몰 질량 of Flazasulfuron (C13H12F3N5O5S) is 407.3251 g/mol
C13H12F3N5O5S 중량과 몰 사이의 변환
다음 물질의 원소 조성 C13H12F3N5O5S
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 13 | 38.3328 | 수소 | H | 1.00794 | 12 | 2.9694 | 플루오린(불소) | F | 18.9984032 | 3 | 13.9926 | 질소 | N | 14.0067 | 5 | 17.1935 | 산소 | O | 15.9994 | 5 | 19.6396 | 황 | S | 32.065 | 1 | 7.8721 |
몰질량을 단계별로 계산하기 |
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먼저 C13H12F3N5O5S에 있는 각 원자의 수를 계산합니다.
C: 13, H: 12, F: 3, N: 5, O: 5, S: 1
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, F: 18.9984032, N: 14.0067, O: 15.9994, S: 32.065
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C13H12F3N5O5S) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(F) * Weight(F) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
13 * 12.0107 + 12 * 1.00794 + 3 * 18.9984032 + 5 * 14.0067 + 5 * 15.9994 + 1 * 32.065 =
407.3251 g/mol
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화학 구조 |
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![C13H12F3N5O5S - 화학 구조](data:images/png;base64,iVBORw0KGgoAAAANSUhEUgAAATwAAACwCAYAAACSANIRAAAABGdBTUEAALGPC/xhBQAAACBjSFJNAAB6JgAAgIQAAPoAAACA6AAAdTAAAOpgAAA6mAAAF3CculE8AAAAB3RJTUUH5wwYEg8yxyUpugAAAAZiS0dEAP8A/wD/oL2nkwAAJhhJREFUGBnswQmc3AVhL/Dvf3ZzEyCQWcKlXALKJWQTBeKBUqvU1KPFWtFUfYrWotHSGrVWU/uq9L1qjVeNaLUBWx9gq0Yt3qKRIzsbDoEiIFfkyoQzhJw7v8eH2U+WdRchXDsz+/9+PQozUFEqlUodai/8B+5DcD/OwK6a7sJJRvo4fqxUKpVaUMVIO+NnOAR/gqfj5TgUr9M0Bd1GmohJSqVSqQV1G+kd2AsH4XpNN2EOtiqVSqU2VTHSS/AjXG+4rUqlUqmNdRtpL3zfI/sA3mK4/XG9UqlUakHdRgoqHtlP8HPDLcAOSqXSuNXb1/eyFMXZRlra39t7qjHUbaQbsb9HdgG+arjn4iilUmncalQq3UUyDbNTFFsNSlGsNca6jXQuTsOBuFqpVCo9BhunTLn8ikMO2ayFVIz0eVyLb+FVeBoOw/txuO0zH/+Ff8NhSqVSaQx1G+k+vACn4cvYCfdgJb6v6Q5sNNJ63KNpF7wKb8O++A8cqlQqjQuTN2yoza7VYsjz+3t77zGGuo3udrwJb8JEbDbcnkb3PkPuxJs17YF1SqXSuFEkH8VWgzZMnbrBGOv28P4JL8Ii/MBj93m8CguUSqVxY8PUqf95xSGHbNZCKh7es3AkJnp83o5n4gvoViqVSmOk4uFVNa3x2OyIl2naiiiVSqUx1O3hVTXVPTabcQL+Et04FVuVSqVOtwX3TN6wIdrIegTTlEqlUgfoNrppmIoNWK9UKpW20+xa7UZ0NyqVZ1981FF1LaBidFVNdaVSqbS9kgJ7YPdKo3G3FlExuqqmNUqlUmk7zV25chd04+7+3t4tWkTF6Kqa6kqlUmk7DXR1VTXVtZCK0VU11ZVKpdJ2SlFUNa3RQipG16OprlQqlbZfVVNdC+k2ijPpuoYV93Hdx5VKpdL2qTQa1RSFIqlrId1GcRIHYR6+/HGlUqm0fVIUPR7QqFTqWkjF6Kqa1iiVSqXtV/WAIqlrIRWjq2qqK5VKpe2UoqhqqmshFaPr0VRXKpVK26nSaFQ9oEjqWkjF6Kqa6kqlUmk7pSiqHjDQ1bVGC6n4LWEKpmFjwTqlUqm0/aqa6lpIxUhVTXWlUqm0vZICMz1g86RJa7WQbiP1aKorlUql7bTzvvvudOsJJ1w4adas+6//0Ic2a2XhZSHhXKVSqbT9DkRwtRZTMVJV0xqlUqm0/aqa6lpMxUjX4rP4sVKHyCSyF6kYIbPIdKXSE6eqqa7FdHuIMAMFvoZfKXWKefghqlhruPPxRXxUqaP09vX1pSj28lv6e3t39+Tq0VTXYro9IEzGp/EmrEMDO4ez8LaCe5VKpbaSotgNZ1caja95alU11bWYbk2n40WYV3ChB4Qj8XX8B/5AqVRqRzf0zZ17vqdWVVNdi6mEA3AS3l9woUEFF2MhTghzlUql0qNT1bRGi+nGC1Dg60b6NjbgOKxUandXkBhupo6UvXEHxf2GyQxMoFhjfHjnUf39f2TIF1fNnv3l2bXahP7e3i2eHFVNdS2mG7NwV8F6v6Ug4TeYpaOkB3vjKor1tskOOAiXUmzVeV6Pewz3XzrTdXgTzjTc/8ZheL5xIEVxIb5vUNfAwMWaVsyu1fZGP1bgF1jV39t7v8evR1Ndi+nGRkwLlYKGkaZjo87yWizBZ3GKIUfiZ5iJO3SeiynWGiablDpWkfT19/Z+2UOceNZZXddxIHbGy/FyTVtn12qXow8rG5VK30733HPFT487bqvtU9VU12IquAoTsb/fEnbFbvgfnWcd3krmKpXGkbNf85oB9GB2kbwdX8Jlmp6Nt+L0SqNxybrp0+89qr//FxN32+00nIQDUfjdZmqqazHd+DHW4lS83XB/hfVY7gFhUsEmneF2/BCfJ3MptiqVxon+3t4tWIVVWOoBs2u1CSmKw4tkXopidpHMxsHFwMCBm2+//RhD1uEy9KMf/bhC086YiHuxyRg4ctWqPboHBp5lpOu6CzaEk/H/wmR8FwM4Hm/BWwruCkdieXhnwX/pDH+Lq3EKPqlz3YOLsMVIF+Nmnemz5OOGm46a8WEgRdHwKPX39m5BP/oNOuyyy2ZsvuiiI3E05mAO9sCxONaQW9GH6zTdjZ1wj6dY18DASxtF8UXcYLglhUFhDt6DI1DgCnyq4OceED6Dv9D0FSwsuFdbyrvwTopnkL/Ax/As7IufYSbFHTpGJuFQ3EJxq2FyJG6kuFNHyRZ8BOca7r3YjeL5WkSYghfgadiE8wuu0br2wGzMxmw8B1VDNmGSIXfhVtyFu3ALbsVduAu34Fbchdsx4HHo7et7c4rik/29vTv6Ld0GFfThdR7eO3EZPoE34rjwxoKfam//ggX4J3xWZ3oaariaHE6xyZCf4234qs5zPUWfYbIGu2kR4Xn4GibiMszEF8MZeHvBZq3nFtyC5ZoKHIA5eC3mYz0amI4ZmOHR2fLsn/3s4q6pUycXST1FsQZ1rEU9RXE71mJtkdT7e3vX2g7dHqWC4Avhh1iGY/Hj8Gm8t2CTlpZDsQgfN0zRIO/E+bhEZ5uJ9+LvlcZc2A3fxDfwtoItHhDm4Ee4DR/Q+oJrcA2mYj6+hrdgEnbFDMzA7tgDMzADM7A79sAM7NY1efL+2DVF4bcViYeaXasNoI61WJui+JJGwwOKuRddtK9BmydOzCVHHnlDt+1UcF14IU7F3+NdeHF4Q8HFWk6OxvswHwW6cKFhipXki3ifbfJK3E5xgc7xD/gH8h8U1yqNtTejgr8s2GJQQV9YgoXhIwUbtY8eTXVNm3ALbvHoTNy6dWu1MnnyzK6BgZ5GpdJTJDMxs0h6UhQ9mIkqqtgFszDLA4rkXNSxw0BX13UGdQ0MeEDR7TEo2Ip/DD/GGTgEF4WP4u8LBoy5zMMivFzTJpyFj+AEI30Ar9a0J76CHcg/YjHFFu3vW3gpPovf19kuQN1I16HQGo5GreBuI30fH8Qh6Nc+qprqHpvNlx5zzM242aPwwp/8pHvd9OlVzExRVIvkRrwA66avW7eLQdV6Pf2eAGFKOC0MhITzwwHGRCpkPrmIhITcS5aQ3W2Tl5FPGSGvJmeRGWQx2UpCLiNHaFt5Bgk5gDyDbCSv9aDcR07ScXIs6TVCDieHagFhRTjDKML+IeEl2suZCN5gjPT29b15dq12rydT+P1wc0i45x4WeMpkIllA/oeEhNxOFpOdjZAuMs0jynPJ1SRkA1lEKtpOnkFCDvCgfJTcRnYk95GTdJxcS7aQZxsmZ5MztIDwvfBdowhzQ8LR2sv3EPy+MdLb1/fm2bXavUZR8QQp+B4OwZnY8UO8Hd/F7p40mUYW4lr8Gw7GDXg39qFYTHG3bTKRLMAVWOwRFRfi2fgUJuE0/IDsreWlSv6enGKk/42NeK/Odg8+Sypa06U4LHQbaTa24grtpaqpbrxYzh/jLgS3Yb4n1q68+lRyBwkJuZS8jnQbIdPJX5GbSUjIxaTwqOX3yc0k5B5yspaUp5ElZD0JuY0cQkIOsE1eQdaTzeQksj/5c1LoCLmWLCZ3kbfaJmeTM7SAcGjYGt7tIcKO4dfh37Wf1Qj2NkaO6u9/3uxa7V88xWbhOwiCZZju8dkNi3E3RYP7ryEryHxSGCEzyWJyBwkJuYwsIN22W6rkP0lIyNlkppaQ/ckSspGEhPyAHEueQUIOMEyWk5DXk1+QkP8me2h7uZacQt5D7iA9HpSzyRlaRHhPaISvh1PDP4ZfhyvCbtrPRgRTjEMFTsZ9CK7HC2y/g/AlbELQwHd4xTFGlVnkNHIfCQlZQeaTwuOWE8mdJOQ2Mt+YybPJMrKVhAyQ5aTXNtmdnEVmGSb7kbPIPPJqUichd5HXa2u5lpxCusklZJkH5WxyhjESJoSl4VCDwpywJCwP/x7eEaZoPzsiuNc490zUEAxgCSZ5ZEdgGbYiGMByzDGq7E+WkA0kJGQFebEnXPYh55GQBl/9CKZ6ymQeWU5CQjaRZeRAj1l6yDdJSMhZZBdtKdeSUzwo88gAeT45m5xhjIR3hIRfhkJn2R/Br5V0YxE2I/glnm1087AcDQSbsAwHGd1srv4cGSAhW8lXyeGeVCnIQm6/hcptuA7zPGlSIfPJBSQkZB1ZQvb0hMkCso6E3EJepuVlInkz+VcPyrXkFNvk30iNfJ2cYQyEKeE3IeFVBoXdw+7a33MRXKi0zXPwKwQbsAgVFJiP8xEE67AEexndPCxHgzeuJJvIMnKgp9Thh+JSBFvwd5jgiTOBrjeypUZCQm4nHyA7e1JkX/IzEtIgS8lULSfTyLvJahIS8lxyLTnFNukhd5J7yBmkm3yQTPcUCe8LCX2hMCj8W1gfTtTe/hDBcqVhpuHzaCC4FFchCNbgg5hhpApeiQsRBPdQ+Rj3zTJ2JmAxtiJYiYM9PpNwMm5E+N5PyQ1kIZnqSZcusohsIiFXktlaQnYkC8mtJCTkl2QB6SbXklMMk78gIWeQD5GQ68jzPMnCTuGOkHC8QeGgsCVsDvtpb/8Lwb8qjeoluBV1BDdiIaYaqYITcTmCYA0WY4bWcTSuQbABi1CxfWbgg1iDILic/f6UTPCUy2HkUhKyhSwmXcZEdiOLyd0kJKSfnEgK2+TT5KWGSRf5PHknOZj0kZAGWUImeZKEfwgJ53mI8J8h4dPa3/sQnKb0sN6C4AJMMNIkLMDVCIIbsBBTtabpWIog+AH28sh6sBh3IQhWYQG6jKlMIZ8kDRKu/y7295TJfmQJ2UBCQlaQ+R6zdJNFZDMJuZwc6Qn2ywvtNjDVJSHhuQaF3tAI94c9tb+PIzhV6WGdguAzhpuOhbgFQXANTsYE7eFluAXB3XiD0e2LJbgfQbAC87WcvJjcxN4X4X4sROFJkyPIMrKFhAyQ5WSOJ0zmkqtIyGaymHR5gtRqPlVbaeCmU33GQ4QfhISP6gzLECxQelh/h+DDhvssguACvAKF9tODbyAIzsKumg7DMmxBMIDleI6W9rEZ+CqC4NuY5Yn1Qq78EgkJ2Ui+QA7wpMgUsoQ0SMj55ACP06pVnl6r2VirGVi1yhEGpduLQsJdYYbOcC6Clyk9rM8heIfhnoFzcZzO8BasQ3ArzkcDwSZ8CQdpL3+MtQjW4NUenwLz8QuEP1pF1pElZC9PibyE/IaE3ENO9jjUar5cq0l/v2Ue4uIVzqu/yk+3TPdXOkc/gl6lh3UOghN1vn1wHjZhI+7DEuytfe2G5QiCszDD9unG63E5gqCOv+XGGZ5y2ZWcTXLssd+9tK+vOGfVKlXbqa/PQbWaLbWazbWa/Q3q6/OKWk1qNWtWrDBd57gJwdOVHtZ5CF5ofJiB4H7sqjMUOBn3IbgRx3lkk7AAVyMIbsUiTDPm8vrzz598Ra0mtZrb+vu93Hbo73dOrSa1ms8alKjUai6p1aRW806d5X4EU5Ue1pUIDjE+7I/g1zrPfvg5ggaWYqqRpmMhbkYQXIuFmKyF1GqeVqv5Ua0mtZr091t2xRV28AhWrXJEraZRq1m/apU9DOrr84ZaTWo1N1xzjUk6x3QE9yn9TnUEVZ1nAa7EXxtyNIILdaZuLMImBFfgKE1VLMadCIKLsQBdWlSi6O93cq1mfa0mtZrrV63yfL9Doujv9ye1moUG1Wom1GqurdWkVvNnOst+CK7XwrqNrS7MQAN36jz74JnY0ZCqprrOtBX/iFuwDM/CBbgRe2Oyph/jY/ihFlcUgi+sWmVFo2EZZjcaflKr+cyUKf76kENs9luKQvD/DPdW7I9frVvnqzpLVVNdC6sYW7uiC3diQOepaqobUtW0Rmera7oeE3AAJmm6Ey/GD7WRo45y5bp1npv4OwTv2rBBbdUqR3iIlSvN6u/3or4+x194od0MSmxEPfE3xx1nq85S1bRGC6sYW1VNdZ2pqqluSFVTXWeravoF3oHP4K2abtamjjvO1jlzLG40PB+/xmGNhgtrNW/3gFrNBysVNyW+VBSWdndb3d/vpR4wZ45/nTLFfr29/lPnqWqqa2EVY6uqaY3OVNW0xpCqprrOVtVUx+fxLtygqa7NzZ3r/M2bHYZPYVJifV+fQ/GRovCm3l779vbav1KxT3e3nxt0yCHuKwrReXo01bWwirFV1VTXmaqa6oZUNdV1tqqmuiE9muo6wDHH2NDba2Gj4Tlz5jijUvEsFInvGXTUUW454gjrdb6qproWVjG2ejTVdaaqprohPZrqOluPprohVU11HWTuXH0eMDDgCgRf6e/3TONLVVNdC6sYW1VNdZ2nwEwEaw2paqrrbFVNdUOqmuo60Ny5rki8EYclrqzVXNDf70+MD1VNdS2sYmxVNdV1nhnoxt3YYkhV0xqdrappjSFVTWt0qDlzLJs9276J4/CbxNdqNa/T+aqa1mhhFWOrqqmu81Q11Q03U9Nana2qqW5IVVNdBysKjTlz/LS314mJH+F1HnDhhXbUuaqa6lpYxdiqalqj81Q11Q2ZjilYj/t1th5NdUN6NNWNHxMS961aZY/ubtfUak674goTdZ6qproW1m1sVTXVdZ4eTXXb7DaT+9azvq6zTcJ0bMa9hlQ11XWAFStMnzfPOoP6+ryhKJyE/y4KaxsNLy4K84rCCYmXYFcs2rDB8f393jB7tv/RGaZjKjZgvRZWMbZ6NNV1nK6Zmtba5rYe7ptG4xadraqpjhhS1VTX5lau9OzJk91Uq3m7QUXhvMTPcRzeURQmNxpeNHu2782e7StFYR6uxezEqlrNokRF+5qABejDnZpOwwSlESrYiga6dZz8Dbmfuz5sm7ychHxbZzsSwcWGdGMAW1HRxq65xqRazWW1mtRqltgOK1aY3tdnaa0mtZr09fnhypX21l52wHuwGkFQRwPB+ThAC6oYO7ugC3diq87TgynsfLchPZrqOluPprohM1HBHWhoY/fc46M4DFdt3ux9Bq1apeoRzJtn3Zw53lYUXoZbi8KLKxW/7O93sta3IxbhBnwCe+Fy/Bl2x/FYjaNxGRai0EIqxk5VU11nqmqqG1LVVNfBZrLLBLZgrSFVTXVtrL/f8/BubE382THH2OABF19s50bDqlrNmZdeappHMHu2cysVR+Ab2CmxtFZz1kUX2VXr2Q2LcRNOw65YhdfgcCzDVvwYh+ILmIJP4lzsqUVUjJ0eTXWdqaqpbkhVU10Hq7PbZiZs5BaDfsSMlfz8DC7Qpmo1OyXOQAUfmTPHSoMGBnwOexWFfX/1Kxs9Ckcdpd7b61WJP8M6nNjV5fJazR9oDfthCW7Ah7ETfoE/xGycjRjuXrwNJ2ItXoLL8TotoGLsVDXVdaYeTXVDqprW6Gw9HjCJOw16EbvP4XmvZ0dtqih8Gk9HP04zqL/fq/GnWF+peONrXmPAdpgzx7JKxWFF4TzMwvK+PksvvdQ0Y+MILMPVeBcm4tuYi3lYbrgD0W24c3AolmNnfBVnYYYxVDF2qprW6ExVTXVDqprqOltVU92Qqqa6NlSreWXiDbh/YMDrentt8YBVq+yRON0DisJ7jjzSNR6Do45y469/7cV4H7YUhZM/8AFfxhxPnXlYjovxBgzgDByC+egz3BFYhivxJ0a6Ha/A23AfTsQlOM449CEEH9FxUpDNJGSibdJHQuboYOGbIeGVBoW/Cwkf1mZWrjSrVlOv1aRW8w6DEkV/v+/WalKrOTdReAKsWuWIf/5n38RWbMGH0e3JUWA+foEgWIcl2MvoXoTvIwg24n1+t33xcwQNLMVU48inEbxTx8kMEnK3YXIDCdlHBwvnh4RjDQr/EhLeoY2EolH45p3H+2ntQucmCoP6+pxSq0mtpr5ypVmeWJNwGrYiWImDPHEqmI9+BEEdi7GLkQrMx/kIgnVYgj09Ot1YhE0IrsBRxomvIXitjpMDScg1hsl6EjJNBwvXhIRnGBTOCQknaiPhbSFhbWbaw6D+fgfUatbVatLX5489eY7BtQjuxyJUPHaTsABXIwhuxSJMM9IELMAVCII6FmMXj00v/gfBZixGlw73YwQv1nFyLAk53zaZRkLu1+HC3SFhZ4PCeSHhhdpE2C/cGxJeY1AW667VXFSrSa3my558O2IpguD72NP2mY6FuBlBcC0WYrKRJmEBrkEQ3IiFmOrxm4zTMIDgAjxDB/slgsN1nLyShHzDNtmHhNygg4WJoRE2h8KgcGVIeJY2ELrDBSFhmYcIizfP1HfZt9QuvNCOnjqvRh3BXXi9R1bFYtyJILgYC9BlpOlYiFsQBNdiISZ54h2P1QjWYyEKHeg2BLMM99d4H7q0rbyVhJxum8whIX06WNgzJNziIUI9JFS1gfC3IeE3YYZBYW7YEgbCCzz1evBNBMFZ2MVI+2AJ1iMIVmA+CiP1YDHuQhBcjAXo8uTaCcsQBP+NPXSQCraigQmG7IlNCH6O/bSlvJ3cTv7BNjmBhHxXBwvPDgmXGBS6wtYwELq0uHBk2BQGwosMClPDVSHh/xhbC7AOwa04QdOhWIYtCBpYjuca3T5YgvsRBCsw31PvRKxFsAav1CEOQNAw0vFYjWA9FuoI2Y38MXmxDhZ+LyT8wKDQExLqWlyYFH4ZEj7hIcJnQ8IVYbKxdwDOR9DAVWgg2Iyv4JlGdxiWYQuCASzHc4ytWfg2guAszNDm9sQWBFdhF8PthGUIgv/GHtpO/oh8jOxkmBxN3q8DhZNCwr8bFA4JCVdqceGTIeHKMMWg8HuhETaGI7SOLizCFvwGm7AMBxjdPCxHA8FmLMMztY4CJ+M+BDfghdrcZ9BAcBOON9KJWItgDV6preR0EvIZw+QUsloHCu8OCUsMCi8MCT/V4sJ7w33hKIPCzuGmkPBerekyBL9ndPOwHEGwEUuxt9Z1MPoQNLAEk7Sxw3EeggaWYprhZuHbCIKzsLO2kNPJlWQzmWubnEJW60DhH0LCBw0KJ4aEs7WBsKuHCF8LCStCl9Z0I4KnG1LBfKxEENyDJZilPXRjETYjuBxHamMVLMQmBFei13AFTsZ9CG7AC7S8nE7OIaeTVaTbg3IKWa0DhS+EhJMNCu8ICZ/TZsLrQ8K6cIDWdT+CqYbsiLsQ3IbF2Fl7mourEGzGP2GCNnYYLkGwBadhguEORh+CBpZgkpaV08k5pIfcRd7tQTmFrNaBQhGqYQeDQm/4UDhBiwlHh0+Es8KXw5vCRIPCC8IN4c1a1w4I1htpId6KSdrfVHwODQR3Y5Y2NhmnYQDBRTjQcN1YhM0ILseztaScTs7xoPwFuZfsRU4hq3WocGz4cPjn8L5wiBYUFofN4Wvh/eFT4eawKuxiUNhBa9sXwfXGh7dgAMEXdIBj8WsE92MhCsPNxVUINmMxurSETPWgnE7O8aBUyEXkTHIKWa3DhK5wZtgYvhU+E34ctobFWkiYFxrhTz1E6Am3htO1j+cgWGn8uBDBj3SIHbEUQfA97Gm4KViCBoLzcYAxk93IYnIneRY5nZxjmzyHbCVnkNU6THhP2BSO9BDhtSHhpVpE+FK4PBR+S1gU7g+TtIeXI/iO8eNMBH+jw/wR6gjuwklGegl+g+AenOwplQPIF8hGEhLyl+R0co5hspQMkNU6TPhV+KJRhPPDN7WI0BfONIrweyHhEO3hTQi+rDNdizqeZsh/IXi1DrQbvoUgOAu7GG5nnIkg+A5296TK4WQZ2UJCBshyMteDcjo5xzDZhawhq3WQMD0kvMUowj+F1VpEuCJ8xijC7JAwV3t4L4L/ozOtQ7CjISsQPE8HW4B1CG7EcUY6EXcguB1/6AmXeWQ5aZCQTWQZOdgweT75PSPkGHKSDhL2CAmvMIrw3nCvFhHOC183ivCHIWFf7eH/IvhrnWcygo2G+xWCg3S4ffFzBA0sxVTDPQ0/QhAsww4etxxPfkFCQu4jS8jexrkwLTTCyUYRPhFu0CLCx8LtYarfEj4bfhMK7eHfELxR53kagtWGuxPBLsaBbizCJgRX4CjDFTgZ6xFcj+fbbqmQ+aRGQkLuIaeRXZW2CZeHZUYRauEsLSI8PawLnw8TDArzwobwbu3juwj+QOeZjWCVIRPQwBZUjCOH41IEW7AYXYY7BKsQbMWfeHQm48+Z+w0SErKavIdMUxoh/HnYEp7jIcKC0AjP10LCS0M9/CZ8J6wKW8InQ0X76EMwR+d5KYJzDdkdwW3Gock4DQMILsAzDNeNxbgJu/rddsT7cBuCrVx2Hnkzmaj0sEIlfCFsDueGz4Wfhc3hVC0oTA+vCu8Jbwr7azs7/4zKbey0n87zBgRnGHI4gsuMY8djNYL1WIjCcNM8vCoW404EwSVYgC6lRy3MCX8T/m84NRyo9CTKehIyTef5SwSfMOTFCH5knNsJSxEE52IPv9vTsQTrEQQrMB+FUqmlZRoJuV9n+hiC9xvypwi+pvSgE7EWwRq8ykiHYhk2I2hgOY5WKrWN7ENCbtCZvoTgLYa8C8GnlbaZhW8jCM7CDByFZRhAMICzcIhSqe1kDgnp05m+heAVhvw9gg8pDVPgFKxHcBeCYD0+jacrldpWTiAh39WZLkBwtCGfR/B226miswWfwWH4FdZhAz6FA/BO3KhUal89muo6U1VT3ZCqprrtVDE+XIfvYG98DAtxq1Kp/VU11XWmqqa6IVVNddupYvzYVdNqpVLnqGqq6zyTsCM2415DejTVbaeK8aOqqa5U6hxVTXWdp6qpjhhS1VS3nSrGjx5NdaVS56hqWqPzVDXVDenCzhjAnbZTxfhR1VRXKnWOqqa6zlPVVDdkJiq4Aw3bqWL8qGpao1TqHFVNdZ2nR1PdkB5NdY9BxfgwFVOxAeuVSp2jR1Nd56lqqhtS1VT3GFSMDz2a6kqljpEpmIZNFOt0nqqmuiFVTWs8Bt3Gh6qmulKpc2zGbOykM1U1rTGkqqnuMagYH6qa1iiV2lrmkKXkOIoBilUUPyGzyFIyS+eoaqobUtVU9xhUjA9VTXWlUnvbHyfjK2QHQ3bGydhZ56hqqhtS1VT3GFSMD1VNdaVS+1uHe/C3OluPprohPZrqHoOK8aGqqa5Uan8N/DXeQw7zO2VPMlV7qmqqG1LVVPcYVIwDr2RgXy48gpuVSh2h+B6+i8+TilGlG+fgl+RY7WUidsQW3G1IVdMapdGFb4eE+UqltpbXkrs9KPuQ9eQt5GAScrBtsge5jIRsIYtJt/awJ4JbDFdHUFUaXbgoJDxHqdTW8lpyt23yN2QNeQ4JOdgwmUAWk60kZCU5SOs7EDfhIkO6sBUD6FIaXbguJOynVGpreS252zaZSK4i3yIhB5NuI+Rocg0JuZ8sIhXtpQdBXenhhXUhYbpSqa3lteRuw+R4EhJyMPkU+TqZaZjsSJaSkJAfkL20jxciuElpdGFKSNioVGp7eS252wj5Ggk5htxFQm4lf2CEnEBuISF3k9drD2ciuFtpdOFpIeEmpVLby27khUbIruR4Mo08jfyYhIQsIzsYJj3kmyQk5Cyyi9Z0PGoIgrOVRhdmh4R+pdK4kYKcTNaTkOvJ842Qk8k6sokX/hTHaw3deB0uQxBsxE+wk9LowstCwrlKpXEnzyL9JGSALCETDZP9WfIVBA18ElOMjYlYgF8hCG7DYuyk9LuFBSHhDKXSuJRusphsJSGXkSMMV8FCbEJwJXo9dXbAQvwGQfBrLMRkpUcnnBoSPqFUGtfyXHI1CdlAFpGK4Q7DJQi24DRM8OSpYjHuRBBcggXoUto+4bSQ8H6l0riXqWQJaZCQFWQ/w03GaRhAcBEO9MR6OpZgPYJgBeajUHpswpdCwv9SKpUG5eXkNhK+8d94vZGOxa8R3I+FKDw+B2ApNiNoYDmOVnr8wrdCwh8qlUoPkSqrv8CEzQjOwq6G2xFLEQTfw56235FYhq0IBrAcRyk9ccIPQsIxSqXSaE7EnQhuw3wj/THWIliNyR6deViOINiIZXiG0pMjTAxdSqXSw3k6foKggaXYwXC74Vt4l9+tgvm4EEFwL5ZgD6UnVvj/7cFNaBYEHAfgZ/N16nRROaWCPogOkZllBWqmBzsEK6jA6DSoQx+HkBD0UIdBFw8RZHSIyigCIc0E+zhEUNYlKwuFpKJCSUtLKak0dfsVLKi1uSm2+br+z9MI94e3wudhS3gsnK+UcjwtWIbDCL7GQgO1oMXQJqIbnyEI9qEH5yj/vdAS1ocfwsPhlnBv+CDsDhcrpQxnFrYiOIpVaHN8U7EMuxAE32AZpiijJ9wZEub5hzA5fBleUUoZyUT04BiCLbjcQGdhJX5EEGxHNxrK6Avrw3uGEB4MR0K7UsqJmI8vERzCSlyD1fgJQfAxlqJFGTthe3jGEMKSkDBLKeVEnYU1CIIg6MObWKScHmFHWG0IYUFIuFop5WTdjl/Rh28xzxmmYZwIE1roxXe40NAu0m+PUsrJehXTMRX7lbEXLglPhK2hNTwSDoZz/UvYELYppZQzSZgdXgpHQ0JvmB86w/dhQ+j0p9AID4TecIdSSjkThLnh5dAXEo6EF8MV/hKuDFtDX9gZDoX94W6llNLswsKwKSQkHA4vhsscR7gsLAnXhzallNLEJvzG0vBJSEg4EB4NM5RSyjjQhm7s2MLmkLA39ISzlVLKONCB5diNIHPYHO4Lk5RSyjjQiR7sRxBsQzcaSillFE3FF1hssMfxlJFNxAp8ggPYhacx09/OQw9+RhC8j1vRopRSxkAHgi6DrcVGI1uHg1iBRViKd/ECLsAa/I6gD69hoVJKGWMdCLoMthYbDe8mBHcZaBImYSZ+Qy824TqllDLKGkZHF77Hywb6Xb99uAcf4iullDIGWgytAwfxDvYY6AZ8itsc30ZMx41KKaVJNAxvJz430JVG1opepZTSRBqGtw6vG+gqTDG83ZitlFKaSKvR8TYuwWKllNIkWp26RXgSPZih30Z8hDVYgna0owsLlFLKadDq1FyEh/Ac9uB5/Y7hZmzBGziIX/AsLlVKKU2mHa0Ga0ObwebiHYNNwaXoVEop48Ba7MW1Sinlf2AOtimllHFqGmbpNw17lVJKk2o4NdOwSr+ZWK6UUsa5yUoppcn9AWKDpsuzaC1YAAAAJXRFWHRkYXRlOmNyZWF0ZQAyMDIzLTEyLTI0VDE4OjE1OjUwKzAwOjAwjHECvgAAACV0RVh0ZGF0ZTptb2RpZnkAMjAyMy0xMi0yNFQxODoxNTo1MCswMDowMP0sugIAAAJzelRYdE1PTCByZGtpdCAyMDIzLjA5LjMAADiNfVXbjhshDH3PV/ADQb5hzOMm2a2qahOp3fYf+t7/V49nlA4roTLBGuDMMdjH5FSyfb99+/2n/GtyO51Kof/8xhjllxLR6b3kS7m8fvl6L9ePl8tz5vr4ef/4UaQXCXyD5zP25ePx/pzhci1nr2Ta1MpZaxvNAp9V2trxrZRHOVv16MStnKWO1mSJ1OS02lw5gORqTkYrpCWy1T5adHin6tS6rJBtR3oXbBXrEYObLIBe7ulcGbuzwrXJ0CWwJ6NWCgltWPduYF8AIxm1CjlabjKEZHmckUiuXXByh29liyUlUzqnakMdaaKMEI8lkjPs2B13az3ZSc2XYWeBe+zOJUDFlYl0zakF6qiEBAZjXcDMS6DBOWOdBnHuYoSP3lfIBqRUd+gz8uTCrEtKx8kV6yGd9ozH8OVxMkGpN+sxcl1Z1pQBYKsDEeqx50fNlpRjQ3ZEHeuQMASqS7kJbc5NEZjYxR5tjWREPdVhZpRIJo2ld5GNMygcG0llOi/DLlreABwqZgPcUNtYJhICfyteFZIYyWgkiOsK2ABUiGgAAWDvKt5WQE+5eR1kgCTSNJZRl77fHD0gDskIaKxV9Hq/fbpy9kvo8rjfjksoHzluGgyKHteJZT/ujHzacTFgUPwof0PvR5EbehylzBiOo145+1yWkoZ5Kj/eZmSqMt6MTuWUQ1TLVDf7TJvqg7cZnwrB0nCfBG9pOCZlWxoek4ItjcxKtTTCkyI5eUQm5XEa0Uli+4xNWtpn2iQaRmjFJ3FwGumTCAxBPWhzw+nf5+TPqc7x878K76e/CHVNGMdAY3cAAAAddEVYdHJka2l0UEtMIHJka2l0IDIwMjMuMDkuMwDvvq3eAH9imgAAAVV6VFh0U01JTEVTIHJka2l0IDIwMjMuMDkuMwAAKJEtUUmKJEEM+8ocMyEy8BZeKOZU0Meuwzwh7vWCfvzIWQ0ZiRGWJdnP1+a9j9fzfO/j+3n8fZ3f//rfb8s+nsfXie/r3Hu/5Xzzn5/j8kmmS8elc9WyGo/LpmcQj0tmrSUfaLlyjounORkDWjNqZYyLptMKyRvzELJBM7N4CSCfRRY6eIZp6o1EUg2dohl8D1eGDlogpguITkrJnuNhGAkIfHHtJmWD7AO6VuoS6IInLrkx57AVbZTUHN7hxSWrmUykQGQSciV4glYGj1HBEuiVXhHd484tJswwrShSfsNmOcL2liwKU0hZ4AxIErTuHM7cQCkkEJWECso+lRAQSyTphSnsFjUjQsXHY82C/2ydFDVUj96z+upr4AKqPdY04Oq+T67bHrZu1giT5meFQu7xmQT5HOfPf0r7b4UOyoZGAAAAAElFTkSuQmCC) 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관련 화합물
힐 시스템의 공식은 C13H12F3N5O5S
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계산 몰 질량 (몰 중량)화합물의 몰 질량을 계산하려면 공식을 입력하고 '계산'을 클릭하세요. 화학식에서 당신은 다음과 같은 것들을 사용할 수 있습니다 :
- 어떤 화학 원소. 화학 기호의 첫 글자를 대문자로 하고 나머지 글자는 소문자를 사용합니다. Ca, Fe, Mg, Mn, S, O, H, C, N, Na, K, Cl, Al.
- 기능 그룹 :D, Ph, Me, Et, Bu, AcAc, For, Tos, Bz, TMS, tBu, Bzl, Bn, Dmg
- 괄호() 또는 대괄호 []입니다.
- 관용명
몰 질량 계산의 예 : NaCl, Ca(OH)2, K4[Fe(CN)6], CuSO4*5H2O, 질산, 과망간산 칼륨, 에탄올, 과당, 카페인, 물.
몰 질량 계산기는 또한 일반적인 화합물 이름, Hill 공식, 원소 구성, 질량 백분율 구성, 원자 백분율 구성을 표시하고 무게를 몰수로 또는 그 반대로 변환할 수 있습니다.
컴퓨팅 분자량 (분자량)
화합물의 분자량을 계산하려면 공식을 입력하고 각 원소 뒤에 동위원소 질량수를 대괄호 안에 지정하세요.
분자량 계산의 예 :
C[14]O[16]2,
S[34]O[16]2.
정의
- molecular_mass_def
- 몰질량은 (molar weight) 어떤 물질이 1몰 있을때의 질량을 이야기 하고 단위는 g/mol입니다.
- 두더지는 원자나 분자와 같은 매우 작은 물질을 대량으로 측정하기 위한 표준 과학 단위입니다. 1몰에는 정확히 6.022 ×10 23 입자(아보가드로 수)가 들어 있습니다.
몰 질량을 계산하는 단계
- 화합물 식별: 화합물의 화학식을 적습니다. 예를 들어, 물은 H 2 O입니다. 이는 수소 원자 2개와 산소 원자 1개를 포함한다는 의미입니다.
- 원자 질량 찾기: 화합물에 존재하는 각 원소의 원자 질량을 찾아보세요. 원자 질량은 일반적으로 주기율표에서 찾을 수 있으며 원자 질량 단위(amu)로 표시됩니다.
- 각 원소의 몰 질량을 계산합니다. 각 원소의 원자 질량에 화합물에 포함된 해당 원소의 원자 수를 곱합니다.
- 합산: 3단계의 결과를 더하여 화합물의 총 몰 질량을 구합니다.
예: 몰질량 계산
이산화탄소(CO 2 )의 몰질량을 계산해 보겠습니다.
- 탄소(C)의 원자 질량은 약 12.01 amu입니다.
- 산소(O)의 원자 질량은 약 16.00amu입니다.
- CO 2 에는 탄소 원자 1개와 산소 원자 2개가 있습니다.
- 이산화탄소의 몰 질량은 12.01 + (2 × 16.00) = 44.01 g/mol입니다.
각 원소와 동위원소의 질량을 NIST기사를 참조하십시오 href='http://physics.nist.gov/cgi-bin/Compositions/stand_alone.pl'> a> 관련 : 아미노산의 분자량 |