1R6BcRz/OW5Pcu7NOL8+j9ydu3b3GP8abeQSEED3cUU4M21xeOR2YWFytv0FDv9/v4Cc/zhsOhriC/r4B2Mp1OO50Ol8p3796Vy+VKpVKpVMysmoTMdJeFTVVvb2+73S7jruhlgF/aGMPHYPM67VPx6qiL+dvMarLqKjML83uJTJ/ejFT76dMnLAWiVtp+v/9PxKnaPrGAfb/fzxuPDo1mzJbruizSS+x3lZz5griYsEajkV42z87OuOUpFAqMl8y4iERdLtwmzrBfvnxhVDPe2bBO+1S8OurKwwpSeCDQEHBhfm9en14wDfdV8xNHZoL17u7uUObu+voaB+smgwvHw4DnTBx13qO8qouzbVg+VekdrygXI3IMcAxSPnC/QDO2nmG2iRYUIMluXqd9Kl4ddbWjUruU8GJJfu98n95MaRvEY5hZXOS8DJtxOMnD+ht544G9fXFxwWxEWWRA7jEWbhCwmwjD8OjoiIYuG9AMBoM4jhuNBkMsFvZVxQyLDS3TANNZU4sN67RPxaujrihnsoi4rgvhdEl+ryzq08v8Ejp7RcVaslgkqh/JLMixVqshgQE+qiXjCcOQgQE6TlNy3DZruE5bgSVuudvbW8dxqMwBXKJBKlR1YrkSnOT+/l5PylzGgyDImFGb1GmfitdIXdxdXWxZW7+Z/N68Pr1MMMIBnKRbrRZnASpAVPP4i9qaWjgeKhMMDOKkIIvEktVfpu1AnhhGExcMmUwm2ieENC/ePnJvMplw+YUVjZuOuQ+nwu3YvE77VLxG6orIZDKB1xd/4hYuzKdNkoR2FG7P/f19oVDQrcl0LXVRHOPjFYYhb3ChUKAXmnP//Hg4VHg+MPfHcczyaPSChGFYLBaXjMdCZtvURqNBXjH3SzdYxgus5C+Sgv94vEbq6nDzTNzMwvxefWu5QtZqtU+fPk0f9s69ublhMopeHLiew9jGwfziwvFMp1NmFCMvgoUmOZczRnI0GuWN58lXZ9+ByA28Tmdd45AgzQNA2hcsfPMYvEbq6lgo2lH4aD6fNhPb6Lqu67r9fh9JPygx5zgOu2MDlUolCAIWhZTZ4glq/fjjj3Eck1cLx4M5fjwewyrGlHF8fMz0CVaxQ/rh8vFYxHHMQAtRdXz1vJzZ08pLlJt7PF4ddTFxgieZbNuF+bTMVXBdN0OGzG2mvq+XVhHp9Xr84ng8zuSILhkPkCQJdlkMwMYDBOezKOs6bzwWonSgNE0Hg0GSJG/evMEeBKR98+YNjnRddzQavVSR18fj1VGXio5+4pnMPZ9Pi3WS0y12xdB1SRWIfiLiOA7mafqc8MTQ0EIpjOPjY/D248ePeeMRkW63y2BMkl+bCVShMKSF41ndldt5ZPRh3OhCoYDq5L1eDwfAoYBjXqS0+iPx6qgL+L5Pp+L8QqfzacExCjksYSEig8GA3834hDzPOzk5QTAAXcQyWzDxo/pJWjgeRl/ynN1ut1KpuK5LTmrxcMl4LGTGPcx6f//9d71ehzsDDsKTk5NMIdUXaWjyeLw66o5GIzp+aQOXy+W8fNp6va7dSEwigW8DcZGTyQS3GWkJjG3UN5uv7+/vEWIhIlB3F46HzmfHcXTolczyWkTE8zyUlZaZr2V+PCu7cHsBKn+tVgsXh5doOBzWarX50LQNtxF7PF4ddYEgCNi+hZ7bJfm9XDm1MDMej1EsEtAqP6rANZtNUaTVxc08z6vX6/xofjy6ejOAAaAdGSMlAYY9543HgiHo2qiZL0YF9zLL4rxI885H4pVSdx7cmuo+uoyFeHw+rSix/jE6raj8Ie0IWTIe3/eRGo5Vl1/JG8++QgecjkYj/H+fmk+7JB8Yt5vePoa76tPqW6aXZV1Pe02w1P0KnRaLaGHS9Un5tCLi+z73ovV6HU6jJTotHw7cb7RlyBsPq2dgCuC3loxnLxGGIXMzeAHZoPxJ+bR5gaUIooSprJuk0xRi0BsmTV3ZGy/W6pS21P0K3VtIZrvWZ+TTZopFHhwcMJhZFum0WpGCdPTN8TiOc35+LsokBo3z8nv3ErgXg8GA2xAQ5nn5tPPpHLqcoL6evI/4iXa7nQmH1tPlWn0NlrpfEYYhsm3//vtvvIOH46n5tPoj6MOZrgvzOm1GtEDoZd54UI252+2yECzIv2Q8e4kwDGnazBfuenw+bV4Spd7rikipVOIBaZrCBY2qOkYVxOJpUYbBGswbglaJdDj7k/JpmSNGt9bh4SE4vESnhRN7OsPy8fBTMBP1/vPGs8fQyV7IFpCZI+rx+bRL8oFxVZF06bruv/71L60aYObV2fn8Im73ut37+3+DH4kwDMfjceaJR3levDaPy6fFs4JHB3MwqsBKjk7LWoR62wYnysLxYMWG4Ver1ZjJkDeePUav18MWA6kjqNLMTx+fT7swHzh+2IA3SRKs2IjBwmxeKBQqlUqj0Wg2m3g8MsLSWkNiLHW/AnP22dkZZmidZ//UfFpst/j129vbUqm0RKc1xqAhA03idNbSbuF4MHFcX18fHR3BJQN/Sd549hU6guL8/JwG7ZPyafPygfHpcDicTqc8M+bTMAz/+7//28yBo8rc3zVh/2/wI8EdLDVeTs9PyqcVlWdPn9MSnVZ/Ec5PHbA1Px7dWUMPacl49hJaiT04OOC89tR82iXFcXXkI6ZIWlvGmMPDw2q1aozBkluv1xl7x5PbipAbwnQ69X0fzQoQwMiP8vJpcS/hKKpWq5QKSDy8oA4kMz4zNV/yddq88WAqQSFY2MzL+wYvHM9qL91KkHHqsEpu3vG0kGkMb0DK5rXlYttsNlGMkgWxNnN5LXWzMLNyylzfFubTotgyOTydTvv9/unpqRb65KGLkvKjlpHydNq88WScxhiPfmQzfYPzxrOdYDl7nQSCNGn8F9Bw2BhTLpfh7edCRzl33QBj37x5c3h4yHLQxphisfju3TtjjG6YvMZhrPXsuwU4M25vb3/99VfdWHlJfi/geR5WQqP6huk8eLw4Pj5mjQvQGB/l6bR54xkOh+xnx4L9eX2Dl4xnq6Dzabn8It4br/HRwcGBUZmPmP6CINhkukWlUkEtO+L4+PiXX37Ba1jOuFNrHZWl7ldkSoRiieNEPp9POx6P4XAStZTN+4TxbIVh2O12Dw8PKeizwUKeTps3HlrFtMoyGpLk9A3OjOfZF2p9YP+n+cml0+loVxB7ZAN0s2+gMxOmV4pw8axV+nx2NIpmr28klrpfkaYp2/OJSLVahcS6JJ8WwO2hlfvmzRvojayGw+cMsRm0w5frtHnjwZ9fvnxhPUouvNNFfYOXjGfbgGRmvGZxRjgCtJdBE/vu7o4bjc0jEzkns6aquBHrLtNpqZuF67pYXbXXZD6f1vd9LLask4JCM2ZWE3j+zjmOg6xuot/vL9dp58ejK/qDqJ7n0cU63zd4yXi2CtwsDAYDUqLdbjPDkWTGwVp9CYJAq7hrRTJr44rXiWq9rfOBNwBL3a9A4islhMlk0m634bpcmE9LgnGh4CJpjEHYXa/X+/DhA0xiEfn8+XO9XscxKB/Fn5Y5nTZvPPw5Rlzgwc3rG7xkPNsGBJPgNdw/zMfgMbqpqogMBgNexs3MTfw53Aia6JxNtO2zVqegpW4WSNyRh3vI+XxaTLF81DATw7rGF/WTpBsum1l7BPxKnk6bNx6d6YYwPZ4WL3QjMl0fLzOeZ1+fNYGV9IwxlUpFNwQXFTrK2rqUbWmGcO1dK3D9O50Ondt6Hsx4ItZ6nS11HyDj4zUPWxkwsIZRzfP5tDhSMzCTONpsNjNNbp6q00ZRxD50DMDiL2a8mkvGs27shE67u7DU/QpwNYoi/bjo+BgWeYXBmZdPKyKO41QqFVFzsPY00k2NplVP1WlpobH9gszm+FKpRFPt7u6OgUHLx7NW7IROu6Ow1M0CG9ogCC4vL9+9e0e3Z6Y5WF4+LfxVIoKGgCIyGAxQU3I6nSJB/OTkRHtZnqTTyixEJE1TjIQ5Q61Wi0Y4z583njVeQRHZKZ12R2Gp+xVsdasf68vLS5qaWDfw5CGGeWE+rcwEjEzUpN6jcruri5g9Vafl8TgVkkUzW2WcfOF4NoCd0Gl3F5a6i9HpdMCNVqvV6/XoztVVyzMcY6EZmIKouiozzsdxrB1FRqUQylN02nK5jPo4+k0OqVwus+UCPN5549kAdk6n3S1Y6n4FniG4iFCLCI94mqZv377lYbBpJT+/V2Zl1kUFb+iKKiiAhs2nPF2nFZHffvtN/yjLZaVpiprv+Dk6aZeMZ33YFZ12d2Gp+xULPSJQLPjE8xFkTYb5fFrdPJLERuKRPPSy4rRP1WkvLy+r1SoDAzIBPZ1O5/z83Pd95irkjee7LtbjsBM67e7CUvcBYHaiJR//TNO00Wjo4k+yNL9Xn8rMSqLw036/rzMZnq3TIv4Zx+B9HFMsFuEWymgzmfGsG7ui0+4uLHW/AYZDcKXSdc9lTqclbVAYCfahrtmrdeAlunGz2WS0BuuPwm0rKkWJbjP90/hRDHjJeHhyeVzdYKvTbhUsdb+NTqfDGothGGaUlYxOO69qHB0d4YUupAw0m8083bjT6fz8889hGNIFrW3jSqXieR7Tj2S2t+x2u77vn5+fs+Ra3ngGg4FOK31k9I/VabcHlrrfABc0KjoohrJEp9WbtN9//x02Kv2orMZ+c3NTKpXydGOZrcnY0zI/ad6i7nQ6+JRFs9C5m2v1wvHwHe0HXqKmWp1222Cp+w0gH2i+822eTotnNEmSyWSiQ5pFxHVdbt64Kubpxihfxk91qDPWt3K5HMexLkEINQhO7HK5jPPkjafT6Wgj/zE5CVan3SpY6j4BWK8Qn7REp6UHFbTvdrv1en3hUzuZTJboxiKCJEH+eXNzk6YpC+7o2SRTRhQJEiDMwvHgHcwROh1iCaxOu1Ww1P0G9BZU16/Bp/M6LR5uHEDP1uHhIR50vXgidSFPNwZc1y2Xy2EYslIk0Ov1Op1Ou92Wubqz+Ik4jlutFqMg58cDO9x1XU5AOpV/Hlan3TZY6n4biDHE60ajAVs3T6dlIz9+5ebmJggCHfOs16U83Zhkw4KGRXU0GumS/1zrULfZ8zzmDDuOg1KSeeNpt9u6JovjON90/1qddqtgqftt8EEkkbSKm9FpZcYWEUFVdFitrVaLUU0yIxsLX8zrxqjrLarwDU1i3fOK49EDzriyFo6HFoQuF7wkysrqtNsGS91vgxu88XjcaDSodnABzGQOLNRpJadPb55ujGQjnpZNT2g5B0GQpmm5XHZddzKZkDNoby8i9/f3hUKBJgP4T6vYdV2kT8gsOEwXnVwIq9NuFSx1vwFua2kbwwMEprElHCKfQRUcn9Fp8/r0ylLdGM6wer2O8/N9rpOj0YidBEkkVpCbTqf1el0LM+PxOI5jOsY/fvyoP8VprU67E7DU/TbYPQB4+/atbq8MjRevjTFLdNqFfXrzdONutwtFB0eiMBXHcHd3x6lhoc3sui4CmI0xGCpCOHRYJS18VKVFmQGr0+4KLHW/AVCLT+qnT596vV6r1SKZwSjakHk6bV6f3jzdGMBiOxgMzKyJqx4M83iNMfQVsfYdoE8bhiE+6vf7tOFpVmjr1+q02w9L3W8Ajyw4w4ebhanIW7yfpukSnXZhn179W1o35oYZP+r7PmQYrH6ZUETk+untMVxiKKDTbDavr69xfKYJHTQtXQje6rS7AkvdbyNj+iZJMhwO+XBj94jXCBVcqL2AcaMAACAASURBVNPm9enN04119o92JmvgPL1ejzW0SDPdLjBjCMjMZaWbrdCbbXXaXYGl7jfAqovBrI+jiNAjxQaQYPWS/F7J6dMrObqxiNze3mrPEzbDnuc5jsPZhGJpvV7Xbc2Y6oDx12o1eKHpo5KHxNYrrdVpdwKWut8ACy+CwGyuOV8jipRbqNNKTp9eydGNyR9dwB2RyZxBcELsYJn9i99lu92MR4qjxftIA2y325ku0lan3X5Y6j4fVHHJLvqBFub3Sk6f3oW6ccaoFhHP80qlEgMSP3/+zAM4Hq0bL3RWgbpYtNGTTkR42u3simCxEJa6zwQEXpkRD+xdrtMu7NObpxvLrIUvPqWFjL0ojFWWcUb8I/3eeu/NF/BCw8lUqVS45Y6iCIPZQIVXixXCUve7UKlUkASnXbuySKeV/D69C3VjCjBc0hFCXC6X2blPHq6Truty/RwMBjphSGac/4//+A+jOhVyv23mSrdbbDksdZ8PrldAr9eDq3ZJfu98n9483VjUStvv9zWpDg4O+CdoPJ1O8Q5WeyYhcKeqIzF1SVcs72maonTGdnbNtlgIS91ngm3dqPHKXFlJrdPm9enN042x5Ga8uHd3d7e3t1BxRbmCdUtOvEBrP+YM1Go1Y8xPP/2ETzMVISH2LowJsdha2Lv1XfA87+TkJAgClJWBxrskv3e+T6/k68a6EIeG5hjrRcusl4JRfZLwK8VikRqP3tbS0QW0Wi0t3lpsOSx1nwkd25jZIi7UafP69ObpxpkkpDAMeU7HcUBsHo/MW5C8Xq8jxtgYo1N2OR4dhgUg7vru7u6XX35Z5TWyWCcsdb8L/X4/juNmsylzRV7loU7LjzJ9evN041arRaGYmXrMti0UClhI5+MiQNqzszPEYDA7j9tdma26uqAkYG3mHULureIcj1ueSUZDVzt53T5JRik8XqdFnzF5uOOVRX16cVrdaky7mvlFSLhM4ofq8+bNG/qf5GExR1FytPac4U9tQbD6pE0S2k4sm2W5bcPMDa7qABo+TJn2Ga8Evu/TP1Sv17F1XJ7fm8F0Ol3Sp1eXtuGbOq0fbIS1XK1W9ZpZrVb/93//V0SYo4/mY3qiYd6PHlutVvv06ROXdwBOL4utwjLqoiOWzB4XxvFg6WDVhfUPchuRma0ODg502t28TisiQRCwFxliiaMoyuvTiysPOYdnYyo8XsBH3Wg0uJDSz8QkQSzjupiziBQKBbzANhgjEZE///yzVqvJzApwHMf3fRtitZ1YRl29C+JiyxsJ6qJeWaaX5CsBrwnyZlGtYolOG4ahLgoHLOnTOxqNfvjhBx754cMH/S0RKZfLoCjLYhCs+SazrTJOi4guGAKcMnTVSJnb8erqcxbbg2XU1V3VAdjPSNQmhzfTNm7bwF0oDZPDw8Nut5un015eXvK71GxBnozYgxPiqvq+f3x83O/3GaSF5CGQVitMXJld1wUVDw8Pp9Op7/uZclPM9cOfZObHjx/lYZwJ1aPXOTVvOXKpO5lM8GDFcXx+fo6aCSgsZox5+/btwhyx1wPs//Hch2GYJMnx8TE+WqjTvnv37vLyEgqQrrSc16eXig4/QmsFFq9gyh7T+nX2j+M4jUaDP5QkyXg8ZhVo3/crlcp0OsWMkBF4WZRDrI9qi5FLXRByNBohzFWHxYvIhw8fGG8grzXlGlMb6XF7e1sqlZbrtEAQBCzamNenV2Ype8Vikevk4eEhPnIcB0GX3LWKiOd5uBGM4sA9wq3kPcJ0w6BlndPf7/dRUBKu5slkoj2UFluFZQYzp/Ovhz7sf0N14dUGvjJeghbpEp3WPCyJTH7m9elFoWaeFpVooijS7+M8JycnOv8BiKKo3++zWCQGiR8lD8vlMgvEapFvPB5zjtBDtdgqGLaTgnWH2Rd3V2e6yMzbqXtGy2xxtvliBCc4XDdSN0+nxaVmCDGKKuMM3W733bt3urybTuKVmTVbrVYpAXAiwAs2HJvXjYMgqNfruj0vTw6uzpfFsdgqfK3TyfvKKRalQEUVHKVthn0Us9LsdkijVCrR8YOLSUfuQp1WZtOfMYZ74yiKUHGGpzKzmo9I4iXNptNpv98/PT3NCHjkW55uDA5fXFx4nkdbgD2KMl+0U/MW4p8SoTLL3oSLEivD1dXVP4fOgH4zItLv9x/T3PG14fj4mD1+GF2cp9NqQ9cYMxgMSqUSVzySCgFSmWqMnufp0nAiEkURU3CxkcnTjWXmjtJd7QHkDLJ+pTWYtxNfA99YwIH72Pv7ewYA+L6fpinD62RO+rOxr0S32z08PMSFYjsfLJJ5Oi3sl/fv35+cnDQaDc6kUHqRNO/7PgpTjcdjVDwXtbTO+6hBVyQtLNSNIQWlaYqJhgusLqnFWh+WvVsIo9dM3UJSlJtKO1o4hX/58mW+8aSFzGIzeFm+qdOKSKlUarfbvu/XajVUw9D5d7jmjUZDewTZ5x5/vnnzhtUzsBSz7vlC3ViUvATpCG+yoREDtlZ9eSxWAyMzWU/vvtj6Ff/KLNqW4fW005rNpr27GTiOg5bWRL/fX67T6rI4/BZmzExso+/7WGwxNWB3ikRcOB0yuUR5urGI3NzcxHH8448/Ms6Zg+z1ephBLi4uMkKDxZbga5kiRK4iDEOvEqKyYTLxN4ybpfBoAXz+/Jlt42Hr4vUSnVZUdEdGAcYLEFWn0dOfxHI2xhjkCfR6vQ8fPsANsUQ31rlETGkKw5AOjowcbbFVMCLiOA7qeuJB0csvYiGNMUhMgQflv/7rv6hYIID+pUa/hdCRwFjK2IhgoU7LQjn8tFgsoqycPiECJIrFIgjGpRiEx04Vd0SvutCBZZFuDALjhwqFAvsVsoAzXWiWvdsJw+RPYwzkH4gT3FbxKeFDqcvnY7l+heIB2lXqxnn03IpIv9/HwqtTOJ6q07JWK7fEOmUvoxtTYeLPkfyIZMYMi0I8eJ+2UhzHrVZLfySzDAdU5MA7C3Xj77uKFs/H15XTGFOv14+OjnifdNMamm1fvnzB40U/in4QXycY7cDlDpeIDz2u3lN1WvKK4VkiEobhEt3YcRws5nQXayoyjhW2N+7vaDRCVyTYCGxihBdM0zWqNDTesXEaL46vrEN1BWNMu92m5TwYDAaDAdjreR4fTW6u9EOz6YFvBzIEu76+xqUAPSDn6Nnt8TqtzBS7NE11oJvk6MaMpjg6OgLxeO9gBt/e3v7666+Z1vU6tykTSqn7ISzRjS1eCoYawH/+53/iIatWq5Af8WBpkw/tlfX3e73e6xT9uLIBk8mE7iiSqlgs6pyN5+m0/Dqu/BLdGNucjDWu9zLGGMwpvu+TeLqKOmxm/Ne0qi9zO17qxs++gBbfCYO1FJUWarVaqVRCzV5sjdAjR3d5BnzfZzyzvGLziekHuDjj8RgkLJVKrVZrMpnUarWMxiOP02nL5fL79+/1b/GjhboxswsqlYoukp6mKa0kfJdp98z1o26fmZc7nQ5370t0Y4sXwT97XWzGyuUyqIt3eC8z86v+86+//trggLcRtEuTJDk5OdESDgIeQNEn6bQi8ttvv+lfoXG+UDcW5a82s9Yk+ja5rgv5V5enRLe+MAyx0lYqFfjefN/XZgUW84W6scVLwYjIn3/+2W63S6USdrygLh7BjNmWMZPwfMwXbXkN4CrX7XZBWlw0URcEtui7d+/4rcfrtJeXl9VqNUkS7GZ1HPJC3ZgHaDF2MplMJhPHcbTC1G63wzDUSzE0pOvra3i5gDiOURGe0/dC3fi7LqLFd8AwwwtiI17AWsYzwdmX9wlWInS/TCWX1wZWqDk+PtaXQmfYYaF7tk4bRRHJwxx9mdONCQY/Zm4KsvNF7VrxK1EU0cuI3EOclos83V0LdePnXzuL78PXfnNkrL5JC3XFFx3tGoFNHUvkwW7UPbUAmL5gmud5qPgjcw3scQYchvBGxkJoNVVmziG8dhxHdyER5drVibU4ptlsxnHM32WxC9jn6OuHUGROvvhisVikW2v+/tZqNc4jdLyhEKzk6MYWL4IHngndjCNPV3yJQW4IOoJXO2ZhXzBwH5cIGwrENsL6ZT23IAh0ZOjt7S366IlasobDoeM4KBAnDzOl+/0+3VeVSoVe/cwSxwZCkGHns6b5owDr2o1Go2azmXd/GVCNovm6wM1y3dhiw/iarxsEgXZLoEJanq64l2CWBXaqINJwOMzMVtjTFotFkFYWRZLxge73+1jBbm5ujDHsZ5053qi+fmQgX3Ch63Q6mESm02kYhkEQnJycaMe1NmV///132My3t7e6sqfjOKiUIPn31xiDMGYdErtEN7Z4EXzd67J6cBRFcDnm6Yr7Cmot7FRAJiDeSERAWryDFdjzPB2HCDAQjRXMZZbgwZQ6ikk6r4OsBpfwo2gpllnosBhyX4okJJllOOitMoD/Ef6PCOHMu79RFB0dHTGXCAXfWah5Xje2eCmYIAgYLyWq9vISXXFfoTtQU7rExUFwhTzsbABxW5+Byxcb5+K0d3d3XFp1RVV+kV4lFrKCy5ef8sg4jvXqSvtW1PSBXXq324UjmjtVYjweL7m/NMX1CPN0Y4uXgpHZdDsYDPhUYVLP0xX3G6jFxQpSIG2mCnkYhuAVH25eHD7QaE2iv8WQ5jiOqc2A/GaWQSlKJRKRXq/X6XTa7bY8zNcbj8cIfqScozsYcEI5PDzMVIHUHF5yf7EDxwzCHMDlurHFhmFE5OrqCk9SkiS4JWmaLtEV9xLQP9kaL45jlonHKkdPFTcOeJ8RFwAuICiNs7GzbrVa5ZGZ3YdeVzEpaLWcn9JrzV5kMiMSfGyMbRaRm5sb7IdJV/w6Jui8+8uicxnNOU83ftpVtlgd/lH/6GNkl7eFuuILjXPTMMZQAZKHofbgBuNAWfg2nUFm21TNz8lk4rpuuVxO05TNqVltk7+oyYCfxs+Zh9m2ItLv93XhIVEecnT00zdRZjzXrVUX3l+u+Vh45x3XebqxxYaRm6+HKvgHBwfcAu2WdYRSwyKCzbyOXmAbHhaRIL58+YK4FFH+qpVAh0PoMIz5EAsargv79IpakDNV/ljSfTqdYq7JZA5gvaVnS3J0Y8w7kH9RAyBJkjzdmP9BXVlyv8WILUEudXH/jo6Oer0enY27lSSkE2gze9H5MshI1kHxRFE+21Uh05kaAAm/fPmiq5ZnKL2wT+9wOOSan6ZpoVDg+dkVGYGKruuijA50XbqLgYW6ca/XA/OPj4/5i3m68WAw0BHamcbfFuvDsix5XZNBdm27i+mfay/geR5nH92to1gswhUkIv1+nzxf4VSFlHoRabfbnU6H04quAcarjcEv7NNLIRcxxnhtjBkOhyBPpllZHMcXFxf4H1Gs4mBkTjfmz/V6PbqvdSwKQN2Y73AAYqvqbwTLDGadL46lSces7xDu7+/1yNkJWkSQIMXSH3wWdWni1YJUub6+ZriSbvCFweT16SWZWQWOGi/e1xma+r8J+kGnxZsLdWMUmuWchQZoHMm8btzpdHQwps1J2Bi+UZsGFVXwcOxW6AzWGV2fTVTUrswyLubTniC6yHrcp8PhMI5jzIa6MiMzAXRsoyzq04sRkrc8Q6vV6vV6LLyq+R/HMUv/IckWHf0W6sYyM8JlrjJ7nm6MH6Lv3VJ3M8ilLvvN8eb98ccfGxrU6sBsWKwMLHGIfFdORrrvzsJYqO8HQyxFUQW1jnnAaDQ6OjoipRf26dVGNYfneV6apm/fvuXP0TGB/zImhflU23ndmAkJGNhgMLi4uKA/b143hrbkui5PzlR+i7XiG6suHpqDgwPcoR1Ks0YZRLyGZjMcDtEMfjqdMlhqMBjgsEyIYsbzvBKwzZ/neQylIEMwhuFw2G63B4NBXp9eeKRYg5KhI4hdxbAzaUz4FHHpo9EINzFPN5aZVSwzzxbiOvJ043a7zTJ38jD5yWKtyKVupo3VRgazSuABom2JlNq8gzNPPLBaw08bwOxyoKcJsBcJmKISehb26RVlLZOEaZo2Gg3dNEhmYTao9ghFRzvqZE43FlUEC4d9Uzdm48+8mioW60AuJ1kBEH+Wy2U9/W8e26bTPhUsa0yDnBEROOCR+b2iVFzONcz4Ncbw/6hXP8al408U06KhkaZpuVxGa1/4mfDTjNB4zHjkoW5ssW4s8zDz9XA4xIT9soFvW6XTPhV64gAH6FV+Un4vM420pQDOdzod9uZDtq0oyx+ThW59Lopmo9EI1er4DufKfr9P835+PMt1Y4v1YZklnKl78rI6+7bptM/DdDrFUgbK6bKp8uj8XhGpVCpBELBtryhnMqOyaCVdXV3RTuHCC9zd3TGEgzOCzgHWRfAWjidPN/6+62TxbeRSl0IoXY5nZ2dbEiWzVTrtkzAcDrniUZt5Un6vPAzeEJFer4edAio85jkmGBTJa0IzhHm8zG3Sn6Lo3JLxSI5ubLFWLFt1OR/L3OOyeWynTvt4aIOZsY1MVHp8fi/bi1HjlUV5SKAxfFTUaeFbQpkLlgpgLoSI1Go1xK7rX+SanJdvvFA3Xu3Vs5jHN9gIYsD7j6yXTQwqH9uj0z4V2mBh9am7u7un5vcCnuednJwEQYBML2i8DF02qs8Iv4KJ4+rqan4KZqshfpSxmbVzOzOe5bqxxfqQS132sOLt//LlC70+m8cW6rRPAobBXA4dmSRPye/Vpf8yCmqaplRlGo0GDBAwFm3BmBuABEPHcbiJIOsqlQp+HdXV9a/n5Rsv1I0t1o1lqy5KgcrDCNtNDCpnMLJNOu3zoLNwoihidaHH5/fi036/H8dxs9kUJQLxBcVhXQCdE5/neXrjKrPNCBQmOqtYyBYnyRvPEt3YYq3IpSKefpAWc7Pv+8VikTeGHWuet4fcdZ12M4Dpi9WPKyoDJzIV3hbm9+oWvkzNxdaU8ZU4QEdK48KC0ply8PIw3xiY141XfiksMvhG0h+NH9zXXq+HmZU6AZj8vIyindZp1w1ekPkKjL7v096u1+uYQ/Pye+Vhih8tZIZz6YJYuBHtdhtpEhwGYqQz4xGRTqezXDe2WB++nTkEc6jT6eDhKJfL7Pgm32GF7odOu1bAIZQJS8zsAg4ODkjjhfm9cRzjTX4ROQ+ZvY9OFXRd9+joiDGYMrsvC/ONZalubLE+5FKX+1u+8DyP2QgkFWj8nbFvu6vTrg8ZmwL0w5xF7xH4jCiovPxeUSutrlYrIsYYdGygKR6GIX1gOOFwOMzICpl848yAbc2qjSGXunTbErhPt7e3tVot4yZ9Rlf7XddpNwBUO+C1/b//+z9R6UfcAB8eHna73bz8XvZV0GeGKMVPsWYyAcj3ffIzUwlgPt84Tzde21Wx+IplBjMSsmW23lIu0rbWZDL5nll2d3XadYNeJf365uYGLALNsJ2hpz0vvzcjE2gUi0UaxpgKdYCUdnHl5RvrAUuObmyxDixLP0A1QG0MY1J3HAcPBJ8tnbH5SOy6TrsZYKeKyH5eLkxzNE9ub29RhmZhfm+mWGQYhrpVsrZ+eU4Wi8Q76BIsOfnGebrxOq+KhcgS6lK5oaLA6uoiUigUMo15nor90GnXCoqr8jADljzk/MWKVvP5va1Wi6sl61fo6Zhmc0bmzYhPefnGS3Rji7XiybNjnr5nddqXBUOaOcNq01fm8ntlZvhA40VAJc82mUy0FxrRI3iN6AueNk835vHj8Ris3m8xb/N4MnWX1BO2Ou0LwhhDy1b79pbk9/KLYDL1J6Y0yVz8HL5+e3ubJEm1WoUlv1A3rtVqnz59YjEN4ObmZjX/W4tnUDdP37M67YsDNKNnUXsQ5/N7ZRZ7fHt7++uvv2oPgv4X59TBVQS6jeXpxrCZYQU4juP7/t5vcDaM57sT8vQ9sTrtSwDsQt9NXWVScvJ79S0zxmDJ9X0fXwFvM9m/mS6t79+/h0q0RDfWxz/Dl2mxBM+k7ry+Z3Xal0Xm6nENzMvvTdNUT6/VahVOLPJQz7bs+ot3dK+jPN1YzxcMd3+G/m+RhydTd7m+Z3Xal0IYhp7njcdjUI4OfHw6n9/LL7qui9VVX3zf98FGXYgbBzC+ClviJbrxYDBYqABbrATPWXUX6ntWp90G0F4lwfLye9FPmDyfTCbtdhttULhiu66L21Qul3UpPN0QPE83RrUN/OhkMsEXrWG1QjyZunn6ntVpXxYoWJdZALm6LszvBVhfVm9NgyAAFVHDlUsr43BQyEaW6sbj8RjFIgHrg1wtnrnq6o2QzPZOfOfw8JDG1YrGafFdANPmg5x06n+1WmU4FGsJkooZ3Zhl0yVfN9adR+U19VXfDJ4jDsnMLcEFls3mEPiKQgqUGS1eEAhE1+EZuIMQ+TgFT6fTfr9/enpKBYjhWSIShmGj0eBEjKZkoH2ebswdkP7ii9c22yc8Z9WFKYUNjOu6xpg3b95kZnTtLLF4WYC3kH+0BUt4ngfG4ibC/8T+g1hgS6WS3uBMJpMoirh3Xagbw4PNPCRrMK8WT6Yu/fu8kdo5ibsFK2swGFjqbgPG4zF3v1gkUczVcRwwTQctcgqmAoS7GYYhQt/+/vtv/b7k6Ma69RF7Mlj2rhDPWXXDMKQkiNInrVaLN4/RUTZpcxtABmra6CmVLiX8WS6XEddBZGKhgclkwkrOskg3poKA89tcopXj+SEZeIGoVKj2SCTAfgam1PNqVlmsEDqpAE4mBKtSgYchjXrreAcRjgTrRWY6ZYtidZ5u3Ov1EBd5cXHBtt0WK8Fz3FSsYERXBLY6X89ojIjoGr8WLwh4m9DaC+/A4qXHiDcR8+zl5WW1Wk2SBHGL3BbhsLOzM6ze6KMt+bpxGIZXV1d4reM6LFaFZ15Q3iTM2cPh8PDwkLfKGINQDSvVbhWiKIKrwnXdTEFWEBWzLbP5uGKzXjQXXvbsBOZ1Y3yKUg1aQ7JYFVZ2NQ8ODpjShV0uE3E5r2MjhEkaFhoeCMdxcKdttM2LA/euUCjgruk7kpffm1cXWnJ0Y1auHI/HeGFbaT8DK6MubxuDk/v9PpReXRM08yJNU0au84sWL4v3799z4Q2CIOOwmM/vXVgXOk831tEaYuXD78DKqKsVAuQVJUlyenoqs1ANHom4OdhmuIWdTgf0tpL9iwN3BOXHMh8tzO9dUhea0Lox+5gxYmdhvTuLb2KV24+ff/4ZhVH+ObuSfElg2mBYb/FA4B1O5BYvBc6eyJX/+PGjiNze3ubl90pOXehv6sYAmG8N5mdgZdRF4kFmt8M/qeMjEI/+SV0HxzZl3RLQZ6Fplpffm1cXmkdmdOM3b96wewbzyWwIwDOwylU3SRJUFUXuqIjU63URubu7Oz09rVQqR0dH4/H4p59+qlQqWHuHw2EURXqhtnhZ4F7o5vQ64FHm8nvz6kLn6cYsXml7eX4nVkZdz/NGo5Ex5uLiwhjz9u1bYwy8kQcHB7rNJwqO4pg4jplq7ziO9TBvA9gKWP+Zl98rOXWh83RjETHGYGHv9XofPnzQBb0tHo+VUXe+UiQ1PWi88EtVq1VaR/NNqyy2BKArOMm+JMB8fu/CutDf1I31qmsN5mdgZczBghlFUaFQYNUy13ULhQIOGAwGeJO3HDevUCiw+lEYhpi8r66ucEJWfoWVRZ0JL1DhOQxDPcfbpXt9yMvvzRym5QbcWZZ0xw3VU7Zdcp+HVS56YRjqewY61Wq1Xq9HL0Wn00Gcs24tCefzDz/8sLCa/mg0wt2lwSYqMIjOyfF4jDne6sPrQJ5Oi/uF9fnu7o45Q6VSiSUgMR3TDek4jjbE5Ls7Rb5OrIy6IAzKZfz4449xHGM/UygUarVaqVQCPwuFgm7BithJJJGy0NGXL19YSl/r/hnVN01TBuhmQm0zFYMtVgut02auPP4FV4+Pj9kBFDRG9U8cw4aANMcsnoQVbzXH4zHLJtA81qodIul0vd/Ly8t6vc5NkTHml19+EWVH6eo5XL111SW8wONic5XWhDyd9vj4+Pr6GhZQt9vlXet2u4eHh7j14/GYFaHxLzyaONJudJ+HFVN3OBxCHgDZPn78WKlUcP+urq5w/87OzkRZvMfHx57noVo/2Y71WWYNB8Mw5PIbBEEm+UHXdk7T1BaXXCsyOm2m1CtuDSKlEJvBG4evJEmCSbZSqeCFjYV8Hla/6sosyYst2JvNJjaxCJyCJIgnoNPp4AY/GNMsbfD09JS52jLzkTiOwwo7IvLXX3+JyB9//IFjGGe32v+XRZ5O6zhOq9VCP1cR0S5Dx3FQf5uAiUQlX7snN/u/2QesjLqcO+/v75FaLQ/bAopIr9dDQja/xVjZXq+H3TIqgLJLOsMnYTbzu+wnyJ1zt9vF7tfydh1YotPqXifa5Pn8+TNickQEbYdEbXB0Eq8VBZ6BVa663MmIiOd59Xo9CALmahpjTk9PdRV8FvvkRpfhkzpSh1/H04P67DK793CA4TBWV7HsXTmW6LSO4+jyyzhGl/vVHVsJ3mtrMD8Pq8wc4muWTRDF53kNkDtb0BvPQblc5gRPUxlz+cHBAecCTN5ICS4WizIL8ZG5rlaipgBrmG0SmKYLhUIYhtQCQGAklo1GI947foupvGIl36VYGXWxff3w4QN4e3Nzk8kT0mCZ/MlkAomPm+RqtRoEAXyVcRzz66xOxnKkR0dHxphGo2GMKZfL2EvjI0wQt7e3upaaLUe4ScCcdl23Xq+Dt/B9zDcfOjo6wqeYYfXu11pPS7CWOESwlwV4sR4ioj2OY/TsxC28ubmBJ3kymXyzdCDNM9jPjUaj3W6jCnS5XIa7i1E7cHJq69p2rNowaF0jlJ3ZnToE8vfff8/YzBAp8NresiVYpcHMPD5c8U6n8+bNGxEJw3C+N6eIwDkJKiKJTKcN4pygq47LoeuLqFarxpharcbD8Ih8/vxZx/qIbaSyQTAqptfr6XuKZwPxqjqkudPp8DbBgrPW8nKsjLo6ieSfsxtzs/NrPgAACvxJREFUeXnJP9mLtd/v40hdWAOFtn/++WcYurjHuq+nPkmr1To+Pq7X60dHR41GA4HQ8HjhgeB6q1vXWQNsk9DlL4xqgMAYWMhL3W6XjmjUdl/o1rLIYJUGM2/Vly9fQJI4jt+9e3d5eRkEQRzH87vNer1+e3urPcnomkGA5Nrc7Xa7xhgUbdc4Pz+H/SyzpCWYYWCyraKyeURRBNM3CIKDgwPYRHgHjwd9E4eHh/jUdV2a03SIWCzEive63LSApRkDOAgC3DNIuJ8+fWJLC13QyPd9phyIkgrhlpSZtXxxcXFwcHB2dmaMAWmxAcaRaZo2m83RaMR+SCgCvtr/r0UeWDSD/ERILG49Y5tF5ObmJgiCdrvN/Y6IOI5jRaPlWLHBzKZyaZrqHo3M5sksvMi8B0s53XJHytg6nJyNBQ8PD6EJga5cgY+Pj8vlcqFQgORrjKnX6xSW7RS+SWCShbHD7Q/AhwGCMDVCNv7knbJi3hJsItOdgY0iwsQD1mrGMdjKrrDSzWQyaTabXLEnk4lRNe4sthA00BBraafa5dgEdWu1GqOO8eL6+hrmkDGGBtVqM7+QwIRfYfvfFZ7fYrVwXReKPfyak8nEppEsx9qfZuRen5yczOdVg0tYaZGmv1r2vn37lsUNgyCoVCpWHNpaxHF8cXEBScnzPNhHNopmCdZOXa3dieouBQsWbzIIdoXURfHBVquFhAS75O4EGBWrS1JaLMSGHmjzsOoNJtfz8/NOp0O/4spLuuJHESaJNKPVnt9itYjjGHFXMivObEtzL8Haqcs4KmNMxvtfLBaZa4JN6QoD30aj0Q8//ACJH/MFk4QtthBYbGEf2RLNj8EmVl2IAXAmj0YjRkcgepkz68p5ZYyhDoFoeKvrbjMQ5IwK7KPRyBJ4OdZOXexYdGwGnMzMtNZ1LVboVEQq7+HhIRdby9ttRpIkiIGLogiZgNZHtRxrp26SJGyyrF3KcRxTvLm/v4f4bnVXC4tHYhMGcxzH8DMXi8UoiiC4w36eTqe6bLKdaC0sHolNUBfGsE7++vTpE16zzphdby0snoS1U7fb7SLc4uvvzUpMnZ+fO47DmGexS66FxVOwuUAFZiPoylUy8x5B6bXh5hYWj8TaqQs2MqcvjuOzszPP89ADAS6rIAjYJXnd47Gw2A9sIoaZr8HPWq2mIxOvr69ZDMX2nrGweCQ25GHWgi3jE7V5jGZFGxiMhcV+YBMGMxdebGvH43GpVEqSpF6vG2OOjo7YjHfdg7Gw2BtsYtXtdDoITkZkVaVSKRQKJycnqGJhjFlYL9LCwmIJ1k5d3bq+XC4bY9CyAC/evn3LtvdM/bOwsPgmNrHqsqbUmzdvCoVCsVis1+uHh4doXGBrvllYPAMbTUAHUWu1Gl6wLhw7nVtYWDwSa6cuU3ARxoyFt1AolMtlFEBvNpss22kL0FhYPBJrpy6qddIYHgwGBwcHZtbmiwazhYXFk7C5vS4zp3u9Hgopl0qlZrOZiYi0sLB4DF5sxUNLa7Qm0JWZLSwsHoOXNFZhLf/www9oqGlhYfF4vPA+k3tdJNxbN5WFxSPxYtRlRz+WibT6kIXF4/HCq+7nz5/BWMRIrrwUs4XFvuLFqOt5HiVf6rq2L6OFxSPxkqsuClMNBgP4lm2pewuLx+PFqMslFxl/+Nf2nreweCRsJJOFxU7CUtfCYidhqWthsZOw1LWw2ElY6lpY7CQsdS0sdhKWuhYWOwlLXQuLnYSl7v6AJa8RFo46JKi/eXh4WCwWkyRBseswDBEDgzi2MAzxFWRxIZ5cRAaDAaLKGVvOBjQyC6rBVxhgw0YWPDm+G0URT8JjUFzB930MxiiglIqopJQ0TVlz3wbMiqXu3oB1cD3PAxP++OMPmVELlJuvJaSbG6PQHwjW7/fJExAsjmO2lfE8DyccjUZBEIBIw+GQ1bbTNEVtbRyGU02n09vbW0wuaZqigT1HrntByozexhh0Yw6CAL/O2cfCUndPwPJA4AmXuGq1OplMptMpGMJOi7oXVBAE4FipVJpOp1x18abruvONoxCyiiURjMX5dTMa5nWKCEmLL3L1jqLo8vKSX7+/v0fPdBGZTCae51UqFUwN4/EYZ+AK/8phqbs/SJIkDEOUK8ByenNzg/pBXDDr9TpeeJ6H97vdLlmHFW84HMZxrG1jYDQagXjzpYhc102SZDqdYknEv4PBgJzHC0wKmDum06le82UWx352dvb+/Xv8+mQyOTo68n3fcZxM+xsLS939AVe86XTKLSIWUrw5HA61zZymqTHm119/nU6nWNlKpRJNUxGpVqssYwLSttttEUG7GWR64dN+v58kyenpKZrRnJ2dlctlnARnODk5genrum6z2fR9HycRkfF4PJ1OaednrHpjDLnKqgy2041Y6u4T6LwBh0ejURiGzWaz3+/DfgbxgiDAHpVrLOlhjOHihk9pZidJMl98t1AoNJtNThn4qNvtGmOiKGIrVu3QKpfL6F+Dr4zH4w8fPoiy8PFRr9fTnVxhVMtDO/+Vw1J3f5CmaZIkjuNog5ZdJmq12mAwIL3BUrKuWq2ORqMff/xRRKbTKfrIwPY2xlSrVREhlyaTyXA41KuuiNzc3IhIr9er1Wp4x/d99JoyxpydnfHIarUKizpJEoyHA8Y8cn5+jlq/IjIajbAm43dhTdjeVGKpuzegVYnHmpQgYUBIEbm6uhKRWq3Gr/R6PfAEB9Nmhryk3y+Xy6AZPUa1Wo1b1qurK+6lsa3lr5OrfJOF9SeTSRAE9I0ZY7BKa582gTPYFupiqbtPwCIJDuARp+ep1+thkaSygvejKAKfDw4ORqNRo9HApzCP0zQFRfFaZms1N9K0ukejESitzel+v48dL3s4YvpotVra7iUPoSrxDHd3d2u4SPsDS909ge/7DH7AO1gMNZccxwF1caQxBvSoVqukKPgPguFb6DKDE2JxBii9gsmkMc7J5Rrj6Xa7FxcXOHmxWIyiCMNLkgQaEuv4wlUGD7NdXZfAUnd/EAQBnEMi0ul03r17B39vuVw+ODigpwcHwFg9Ojqq1WrYpjYajVarRaprpxReNJtNdJwREd/3oyiq1+s///wz3oF7udFooJNjqVTiBGGMYRdl/Hl6eirKMudHcDtnnGEWC2Ev0J6ADifawFj9oLhi68vSX2w34fu+DqhwXdf3/TAMsTiDV7DA4ziOosj3fR3MFMcxaI8lNI5j6DdRFME+j6JIR2LgVzCJQBNK05SeM+rP0+kUMwvVIIt5WOruD6bTaRzHYALYCys0TVPwWRep18ES2rMlM9VUsxT0JpNB5kwNwE+fPmXGE0URXGLAaDRKkgSzhg6QxBiwRCP0AiOxgcrLYam7J4iiiE5amXHj/v4eQU4yY0IYhtwMY8GcTCYso5skCV7rcGUqMaSujnbEaRkjwYBn5hgkSaJ9xQxjZOYDT5UpoM85xWIhLHX3CmEYep6XJIkO9B2Px2SF7/v9fl9TQsces5GqiAwGA6y6eDOTjaBNX7A3juPJZKLNaXrOGMyMpZ5hVSIyHA4nkwne/+uvv5icYLtPfROWunsCMCpJEq69MFZhJOPfTM4NTV9sKfnFMAxpXTOREIC5q5di7oR5cuxvKRrjRZqmelGlMcykQh2bgZMnSWL7ti6Bpa6FxU7CUtfCYidhqWthsZOw1LWw2ElY6lpY7CQsdS0sdhKWuhYWOwlLXQuLnYSlroXFTsJS18JiJ2Gpa2Gxk7DUtbDYSfw/nVJZk0IymJ8AAAAASUVORK5CYII=" alt="" /></p>
<p>Use Malus' Law to calculate the angle <img src="http://www.webassign.net/images/theta.gif" alt="" /> in the picture above, given that the intensity of the incident or polarized electromagnetic waves exiting the analyzer is <span>49</span>% of the incident intensity, I<sub><em>i</em></sub>.</p>
<p>Angle orientation, in degrees: ????</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
Explanation / Answer
not good upload
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