몰 질량 of Codeinone (C18H19NO3) is 297.3484 g/mol
C18H19NO3 중량과 몰 사이의 변환
다음 물질의 원소 조성 C18H19NO3
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 18 | 72.7068 | 수소 | H | 1.00794 | 19 | 6.4405 | 질소 | N | 14.0067 | 1 | 4.7105 | 산소 | O | 15.9994 | 3 | 16.1421 |
몰질량을 단계별로 계산하기 |
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먼저 C18H19NO3에 있는 각 원자의 수를 계산합니다.
C: 18, H: 19, N: 1, O: 3
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C18H19NO3) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
18 * 12.0107 + 19 * 1.00794 + 1 * 14.0067 + 3 * 15.9994 =
297.3484 g/mol
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화학 구조 |
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![C18H19NO3 - 화학 구조](data:images/png;base64,iVBORw0KGgoAAAANSUhEUgAAATwAAAEACAYAAAAuvcrQAAAABGdBTUEAALGPC/xhBQAAACBjSFJNAAB6JgAAgIQAAPoAAACA6AAAdTAAAOpgAAA6mAAAF3CculE8AAAAB3RJTUUH5wwYES82V4p3WAAAAAZiS0dEAP8A/wD/oL2nkwAAJodJREFUGBntwQeAHgR9N+DnLptA2CuAIGgEgxplKUFFjSJqtH6IgMjZOlLU4oGisc4TBSPiOEdq6iQOELWOWK2iVCDiYCNDQDaELSMEyLj7fdZTk8u9ISFkvPfe/3kMcSOxK56OrfXXji0wVmNt2AIbKqWUJrYF/hPzEQTBOdhTn/EIZmpsHIKTlVJKk9oEV6AXp+AVeA7ejOvwZ2yG8QhmamwcgpOVUkqT+iyC9xtoS0zWZzyCmRobh+BkpZTShEbgftyM4R7ZeAQzNTYOwclKKaUJTULwbSs3HsFMjY1DcLJSSmlCL0ZwopUbj+AOnItzcS7Oxbk4H8HJSimlCb0UwUes3HgEV+DL+DK+jC/jy5iN4GSllNKEnongZCs3HsFMjY1DcLJSSmlCG2IxLrJy4xHM1Ng4BCcrpZQm9UMEL/bIxiOYqbFxCE5WSilN6sl4EPeiA2P0GYNX4l/1GY9gpsbGITjZUiNwNH6Ir2I/pZSynu2HaxAsxJ3oRfBzfcYjmKmxcQhOttSX8TVMwRswH7sqpZT1bCReiLfjfejA0y01Bq/FXhobgdfiWZbaDsMsdTEOU0opTaYNe6LNYzMCT8S/4jpsqZRSmsxcBPt4bLbFGZiHT2KYUkppMp9GMMOaMRIX4Y1KKaXJPBfB1VbfOP19Cx9VSilNph23IniK1TMHX8TL8Bbcj2cqpZQm9EUEH7B6NsK7cSq+gH2VUkqTegmCC5VSSosbgXsQ7KKUUlrcNxG8QymltLhXIZirlFJa3AZYgB6MV0opLe4HCN6slFJa3OsQ/FwppbS4TbAIi7CZUkppcacj6FBKKS3uLQi+r5RSWtw26MGDGKuUUlrcOQgOUkopLe6dCL6hlFJa3OMR3IuRSimlxV2M4MVKKaXFdSGYpZRSWtxTEdyOYUoppcVdzYaXc8KzlFJKa7vtIyTkk0oppbXlWSTketKmlFJaV9rITSTkGUoppbXl8yTkw0oppbVlCgm5TCmltLYMJ3eSkF2VUkpry9dIyL8rg8Xe2FMp5dHKK0jI75Vm92zcgCC4CTsqpayqjCb3k17yOKXZjMQROB9BEATBbdhbKWVV5Tsk5G1Ks9gS03ETguB2fBmT8Fxcj2AxutCulLIyeQ0J+V9lfZuAbixAEFyEaRijv+HoQg+CX2BbpZRHko3IQ2QJ2VJZ19owBXPQi6AHp2Mq2jyyKbgVwe14sVLKI8lPSMgblHVlNDpwGYJgPmZhN4/O1vgZgl50Y4RSSiN5Ewn5sbK2bYsu3IUguAVd2Mzqa0MnFiH4HXZWSlletiCLycNknLI27IHZWIQgOA8dGG7lHo9P4PEe2T64FsG9OEQpZXk5k4Qcqqwp7ZiKuQiCRTgNz7Jq9sBsLEbwKSu3MU5DEMzGBkopf5ejSci3lcdqHDpxPYLgXnRjBys3Eq/FeQiCh/E1PM2q68CDCC7D7kop/yfbk14yn4xRVscT0I0HEARXoRMbWLmN0YkbEQR3YAa2t3qejisRPIhOpZT/k3NJyFTl0dgPp2EJgmAupqLNyj0R3ViAIPgjOjHGY7chZiMIvoNNlDK05T0k5CvKyoxCBy5BEDyM2djdyrVhCuagF0EPTsdUtFnzOjAfwXV4plKGrkwgIXeR4UojW2M6bkEQ3IoubGHlRqEDlyII5mMWdrP2TcAFCBahC+1KGZpyOQl5vrKsSZiFhxAE56MDI6zcNujCXQiCeejCZtatUehGL4KfY2ulDD05nlxEDlTaMRWnIwh6MAdTrJo9MBuLEATnoQPDrV8vx10IbsMLlTK0ZJiyEabhjwiC+9CNnaxcO6bidATBEszBvprL9jgLQQ9mYJhSWl9OIOeRYzSUH5Gval3jcBTuQxBchX/DhlZuHDpxPYLgXnTjcZrXMHRhCYJfYTultLacQkIeJk8yQK4l52g9bTgYN6IXCzAXB2OYldsF3ZiPILganRhr8NgfNyO4E1OV0rpyCllI7iA/M0CuJedoLXvgHARBcJtVsx9OwxIEwVxMRZvBaQv8GEEvujFKaVpb42kYrbEt8TRsoCwnp5AF5CgScqh+ci05R2vYDN1YgmAePozgHCs2Ch24GEHwMGZjd62hDZ1YiOB8PFFpSl0IJmnsWASTleXkFLKADCeXkFvJJv4h15JzDG7t6MAdCBahG+NwCILTDLQJjsMdCIJb8B5srjXtgasR3I/XKk2nC8EkjR2LYLKynJxCFvirTCEhn/MPuZacY/DaC79DEPwSEy11LIJPGmhTzEdwAaZhtNa3Eb6BIJiNDZWm0YVgksaORTBZWU5OIQv8Q04lPWQvf5VryTn+KluR4QaHbTEbvQhuQoeBPoXg7Rp7A/YzNHXgAQR/xCSlKXQhmKSxYxFMVv4i7eRx/iqnkAX+IduQe8l5pJ1cS87xV/k5eYDMJd2kg+ykuYxAJ+5D8CC6MFpj30HwaqWRXXERgofxSbQp61UXgkkaOxbBZEu9AV/EnoaMPJl0kWvJ1aSNnEIW6CdvJyEd5Fpyjr/K70lISEhIyA3k2/z2LZiM0daP5+NSBMEcPN4j+y2CZykrMgb/gSC4Bdsq600XgjswD/MwD/MwD/chmGypnyK4H5fgBzgYI7SUbEveTi4kISEh15BtyClkgX4ynFxCbiTzyDn+IePIFNJF5pC7SEh491kIFuMyzEIHJqLN2rMDZiMIrsSBVs3NCHZQVuYE9CL4nLLedCGYheNwHI7DcTgOpyOYbKlLEARB8DCuxE/wRmxoUMoYcjCZQxaTkJB7yGwyhbT5q5xCFhggk0kvCTnHCqWdPJn8Cy/+MC7GEgRBENyBs/Fya84YdOEhBA+gCyOtmmFYgiUYrqyKsxH8RllvuhBM0tixCCbrMx63IQiCIAiCHlyHX2A6ttLU0k72I7PI/SQk5GEyh3SQDQyQU8gCDeWrJOQcj85Y7IdOzMb1CBajB9t67KbiOgS9mI1tPDo7ILhZWVVnIzhFWW+6EEzS2LEIJuvzz+hFEARBEARBEAS3Yi6Ox/aaRiaSLnI9CQkJOY90ki09ohxNvq6hbElOJR/x2O2EuxC83uqbgJ8iCC7AZKtnXwS/VZb1OLwGTzHQjxC8QllvuhBM0tixCCbr8w0EQRAEQRAEQRAEQXAHzsMsTLTubY93sdOZZAkJCbmSfIDsrDkdg+BUj95YdGEhgrvRiWFW36sRfEdZ1j8jONlAFyDYQ1lvuhBM0tixCCbr81sEQRAEQRAEQRAEQRAEwd04D1/Fs9Bm7RiHf8Yv0YMgXH8G+Sx5pua3I3oxH6OtmjZ04FYEPZiNLT12b0fwKWVZ70NwvIHuQLC1st50IZiksWMRTNZnZ/w/dOHr+DHm4mJchdvQiyAIgiAIgiAIgvm4HD/AyzHCYzMMUzAbDyAIHsYcHIyRBpfzEbzMyj0dcxEEv8Pe1pxPIjhWWdYXELxZf6PRi4VoU9abnfA8bKixHfA8jLNyo7EzDsR78HX8D+bifFyFO9CLIAiCIAgW4nL8BEdhI6tuImbgNgRBD+aiE5sbvN6H4MtWbDN0YwmCeehAmzXrNASHKMv6MYKp+nsCgmuVIWM0dsaBeA++jv/BXJyPq3AHehEEPbgev8KHsY2BdkAnLkIQBJejCztrDU9GcBeG668dHbgTwSJ0Y5y14xwEk5VlXYTg6frbH8GZSvmbsZiIV6ILX8cczMXFuBn34GqchMfjfPQiCG7Fp/AMrekKBM+z1HNwEYLgF5ho7boRwY7Ksu5GsKX+Xovgm0pZRWMxEQfhw/gpFiF4ED/C/lrbCQg+g20xG70IbkSHtW8YFqMHI5W/2wDBQ2jT37sRfEwpq+koBAsQBMGleA920nr2QnAv7kPwILow2rqxPYJblGVNQHC1gT6H4CilrKbt0IsF2A/duA1BEJyHTmyjNUzBIgTBHOxk3Xomgt8py3o+gv810A8QvFIpj8FvEbxSn2HYD7NwP4JgCeZiGjYy+OyA2QiC4NvWj1ch+J6yrA4EXzfQ+Qj2UspjMB3BbAONxlSchoUIgocwBwdjpOY2Bl14CMED+BqCq6wfxyDoVpb1XgQfNdDtCLZRymPwBAT3YKQV2wQdmIMlCIJ7MBtTMUxzmYrrEPRiNrbBMNyOYKJ17yQE71SWNRPBW/U3Cr1YhHalPEaXIHiRVbMdOjEXQRDcjG7sZ/2agJ8iCC7AZP19CcH7rXunIjhMWdaPELxCfzsjuE4pa8CHEPyHR283dOEqBEFwObrwROvOWHRhIYK70YlhBnopgguse79G8GxlWRci2EN/z0FwtlLWgEkIbsMwq28iZuBWBEFwGaZjG2tHGzpwK4IezMYWVmwU7kOws3XrBgQ7Kcu6E8FW+jscwSlKWUP+hGCyx64d+2EW7kMQ9GAupmGcNeMZ+DWC4Ew8zao5BcHbrTvtWIQejFT+bjR68TDa9DcdwYlKWUNOQnCSNWs0pmI2FiAIHsIcdGADj95m6MYSBLegA21W3asRnG3dGY/gVmVZT0BwjYE+g6BTKWvIZATXoc3asQk6MAeLEQT3YDamYrhH1o4O3IlgEboxzqO3IR5ED7a1buyN4FxlWfsjONNA30dwkFLWkHbMQ/B0a994dGIugiC4Bd3YD236OwqXIgh+gSd7bH6E4F+tGwch+L6yrNci+KaBzkWwt1LWoJkIjrNu7YTpuBJBENyEs3EkrkMQ3IgOa8a/IPgf60Yngs8oy/p3BDMMdCuC8UpZg16I4A/Wn73xadyKIAiC4GcYbc3ZHDfhs9aNExFMV5b1OQRH6W8EerAYw5SyBo3A3QieZP0ahrfhatyL6/BMg98pCF6jLOsHCF6pv50Q3KCUteBkBNO1ts2tH2cjeI6yrPMR7KW/ZyOYq5S14J8Q/FbrGo5bcAVm4lXYwrpxHYKdlWXdjmAb/R2G4FSlrAVj8AB6sYPW1Y5JeDt+jHtxIZ5n7WnHQvRilPJ3o9CLRWjX3zsRnKSUteS7CI4ydAzHs7C9tWdbBLcry9oZwXUG6kZwtFLWksMRnKE1HYaP4QBsYN3ZC8F5yrKeg+BsA30PwauUspZsjIVYgi21nqfggzgT83EmPoitrF2vRPADZVmHIzjFQL9D8EylrEU/RfB6rW0DvAgzsJW16ygEn9PY8XiJoWc6ghMNNA/B9kpZi6YhmKP17IPh1r2PIXi3gfZH0IuTMNLQ8RkEnfobgSVYguFKWYu2whI8jHFax+a4EPdiDo7B09Bu7fsmgtcaqA2dWIjgPDzB0PB9BAfpb0cENyplHTgLwSFazxZ4FWbiAoy0du2I67AEXVZsT/wJwf04XOs7F8He+puM4BxlUNsIh+FpGhuDw7Cn9esYBKcqj8WrcQ+CHgRfwBiNjcO3EASzMVbruhXBeP0dguA0ZVCbgOBEjY1HMNP6tSN6MR+jtYaP4Ft4I3a2do1BN4Lg+3gLFiC4HE+1Yh14AMEVeJrWMwI9WIxh+jsWwSeUQW0CghM1Nh7BTOvf+QhepjU8Dq/HNzAPZ1g79sSVCB5Cp6WejEsQPIROK7YbLkbwEDq1lp0Q3GCgTyF4uzKoTUBwosbGI5hp/Xsfgi9rTVtbs9rQiYUILsVTDDQG3QiC72FTjY1GN4Lg+9hMa9gNF+LHBvouglcrg9oEBCdqbDyCmda/JyO4C8MNbhvi1djS2rE1foqgF7MwxiM7CPcguB77WrFX4s8IbsR+WttvETxLGdQmIPg0NsbG2BgbY2M8CcFMS70Uh1k/rkDwPIPbjvgR7sHFeLM15xW4E8HteKlVtxPOQbAYXWjX2OMwF8FidKFda7oZwQ7KoDYBQRAEQRAEwUxLfRFv0acNMzDCunECgs9oDcOwDyZ77EajG70Ifo5tPXrD0YUeBL/Athobji70IDgD47WWYViCJRiuDGoTEPwIh+JQHIpDcSjejGCmpf6AZ+jzRFxvqedjL2vPXghuRpvBq82aNREXI3gY09HusXkhbkVwO15sxV6AeQjuwEu0jpcjuBNtyqA2AcGJGhuPYKY+G2E+RuhzBE611HdxqD4j8VprVhtuQLC3wetHOBsfwkSrrw3TsADBFZhkzdkaP0PQi26M0NhW+CmCXnRjpMGpHVNxOoJ7EfwQmyuD1gQEJ2psPIKZ+rwAZ1rqczjGUjdjJ332wQWW2gPbeOy6EXzU4DUGU3ACXmr1bIk5CILZGGvNa0MnFiH4HXbWWBs6sQjB77GLwWNTvAs3IAjuwndwD4Ib8WxlUJqA4ESNjUcwU5/34kRLnYtn6bMDbrfU2zDTUmfgAH02wESrZ38EVxm6pmAegntwiLVvH1yL4F4cYsX2xjUI7sNhmtsu6MYDCIKr0Imx+uyAsxEsQReGKcvaFm/F5/EVdOGpltoSH8ILNLYxPoQDrSUTEJyosfEIZurzHhyozxg8gDH6HIwfWOqbeJ0+7bgXm+pzAM6w1HgMt2qG4XYEuxt8dsaxeAbaPTqjMAM9CM7AdtadjXEagmA2NtDYOJyKIJiNsZrLfjgNSxAEczEVbQYaji4sQfC/2E75P0fiQQTX4xI8iB58VJ+JCI7X2I4Iuq0lExCcqLHxCGYaaDieZqmX4XBLXYNd9XkqrrDUB3GCpS7EXvqMwgiP7EsI3m/w2QWfxeWYYtXtigsQLEYX2q0fHXgQwWXY3Yp1YAGCy/FU69codOASBMHDmI3drZrn4RYEd+JlhraXI/gjnmGpDTETP8cGmIjgeI3tiKDbWjIMW2NDjbVja2zk0dsKbfrshjda6rv4J33G4gGM0ucQnGapNgO9FMEFhoYOPIDgWuxr/XsGrkTwIDqt2JNxCYKH0Gnd2xrTcQuC4FZ0YQuP3pb4bwS96MZIQ9OlWIgJGhumz0QEx2tsRwTdWkwbhumzMV5vqXfiGEtdiR30Nwr3IdjZ4LK5VbcJTkEQzMaGmseGmI0g+A420dgYdCMIvodNrX2TMAsPIgjOxzSM9ti0oRMLEZyHJxhanoDgx1ZuIoLjNbYjgm5DVBtehTZ99sc0feYg+A3egIlo1/zOxg3Y2iN7Hm5CcB8O17w6MB/BdXimFTsI9yC4Hvta89oxFacjCHowB1OseXviagT343BDxysQnGTlJiL4KvbBPtgH+2AfvAJBt9LPtrgFdyMIgvmYi24cjK00pwlWbDi6sATBb7Gz5jcBFyBYhC60a2xHnINgMbrQ7rHbCNNwBYLgfnRjJ2vXOHwLQTAbY7W+IxAcY+UmIgiCIAiCIOhW/mEcLkRwMd6FU3A9giAIgj/hGzgKe2OE5rUTfo1gMWZghMFjFLrRi+Dn2FpjI/FJ9CL4ntX3eMzAnxEE12A6NrFuvQkPIrh8a3bX2g5G0GXlJiL4EiZhEiZhEibhQATdyl+NwZkILsNm+tsGU9GFOfgzgiAIFuE8dKMDE607++MTaDPQwbgHwQ14tsHr5bgLwW14oRWbglvxRo/eHpiNxQiCuTgYw6w/u+LiTbl3IX8KnVrLWByqzzMRfMXKTURwvMZ2RNCtGIbvIrgZO1q5YZiIDnTjPPQgCIJgHuagC1OxibVjJ7xOf+PwDQTBd7CpwW8HnIWgBzMwTGObW3UjcTB+gyBYiNOwt+Yx5mw+EhISvhs2Nbhtiy7chWAyRuM+3IQRHtlEBMdrbEcE3Ya4NnwRwV3YzerbCPthOubgDgRBECzBZZiNaZiIdmvePvgTgvsxTWsZhi4sQfArbGf1bInpuAlBcDtmYDtNKrwy/Dkk3Bj2M/jsg1OxGEEwF/vq8wkEH9fYKH0mIjheYzsi6NbfcOyAsYaIExAswGRr3ngcjG7MxcMIgiC4H3MxA1OxhUdvd32GYToWITgXT9S69sfNCO7EVKtuArqxAEFwEaZhjEEgPC7MDQmLQ1do19zaMRWnIwgW4TTsq7+x+D2CM3EUDsV0zMV39JmI4HiN7Yig21LPwbW4HHdiJtq0sLcgWIQDrRsjsAc6MRvXIAiCIJiH09CJ/TDKirXhvXgczkTQi26M1Pq2wI8R9KIbozTWhimYg14EPTgdU9FmkAnDQ1foCQlnhPGazzh04noEwb3oxg5WbCw+iD8hCO7Fr/BqfXbFPXifxrbHPfiopT6P3fXZBH/GvlrUoehBL/7F+jUeU9GF07EAQRAECzAX3ejA4/V3EP6M4FYcYGhpQycWIjgfT7TUaHTgUgTBfMzCblpAeEGYFxLuCC/RHHZBNx5AEFyFToz16IzGhta8sbgHe2lBz8fDCN6h+QzHHngrZuNKBEEQBDfiNPwSQfBf2MzQtQeuRnA//g1duAtBcAu6sJkWE7YKPw0JvaE7jLSOhbYw5aV8Hj0IevE/OABtmsN2+BQuwfu1oD0xH8HHDB7jsB+mYw7uQhBch0XoVP7POJyCYD6CYC5ehWFaWGgLnWFRSDg37GIdCKNCR7gk5HKux4OYjd01n03xaszAVdhGC3kCbkPwdbQZvNqxGz6C4Ga0Kcv6DXrwa+xliAl7h2tCwn3hMGtJ2DZ8ONwREhJuDv/eweYGh9NxtBYxHtch+DGGaw1tuAnBM5S/G4V7EexiiArjwqkhIWF2GGsNCZPCrPBQSEg4P0wLozW3f8Hm+ozAZXiDFrAxLkTwW4zVWj6P4MPK370cwXmK8JbwUEh4k78Jo0Jn+E24NzwUrguzwi4aCO1hajg9JCT0hDlhisGjC7fiv3EVfokNDHJjcBaCS7GZ1jMFwWXK381G8G7lr8JTw+dCm78IG4Vfh4SzwnvD0eFL4cEwP7zA34SNwrRwRUhIuC90h50MTlvhudhVCxiG7yG4CY/TmobjTgS7KiPxZwRPUBoKXwgJx1hO2DXcEe4Mm4W2cHVISLg6HBU2VJpCG76E4C7sprV9DcG/Ky9DcIHSUNgyLAxzrUB4Y0g41l+ED4W54eAwTGkqMxAswL5a3ysQ/F75GoL3KA2FV4WEd1mBsHHoCf/jL0K70pTeimARDjQ0jMb96MXjDF0jcDeCXZWGwjtDwqEeQbglXKU0rcPQg168ztByGoK3GbpeguAiZYXC+0PCAR5BuC7cpDSlF+BhBG839ByG4H8NXV9B8D5lhcLbQsK/WIHQHhaGPyhNZy/MR3CCoWkjPIQl2MrQMwJ3I9hNWaHwgpBwvBUIu4SEbylN5Ym4HcFstBm6/hvBGww9L0ZwifKIwuhwZ7g2jNZAOD4kHKw0je1wPYI5GG5oeyOCHxt6voTgA8pKhbeFhFPDRpYRDgsLw+/DcKUpbIyLEPwGY5UtsBgPY5yhYzjuQPBkZaVCWzgp9IY/hx+FU8JlIeGisL3SFMbgbAR/wKbK3/0KwWGGjhchuFR5VMKe4ZPhJ+HM8PXw2jBcaQrD8F8IbsQOyrI6EZxm6PhPBF1KaSFt+DKCO7Grsrzt0Yv5GKPFheEv5uw2erG7UlrIxxEswLOUFTkXwcu1uPCCkAc5Wykt5N8QLMIByiN5D4KvanHhCyHhOKW0iMPRg150KCszAcFdGK5FhWHh9pDwFKW0gGOxCMHRyqq6HMELtKjw/JBwpVJawBsQBJ9QHo2PIPicFhVmhoSPKKUFXIHgarQrj8YeCG5GmxYT2sO8kPA0pbSAuxB8SVkd1yJ4phYT9g8J1yilRXwLwYUGeib+Gx9RVuRTCD6mxYTPhYQTlNIitkMPHsJG+ns2gmuVFXkOgqu1kNAebgkJT1dKC5mL4GD9tWMegqcqjbTjVgRP0SLCc0LCtUppMe9A8C0DzULQpazIfyL4oBYRPhMSZiilxeyE4H6M1t+LEVysrMiBCC7SAkJ7uDkk7KGUFnQhgpfobwT+jGCC0sgI3INgF4Nc2C8kXBfalNKCPoDgiwb6OoJ3KivyTQTHGuTCp0PCiUppUbsjuBPD9ff/EJyjrMirEPzaIBbawg0hYS+ltLA/Iniu/jbAA+jF9kojG2ABejDeIBX2DQk3hjaltLAZCD5toP9C8BZlRX6A4M0GqXB4uDd8Qiktbh8EN6FNf0cgOF1Zkdch+LlBLIwKmyilxbXhRgR76m8TLMRibKE0sgkWYRE2MwiE/cOHw5fC58PbwvZKGSI+i+B4A/0MwT8rK3I6gg5NLGwWzggJ94XzwqWhJzwc3q6UIeD5CK400JEIfqisyFsQfF+TCsPCmaEnvCOM8Ddhp3BWSHidUlrcMNyBYDf9bY0ePISNlEa2QQ8exFhNKLwyJHxCA2GTcFuYF0YopcV9BcF7DTQXwcHKipyD4CBNKHwzJDzBCoQTQ8L+SmlxUxGcZ6B3IPiWsiLvQnA1ZuHzmIEZmIEZmIEZmIEZmIEZmIEZeD+mY/oP+bcwPUwP08P0MD1MD9PD9DA9vDVMC9PCtDAtTAvTwrQwxV+ES8Oi0G4FwsEh4W1KaXGjcB+Cx+tvJwT3Y7TSyH/iPgRBEARBEARBEARBEAT5NueHhISEhISEhISEhISEhISEhIRT/UW4KdzgEYQXhIQPKmUI+DaCow10IYKXKMt7O4KF+BSm4S2YjumYjumYjumYjumYjumYjuk4DjMw40e8J8wIM8KMMCPMCDPCjDAjzAifC7PCrDArzAqzwqwwK7zJX4Srw/0eQTgkJLxTKUPAoQjONNAHEHxRWdZr0INedOjTpsmE00PCxlYgTA8JBytlCNgQD6EH2+hvdwR3Yrjyf6ZgIYJj9NkCJ2ky4d9DwqutQPhVWBS2VsoQMQfBmwz0RwTPVfbGfAQf0d8ITSZsE+4L14StLCccERK+ppQh5PUIfmKgGQg+bWh7Im5HcDLaDNSGNk0kvCosCvPCe8PU8Jrw9dAT/hA2U8oQsjkWYxE21d8+CG5Cm6FpO1yP4EcYbqCxuBzP1mTCPuGn4eGQkHBL+FjYWClD0BkIXqO/NtyIYE9Dz8a4GMFvsIEVe4omFkaE8WFTpQxxRyH4joE+i+B4Q8sYnI3gD9jUqhmmlNLUtkMvFmAD/T0fwZWGjhH4bwQ3YgcrNxyfxeVoV0ppar9D8E/6G4Y7Eeym9bXhKwjuxJOsumnYViml6b0bwckG+gqC92p9H0ewAM+y+oYrpTStJyK4ByP1NxXBeVrbOxEswgFWz1T8Ep9SSmlqlyJ4of5G4T4Ej9eaDkcvenCI1fclHIoRSilN7TgEMw30bQRHaz0vxWIER1tzRqBdKaUpPR3BrWjX36EIztRa9sEDCI6zZmyG6bgJ+yqlNK1rEOyrvw3xEHqwjdbwZNyNYJY15yx8BU9TSmlqn0DwcQP9GPfh+Qa/7XEDgh9iuDVnmP5GK6U0pf0QXGeg7TDK4Lc5LkfwK4y2djwDs3EV2pVSmk475iF4mtazAeYiuASbWjtOxvU4FpsopTStLyDo0lpG4CcIrsW21p5dMFx/GyilNJ1XILhH62jDVxHcgSdZN0biCJyHjyulNJ2x6EXwCWxp8DsJwf3Yw7rxZtyCn+FAtCmlNKVLEAS9uAyzMQ0T0W7wmI5gIV5k3TkQE/W3AdqVUprKxjgLC9CDIAiCu/ETfBAvxqaa02vRix682vqzPT6KO7CPUkrTGoE90InZuBZBEATBPJyGTuyHkdavl2Exgk7rxx74Fu7Gp7CzUsqgMx5T0YXTsQBBEAQPYC660YGdrDv74AEEXdaff8MxGKe/jZVSBq3hmIgOzMJl6EUQBME8zEEXpmCMNW8i7kbwBc3lefghrkS7UkrLGIcp6MIc3IUgCILFuAyz0IGJaLP6tscNCH6AYda/kTgYv8VV6MQGSiktb2d0oBtzsRBBEAT34nR0YSo2s2o2xxUI/hejNYcP4yd4Edos1Y5NlFKGjLHYD504DbchCIIguAaz0Yk9MEx/W+I8BL3YUfNo19+GeCuuxAlKKUPaTjgMn8Zv8DCCIAjux1n4Do7HXQgeQvBazWdbdOEOzMEUpZSynOGYiGmYjasRBEEQ9OAzCL6nubwJd+Hj2FEppayiEbgHwfn4M/6AQ7EderEAYzWPLbGhUkpZDScjeLeBfovglZrPJPwH9tbYbvgPPFsppfzNPyH4nYGmI5it+RyE4AiNHYDgSKWU8jdj8AB6sYP+noDgHozUXA5CcITGDkBwpFJKWcZ3ERxloEsQvEhzOQjBERo7AMGRSillGYcjOMNAH0LwH5rLQQiO0NgBCI5USinL2BgLsQRb6m8SgtswTPM4CMEnMRVTMRVTMRUfQHCkUkpZzk8QvN5Af0IwWfM4CEEQBEEQBMGRSillOW9CMMdAJyE4SfM4CMHbsB22w3bYDtvhNQiOVEopy9kKS/AwxulvMoLr0KY5HITgCI0dgOBIpZTSwJkIDtFfO+YheLrmcBCCIzR2AIIjlVJKA0cjONVAMxEcpzkchOAIjR2A4EillNLAjujFfIzW3wsR/EFzOAjBERo7AMGRSillBc5DMFV/I3A3gidZ/16EK/Fyje2HK3GoUkpZgfci+IqBZqNnJ96mlFJawG4I7sJwyziRl9zIbeF3SimlRVyBh57PcywjjAkPhN6wg1JKGey+xrvu54HwWcsJ3w0JRymllMEu7BkSbg5tlhEODwlnKKWUwS60hRtCwj6WETYOC8OSsKVSShnswqdDwgzLCT8NCa9XSimDXXhuSLjacsK0kDBHKaUMdmFYuD0k7G4ZYauwJDwcximllMEufDEkfMBywlkh4RCllDLYhZeEhAstJxwTEk5VSimDXRgV7gsJO1tG2DH0hvlhtFJKGezCt0LCOywnnB8SXqaUUga7cHBImGs54X0h4ctKKWWwCxuGB0NP2NYywpNDwl1huFJKGezCD0PCkZYTrggJz1NKKYNd+OeQ8DPLCSeEhM8opZTBLmwWFodFYVPLCHuFhJtDm1JKGezCL0LCEZYR2sKN4d6ws1JKGezCW0PCf1lO2DWMVEoprSCMDz3h8tCulFJaWdjNMsIe4egwI7w/vCKMUUoprSJsEX4eEhaG68M9IeGWcIBSShnswshwblgS3hnG+ovQFl4Qrg8Lw15KKWUwC28KCe/TQJgYFoWzlFLKYBZ+GRaHTaxA+H5I2F4ppQxW4c/hBo8gvCskTFVKKYNRaA+94dceQXh9SHidUkoZrMLCcLFHEN4REg5RSimDVbg23O0RhO6QMFkppQxW4ash4akaCG3hD+H+MEYppQxWYe/QE34RRlpOODIkfFIppQx24biQ8LtweNgrHBBmhZ5wUdhQKaW0gnBEuDIkJCTcG7rDOKWU0mrCtuHp4UlhuFLKGvP/AZkz6XAah45xAAAAJXRFWHRkYXRlOmNyZWF0ZQAyMDIzLTEyLTI0VDE3OjQ3OjU0KzAwOjAwKuyP5wAAACV0RVh0ZGF0ZTptb2RpZnkAMjAyMy0xMi0yNFQxNzo0Nzo1NCswMDowMFuxN1sAAAJuelRYdE1PTCByZGtpdCAyMDIzLjA5LjMAADiNfVVBbhsxDLz7FfqABZKiRPLQQxynaVHEBtqkf+i9/0dJbeyVAaJri9iVZ0ekZigfSlw/zz/+/C33i86HQynwn6+Zld8NAA5vJW7K6eX1+6U8vz+dbjPP14/L+69CvZD5O/55xD69X99uM1iu5Qh1tIYm5ci18WAbBSrMa3+XynM5YgU1GlaOVA2lIybIFkiqvbNym3cmppYgOZCtAoLhCHYcBsAJsm+cAMjYI2Po1jlbfWxI7sIqBWsbxpxRSrnEktQ69uZARQKWBKjBCM7oSHbgYBytJ0DbgIRAEr+rWEdIgD45kc6oXoTfNTEYLYOiQ10gJZKgcnFoaAYMgbwKQxSZlC5QowzZXHSsTEDOfozKu0rKyVueICYhukNBgVNoKNQqDR4jZHFqwnT14atzZWnd6wjvyRBNKcUpe1UW6LSl0TSVEnUuzmTU1EsTr6xnJsaQiCoRuOFLOBNyIMHcduXhyzujqRBm+hB+9gWTzNxUwDhzB312kAG7eT1dA3G1MmQr36IvfCtt7gx1M02RvCG9bvBtd2+q2kgL6o50x1Hzto1X0FVP7fFyOT8cEduhcbpezvuhQTH2kyEm2t7+/lB473H00fdGRh9j71b0IXtPog/dOw992N5fGK3jGn59/dKWZprTiEvPcASkpTlwhrY0Ac7Ai9l5YvriaZxhLObFGWQxKU+MLmbkCGiL6zgCrfbCCISLj6J0osUuGDnR4oo5gav6PKlwURmD6p4wjW1z7jWRTAGc7GETSacQzhjTO599JtEf4eGR1RHxfPsL8vvDP6/aRbqaKKW5AAAAHXRFWHRyZGtpdFBLTCByZGtpdCAyMDIzLjA5LjMA776t3gB/YpoAAAFhelRYdFNNSUxFUyByZGtpdCAyMDIzLjA5LjMAACiRLZE7bgMxDESvknINyAL/nxgBAmwKV3GVynC1h3CTw4eU00lPQ3I4ul8f9/3zgbR/7Pv2cTv1jbf79XG6HXLosR3HIbf9tNdD6dbL91b3F1Dit9/tzFPMMgdM0szAcTnTBEDBcYYJmipIBXkCQtI440TLpVKVkNGH9GyEEyLJGyW6di+YxoxZTCaL6ULg6RbavQICCsIsO1Uyag4GKo8LTiEgXCLUiCaRiNG+uPozdZ0F1USYkkYWTUIsxAfODK/6C00iYB7tE9DGpVamJCmF14AFyCqFzgCRel2Z4qzeo8zNe7pWYy+vyz+HCL42FnKpynBI0ZWLqEtWd7YUWdElMVgRi6gouoxYUUevRr1/kQQpTWnBI1dMoiVqmyZoshAhUKXU4/I/3xLF67PYE4zHaTx/3jEmwfPrvQwOmzZI6n9//wBfDHVBSy84jQAAAABJRU5ErkJggg==) 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관련 화합물
힐 시스템의 공식은 C18H19NO3
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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 |