몰 질량 of Perfluoro(2-methyl-3-pentanone) (C6F12O) is 316.0444 g/mol
C6F12O 중량과 몰 사이의 변환
다음 물질의 원소 조성 C6F12O
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 6 | 22.8019 | 플루오린(불소) | F | 18.9984032 | 12 | 72.1357 | 산소 | O | 15.9994 | 1 | 5.0624 |
몰질량을 단계별로 계산하기 |
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먼저 C6F12O에 있는 각 원자의 수를 계산합니다.
C: 6, F: 12, O: 1
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, F: 18.9984032, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C6F12O) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(F) * Weight(F) + Count(O) * Weight(O) =
6 * 12.0107 + 12 * 18.9984032 + 1 * 15.9994 =
316.0444 g/mol
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화학 구조 |
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![C6F12O - 화학 구조](data:images/png;base64,iVBORw0KGgoAAAANSUhEUgAAATwAAADGCAYAAABPezzNAAAABGdBTUEAALGPC/xhBQAAACBjSFJNAAB6JgAAgIQAAPoAAACA6AAAdTAAAOpgAAA6mAAAF3CculE8AAAAB3RJTUUH5wwYES8rNIwbgQAAAAZiS0dEAP8A/wD/oL2nkwAAH2lJREFUeNrtXQl4FVWyPmDYRDYRBFwjKCIQCKsBxKgoAi4zKg4iqIjyeCMjz+Ep6owa542O6yhuiOioKKgoKigKuEQhhmxckmgARQQRARcEUfYlr4pbTXfC7Xv75m7dff7/++ojpM/N7VNd5+9zqs6pUgoAokClUk1JziYZRnI5yZkkDaEZAAD8RHTdSd4j2UNSWU12kbxBcio0BQCA18luBMluIbdtJLNJ/k0yiWS+EJ5xbQg0BgCAV8kuyzKrY6I7OkSbk0gWW0gPMz3A/+heUvJQj+LilyJJRllZS2jLM4QXECLLJ0kL064RySppOxeaA3QgvFUklQ6kLbTlCbLrbfHT9XfQfri03UeSDg0CuhDeJJrJDbKTrPz8BtCWJwjvViGwH0hqOWjfwOLruwYaBLQgvG5LllwPbfiC8GYIec2P4jPl8pl/Q4MACA8IpbduNPOdE0lIr3clmfDmCXlNj+IzH8lnXsSTBUB4wCHgZb4T3ye1ez/JhBc1eVlIcgaeLADCA8IR3u6eRUV97IT02iHJhDdLyOutKD6TL595Ck8W0ILwSBaRPBtKaOB2hKZsCW+Xm+6LSOthIa8vovjMJvnMzXiygC6EZys0SzkfmvIM4Q0V8tpL0tpB+0zLNpZ+eLKAFoRHA3gKEdufQgnN8FpBU54hvIYkW4TA/s9B+xekLW9Aro0nC2hBePDh+YPwhMRyhMR2kgwI0443He+XtqPxVAEQHhCJ8PaRvG4jj6WI8OqQLBIi403Fj5L0ImlM0oyXriTPyemKSsmaUgtPFQDhAZEIL5x8ncJZ3uEkL1tmcKFkj2RPScMTBUB4gBPC281BHRs5wwXLW86Jdz/JQpLlJMtIPib5BzKkACA8IFrC2wVtAAAID4SX+tndiZz3Lsz1DiRXkvTAEwVAeCGQlZ9/JLTmGcIzsqDUtbluZFb5F54ooAV6FRaeQoO2c+fy8maR2rJPitpuxGzQM4S3VQitkc31m+T6IxgJAHAo4Y2wOOrP0FkXHiG8n4TQjrK5/mecoQWA8EvgSTLQN3QpLT1GM5K7lIj+aaKI2h4hvHVCaMfaXL9Wrj8HywaAEMjOzU2jQZ4rx9Hy261cWU+T2e0l1Oc90u+LPUJ4XwuhtbW5fqVcfxmWDQA26FVY2JwG+jcy4H2/HOI9ddTPndLfB4X469PPx/csKjrOxYRXIYR2ms31y4yTFrBqAAgDGuhdacBv8/uWFurfeSQ7pJ+eSoFuqV7Wzeb6hXL9HVh0lWd+FsnkSEKz/MugLY1gDWKQ+C61UM/i4gEG2ZE86rX7t9SdzbK5fq5cXwBrrkJ44x1W8nsU2tLPOB6Th78+MxBo46N+9SP5Xfr2DNGC5w7XE5HlCqFl21zvL9c/hSWHJLxv6aV+uZ3wKgfa0gzVgxgdKyrq+mC53of685ssY5/jqKwX+2GpVTHQ5rpRw7YQlhyS8MqhDeAQZJSVtSTjWCtG8qTHl+mnUx+2Sl+e9yrZCaHNFkK72OZ6V7leCisG4QFRgGZ3mWQg28VQrvNwH36RPrw2dObMw7z8TIjIXhNCu9zm+qlyfTksGIQHRE8YI8VQdtLPvTy2jOWo8ya5/9d5qe7150FENk0IbaTN9XS5/g2sF4QH1GxJ+LjXghh0zxl0vz+LH3KWH8hOCG2qENr1NtfbyPX1sNyQhPcT2cMjoQTnyQHDWOqQMXwiDv/P3B7EIONtz8fk5H7f89PJESKyJ4TQxtlcby7XN8FyQxJeOJkLTQEH0Lug4GgyiO9kxvSEW+9TMsWsFwOex6cn/PQciMgeEkKbYHO9oVz/HVYbkvC+I/sdbSPnQlOAdeZ0MIjBBuLCZWw7urfvxbAX+I3shNDuEUK73eZ6mlHbAhYbkvDgwwOiIj0jiLHDTUEMPgNLslrubWFGWVlDP+qfiOxOIbS7w7TZK20Og8WC8IDYjedJNwUx+LC/JfFBXseKiiP8qnsisYlCZveHabNN2hwOawXhAbEbTx2SRWxAXXNz36Rf1UnVvfQuKDiWSycap0L65uU18rPuicTGC5k9GqbNL9KmGawVhAfEZ1bVqtOcOQvSmjT5hf77eCruocXgwa3IgL8UQy4k8mvsd70TiY0VMpscps0GadMKlgrCA+IHTlG0PTjGVLKDGC1JKo4dN24hGXFAl0JEpOhRQmbPh2mzRtqcCBMF4QHxxUghvB0kyQpitCD5XL63tHFWljZV16jDw4XMZoRps0LatId5gvCA+OMpIR/e3Z/oIEZTkhL5Pj4verROiqZOXyJkNitMmzJpkwHTDIJdMJmBQBafwIE2gFjBQYtPhYQ+UzY1U+OAJiRF8j1fkrTWTdHU8SFCZu/atdmjVO4updauonEO0wxCNs7XgSaAeIFnWt8JGT2WgL/PAYlC+ftfJWEm6Uq0VeqsU4jMTg5fs2KR6OkMmOXBJe1bfNyQZnn9oQ0gbi9Skp0y2K6N499taJlBriE5QWMd9xM9LArT5gNpMwAmGVzOSsmCXZznERoB4omrlBnEiMeSijfP5srf/JYkXffxK7ooCtPmXWkzBOZ4YHZ3m5EiDNoAEoHJMuDWquD2kZqiAclH8rd4uXwSVHsgEMH6CBdtnCVtLtVeW5WVtYjovpLMOQP92EU5Q/67Awlg+CQG1iBGnqpZEIM/M1f+xkaSU6HWA2ivzKCNHWZIm+GY3R0oz8izu7Vez3ZtB8kQZKS42hlGsCUngbAGMSbVgOzekc/+oGyKTmuKE5Tpy7TDf6TNKBBeyXSZ3d3l1z5aCY+PWmKIpA6nq+iDGDw7nC2f+ZGkE9RYBa1ENxscuBTG6qyorkuXNpV0ZvsyAwHfBrpAeO5CNEEMXnK8Iu03q+DRNaAqmln0Y4dHpc3/aD67u9HIeu3nfoLw3IenVeQgBpPddMtg7gG1hUQD0dH2MG3ukzYTNSe8pUJ4l4DwgGSCl6kLlX0Qg+vEviTXt6jkncn1ImqLnvaFaXO3tLlTVyVxclohgY1+P2EBwnMn2Pe0TgaiNZdbLZIp8nuuw4DTAZGxR/RlN5Bvl+v3aDy7e0Zmd/f7va/VorSbpTRpdfkZwyb5sAYxRgnZGYkHtpGcCRU5wm+iM7vMzhPk+sM6KofT+9MA/1UIr4NmhGcrGDapwdXKDGLMtJDdWVCNY/wsemtuc32cXH9CR+VwgSnJgP2pDv21Eh79nM5lVKsLEiekFi/IgDSID2c+o8P3ortjbK5fJ9enakp4+UJ4I3UjPPjw3IehKriZmAfkbpJSkjSoJSqsEv3ZHbUzkrJO000xvISVwb+FRIsiRiA8d+JkkgWWmd1iC/E9AvVEhWWiNzv/1OVyfaaGs7tH3F4sHoTnb/C+sRxlBis2kYxRwYBF9SAG4AxLRWddba5fJNdn66QU8VX9KISXCcIDko2zSVbI4NsvS6yjqrX5L2X68rDZ2BkKRGen21wfKNfnaTa7GyYDv0SnfoPwUo/WQm7G8rWMpE+Y9sY+PM531wLqi4hPRF9223iy5fonOiml25IlH8jA1+oMMQgvdagty9VflbndhJezkdJDWU9icP47BDHCY77o6jyb61nK9JPqMujTOUkAJwvgpAE6GQP190QpRv81Z3fG8EjOcqJX0wEDZllmdW+SRPO2sZ7EeBgaDYs5oqeLbK5nynVtEj7S7O6fMst5HuYBJPLtwil4JpHs7bZ48era9erxlomaZtrlmYkRxLgG2rXF66KjoTbXT5PrFToogxN7coJPIbx+uhkD9bktEf71ffPyGmFoJPateqUczq6UIin3dp8yJda9T2MVghiRYCRaGCH/5w3InArqFnEHtJXrq3RQRr0TThjU9oEHcjPz8hbqaAw07h6UMfgUhkZiiI5z6M+3nNNb2LOoqGMcv+IZhSBGODwr+hmtghHZnRZXAicWMOqArNNEH29LfyfoZgiyFecHHoc0BlGHOMTb4DGSNZGESO3C6p/Nzs2t36O4OEfy4zPRbaJ2Y7hQSpxvk4MYRm1VBDEOxZPKPEmxX5mnVvZYiI9lF8nFPtdfK+k791W7Eow0Hi+TsViGYRF6dvaKk8wKpMgrqhElF0NZLtf309+ZRv8elWBDNs6MPoQnVwUPK3NvozETbinExkvbF8UlYBAfp4PnpKDtfKgLIxXWTB0NgcbgPBmv4zAswhPeC+zktBOazaWJQlsLuRlkWEZT5z5Jut0seXMjiGGCHdOlykwCeqsKbgeqDt6aMcbS1pAS+b0fzpnyymKl9GugboZA4/A4DhaS7OhcXt4MQyM84UXMpNGltPQYI68YyW8kEwwiTCL+W5lBjO6aP75TVDDyahzRO8/pREAFN3f/ZiG+LfI7Lx/BOluZpQMO080YxL3Es7uXwGxxIDyZ4b1G8k6Kqz5NVWZpQl2DGEOEpIyTKzUpSs6zQy6q9EGIWd94FSwQ5CUYNVD0S2VfWVlb/O1MeNlgtjgRXruVK+u54LatQYwPlV5BDF62TZTlK/f/VZKGcfi7nGmF/Xo/qaq5CdkXNkC+183gJft20cvxGs7uBsk4XpWAoKG+hOci8PlcI4jxoCaPi2dkb0mf9wrxxdu4+YU2VGZ9+y3kt1y+z60z6vFyn3M1HcdvyDjWujJdNITHCRJX2MifXXr7HCwxghhX+/xRsb/OyHvHKd3PTcJ3chQ3RwWjvtatLTzr421KbvKTGcGYS3QbwxllZS1lo/8eDiqC1ZwRXjhxs0/kBmXWZfVrEOMCZfrreGCnJ/n7D5NlLROddW/fd7IMPiHF+ukt97NR2Vdu8/MYvlnG6ZtgNOeENz0zEGgTSjpWVBzh8m5YgxhH+ejxVPfXvaLi46+L1ZXA9/S1hfj2yRJ4aIoIxziJc7+OY5jG7jIZw0PAaM4Jz8sFXtjvVKj8FcRIhr8uFvBePz6YP0Vm16na1MwvACP9WAfdxi9NSPrL+F3HSRPAaHoQnjHzMIIYD3i8L+1V8v11sSCVm5pHKw2Tm1pmdy/K+P0H2EwvwmNYgxjDPNqHVPvrYh6DKrmbmhfLd4zUbezSmG1Cso2PdnJKKLCZfoTHMIpO8zKrm4fuO5S/zsvHvcJtah4j12NFJwuhHq7b2OXdEzJ254PJ9CU8hpEuaY3yRhCjsTrUX+cnJGpT8yPyt57QcezSmF3CY5fG8OVgMr0Jr74ygxg8w3CzM7e6v26Aj80tnpuauS7Kj/L5TA3HbXcZtz+75PSTZ94Sz8qm40k+6xoHMdYrd29XuFCZ/jquLZuukelxIfYcVfNNzcPkM8WajtunhPBQ7wU4CCOIwbOJP7novqr762YoDX1Qgppuav5Q2o3VTWFZ+fkNiOg2S1bjjhjmgBV/Ue4KYrC/zkhB7kd/XayzctbHKhV+U3O6/J6faVPdlEREd7X47j6DyQChYAQxVqvUBjHYX7dc6eGviwWRNjUbKe21LMHYvbDwY0kDdS1MBQgFDmIUqdQGMXT218UCfkHdpMxEp1bJkWerE9of1rjx5uMmTpyfUVbWEOYB2OE4kh9koPwrid8Lf10cJzck8yy69Eum5mjwoPT7aZgDEAl9VXKDGFZ/3R4Ff108MFv0+bpl1m5IAcl1Kj6bmt2IupaXNkowAo5woxjM7ySdE/g9p6qq/rpzoPqYEaoEo9czNUeDy6R/5TAFIBo8pxIbxLhImRk82F93IlQeF4QrwejVTM3R4H3pE0owAlHBGsRYoOIXxDD8dcaA46Iy8NfFT7dOSzCG2tS8U7kzU7NTsA96r8xeUYIRqJEBGf6Qe+Pw99hfZ/iX4K+LP2pSgtHtmZqjQY7cO0owAjUG7/UyghixHMC2+uvYlwR/XfwRawnGNsrZpmY3gvclrpF7zoYpALHAqHbF+ds61eDzTJS/y98IKPjrEoEjZSkXjxKMbsnUHA0GyT2uUv4KwgApwn+UGcRoHsVy6T4Ff10yX0rxLsGYykzN0eANuS+4SYC4INogBs845iv465KFZJRgTHamZqc4WgW34rCdoQQjEDfwUsnIr3ZPmHYZyvQDsb/ubKguoUh2CcZwmZp5ppnsCOkt8v0owQjEHf3kbWoXxODTGfDXJRepLMHohk3NRnJYlGAEEoKb1KFBjOr+upcV/HXJgFtKMKZqU3N/+Z51ypt7BwGPwAhifKOCUTv461IDN5ZgjDVTczR4Uf4+SjACCUUDWbKysW1Tpg+pP1STVLi5BGOiNzU3EdvjGSVKMAIJxw0quO+LfXYblLd25fsBHZR3SjA6zdQcrf1VyuoCABL65n5Amb6affLzJVBNUuHFEozx3NRsrDBQghFIGHh/3QJV1V/3VxXbSQwgevihBGMsm5q7KzOtGEowAglBF1V1f91ZlmvPy++/UhoWjUkBhlnIwQ+IdlPzZGnzEEwhFq2XlDQhGRpJehQXn6vhADP21y1Rh/rr6svgM3wq2CKQWPi1BKOTTc0cMNssvz8NphADui1ZkiHFeyOJLhlVq++ve0kMLhROsCyzsE0gcdClBCOvKB4j+cVCfDwD/FR+zoMpxJfwXqD/Px1K6NrfNVAHJwmo7q+LhLOlLRPkUFhUQvBPpVcJxlCbmjlZ6Xrln0zNriC8ozRWBb9dvxHj4lnbWVF8doLlbYyq73FEdm5u2mnTp7/X5IwzSlVa2hkaqmCgMncGWDM1v6KCORZrw0pAeNGC/XXGZmL219Ukv9oLCkGMRNjnhWKbK1RlpY5536wlGP2SqRmElyIY/jrDeKYpe39dJPDnjCDGPIUgRlxANvm22OYEDbtvLcHYw/L7RGxqBuH5HM2VGRmL13lYfssaWTTuhnXFhp5FRa3IJneT7MooK2upoQqGii2V2Vz3YqZmVxHecF5CVJcexcWDfdbtrqqqvy47jn/7HGUGMS6DhcVkm7eLXc7UVAXzlPMSjF7J1OwqwrOTHT7q8hXK9NexMRyfgO/4X4UgRmyorKxFdreS7Y9sdKCGGoilBGO4Tc1dQXhCbPTzG/Tv9BDih+0A8fTXOcEr8j1fKgQxamKXZ4tdrh06c6aO/tAcFXsJxnCbmsfIda1neH714SXCXxcJ1iDGHIXtA9FNUYIvWrbJOzXsvrUE45lx+puRMjWD8HyCRPrrIsEaxMgBjTlDVn7+kexGIdlHcryGKhgsNvO1in/KeH4Rj1DBBKoHMzUfOWjQm6Tr8ax7EJ53kQx/XSRYgxiXgs4cze7Giz3O1VQFs1RySjAamZrXdn733QLR+U4OEvUsLh7gy32PPiW8NFXVX8fO2ropvB+jytRWhSCGE8IrFZ+yjvkGU1GCsU73/Pw/8AuGZK+FD77mSHlmINAGhOdecB+MzBpcV2CMC+6J35SvHrinWrWWtcvJaQxasyW73mKLG0l03ECb0hKMTG6k94kkqyy8sI944gPJnOTtZxIt4dFU96QexcWv9s3Lc2OEh/11q8VgvifJctG9NUhr1GhR59mzF5P+5tByAUGM0IQ3VWZ392uqAqMEY2r3vpJ98rKWnsM0eh7bLRyxgeQ++n2NNjVzxD07N7e+A0lzBeFRm4XclgZtPufSc5GhDFemv+4z5cKK7PyyIJ1tkgF9F+itKjpWVBxButkqtniqhio4U5nnY12zFafr0qVNyV7HGK4Gi5TI7w+Pgm/ucpKOjvglJyGd4SM7nPqJJSs/P+K+NI6a8dpebmxJr8LC5il+Hm7z10UivQHiJ9lPDxVBjKq2dZ28DD7RVAXTlMuPJdKz6U52O4We028WgtrMv+tZVNTVwecNwttF8n0Y+at7Bm1R0XHGLniSpSn0/Vn9dZwy53qPDOyJorutmYEAMtiaelksb/eRGnbfUyUYexcUNKbndJX49g6Z9dm5vCyEt9BTT0cOdlfIzS8jSfYSkvP+W/11p3tGeZWVtdgPaqQ9cplrICUgfXQSfWyJZonkI3i2BCO/tNmvR/KT9Tjqwe0tfiA8Yfmj6cY/lw4sT2L4+kpl+us47XVrr+mO3QfsEpAl3Gzdgxikh0dFF49rqgKjBKNns2azTdPzG8EuCXbZWMjvc3qhjfM84THEB1gmnfiyS2npMQn8Ok/56yKh69KlJ1reindqOtA5WFHX0AMNjEwNVeC7Eoxk2ydz4IHPQot9v+MLwmN0Li9vRh0pko6s7lVYmJ6Ar2F/3UfK9Ndd5wfDsAYxNN1oy8vZK4TsijXlfN+WYOR9e2TXf+xZVNTHN4QnjN6UOmEcT1nDWzDi6SZQ5mFqb/nrnBnFrToHMYjoPpT+j1X6QasSjA63pUz3ysBtwvvzuhUUrKufnl6k4pNxlf11RjZXT/rrIiKY++01HYMYvBqQJAHb+aWpG9sd1rDhSKVRCUYL4e2VPZehZKpnOsTh6gbp6bOVuYHylBr+KV/56yJBNt2WizG8rUsQg/r6F+mzLiUYq89uP814//3iZuefP0wzwlvop341VKa/bSNJpyg/70t/nQO3gDWIcYcug56W8V1opneK0gxEdu0lmrmVX3ggPG+D91IZRa258lJnpzpRpr9unfKZv87BIDhXpvt8YPsCHyzXa/O5yEiiYwlGesYPyeCfrEuf/Ux4DA6xzxHy+kVVLTUXCpyY0Oqva6XjMoeM4TYjiEEG0sHjfZnr8OzkYJ2esWzF+YH7TjPcHrr02++Ex2C/29tCYhyN6hWijVb+OgezIt8EMSyEt01SPoUUGvTnaPZSGyp6KdOp3zoQnkF6RhbXLdWWqS1IPlamv260AowgxueWIEYtjw5sg/AewlOtopd5MrMdp1O/dSE8Bqe7eVmZ5QuzVdBf960y/XW9MRRMSBDjZxkYfwPh+QOSfIP9tNt50z4Iz7/gpesMZVZM2i0/f6qCqa2BavB6EAOEF1Ind8u54Wka2vNoOaCgTaCGAxnlQnacCofLxNXBMAj7VrxdSGMT73ME4XkYlZW1SRffsk5opncmFOJvcNQ1T2Z1e+XfCqVjQeDoBkktIr3njEgmO7x5aRBJ3JA1GIR3yAxnsFEgR8etOFpNVFRVf102yefyf47i4uE7HzSznGz1cEMyAgvh7ZcjZKHkRg2f3URYsn/B5wWN/XWLlLm/7kQVTInDv/871BTdoOFjSXI0K6TEOYFDrIS3R4rBHCJEzDfo8Nwkf+Ru0UVrWLL/EGp/XXV/3bmyvN1HcgFUFhXhPeH2e8WStspzu0V08Sas2H/g/XW5ytxfd22Ytrcrs1B1B6gOhOdHSCkE7U6VaPFslemv44wpvSK0Z//da9J+BQkKVYPwfIXMQKC/6OE7rs0KK/YPrlKmv443FzrdX8fZIhDEAOH5ElLQmvVwNyzYH3Dir4sETg1vBDH+BpVGJLx8KfkYSlxxagWEF0yMK2eJOVLdFhbsfVj9dXyC4toY/pY1iDEEqrUnvAgy0SWDXXvC4yi06GA+rNcHLzAVnb/OCf4mf+9XhSBGOMJbzGdsQ0lmIJAFwnPNDC8gOhgK6/U2rpIZXbT+ukhg/91M+bvLFYIYdktaL/jwuN5sCcl4TWd33YXsfm63cmU9WK83wemepqjY/HWRYA1ivKUQxPAk4Wm//CkpmYygjbfRhiRfmf66UQn8rpOVWcLuNqgehOclZOXnN6DntFmyGp8GjXgPXEx3vTL9dT2T8J3nKQQxQHjenN0dLz7MhdCGx9Ds/PO53sQuITvOUNwiiV9/hzLrYrTT/VmA8DxHfEh/5hWwo5Ue2DPdCgp2pzVpUqoS46+LBAQxQHhuJLJTuy1ZMsqBnA5teQCZgUAb2dxaeaAy/AcfDE/h7XAQ4wuFIAYIzz3PYZzDimx4Tm5Hz6KiPvSw1hvn/+j/PV1wW1ysmYsAVdZu0OAWjQdaL5o1/JEkA5bqCsLjuiMPhpE/QFsuBg2kMfSQdhk51ziPl4tub2DDTp1WdFu8eDWyTgAuIbxl0IYHIf66qZap+BQ3Oly7FxTcIff4C84mAiA8IGqwv46PKskD3EGzvGtce7PBQtWvG8bmtcI2AAgPSO2D62vx1611ib8uLKRQ9RcHM8iiIAoAwgMiobq/LqOsrKVX7r1XYeEpxk52FEUBUkh460iG28hZ0JQL4BV/nQPCvtCofkV9GIQnC6SA8MIJUkKlGl1KS4+x+utIrvb4LPUuI4hBP7fDEwaSTHibecIQSnQqQenWh8T+ug2Gvy4zEOjh+U5VDWKU07K8IZ40kETCgw/PpTOhg/46+vkTL/nrIqFvXl4j6lcFghgACE9ziL/uWa/76yJBghhbpI+34MkDIDxvz9Cu4UhqJLH65MRfV2D46+j6VT7XEYIYAAjPJwrOcXJYmZ343J5+7uc7f110esJJDACE54OBXEI/d7ITIrYWncvLm1G7X6X9AlruNddGUZWVtYj035C+lyGIAYDwvE14Cx22H0nygI6Vzq1BDE6nhCAGAMLzOeFBX8XtjSAGzfhuhkaAeILTc3E1Nvp3BLQBwnOLzi5CEAMAQHg66m0TghgA4L2By9HH+TaCQ/TVgSAGAHia8MLJdGjqUJBempCsEB1NhkYAwDuEtzQzEMgKJTg8bw/STQfSXS7XC+1YUVGXHc4OZCw0BwCpJTz48OIz46t0IL9CWwAAwvMT4U0muSOUYDsLAIDwfEV4RGrdoREAAOGB8AAAAOGB8AAAAOGB8AAAAOG5l/BI7uXtJ6EkOze3PrQFACmAZC5ugpMCcSc8W/FTGnwAAEB4vKSdRv8+GErwcgEAwG+EBx8eAAAgPAAAABAeAAAACA8AAACEBwAAAMIDAAAA4QEAAMSJ8OoQ0Y1i0apmLwB4BP8PDzq6Pc+JY24AAAAldEVYdGRhdGU6Y3JlYXRlADIwMjMtMTItMjRUMTc6NDc6NDMrMDA6MDAj4bH3AAAAJXRFWHRkYXRlOm1vZGlmeQAyMDIzLTEyLTI0VDE3OjQ3OjQzKzAwOjAwUrwJSwAAAdl6VFh0TU9MIHJka2l0IDIwMjMuMDkuMwAAOI19VFtuGzEM/N9T6AIW+Bb1GdtJURSxgdbtHfLf+6PkLhwpgNBdayFSI4rkjLyVfH5ef3z8LZ8PXbetFPjPr/de/jAAbO8lJ+X8+u37rVweL+en53L/fXv8KtgLeuyJ9yv25XF/f3qwvJUTVwYxx3KiCsrosaXC/oy9VC65jkyugcSKaK37AskZM9a7RdDcQ+5GK6QkkmozzbJOUKU3AV4gNU+H2g2BIGeRpKAukJYxw01i3DIPViJZIVvEhEoIjhiTptptlaWXe3jRnMRLVKPKJgtcj3hYDaKcloGhM63ORYgUo5MqDLjvMGy4AiY7WGMZUPaWeotiVshkh8MtCpLlMzcOASyQyY5UAeSkEao7d1u1HGVPU7S5QZ7eWNBshdRAclVFjA5Fwtp1yTda0ojVnzT3jhFzhWyHNDwKcctuGZO0FdIPpClqT4CShUxWyH5Iw8VFKWKCsekqz9fb9cstOe7N+X67jnuTL43LEUbhcQPSlCHzNHVoGWPYEGyabaiSYvgQH4bZh8Ywx6yl3YGTZnYHTdLA/cOTBA6PTFQfHp0ozazQJupw/7SJosPjExWHp8+NnNuW9vOvKubbPxI47n1NTJJsAAAAHXRFWHRyZGtpdFBLTCByZGtpdCAyMDIzLjA5LjMA776t3gB/YpoAAAD1elRYdFNNSUxFUyByZGtpdCAyMDIzLjA5LjMAABiVVVBLagUxDLtKl/MgY/yPQ+jqQbe90Dt85TCbQiCKLMtyfr/f1/v6eeE81wP+vwC+PheTZKnXUNIIy7GZVLhEBtOMWFljCyXPTDDKyzTGVpJwG11Ima3AzTJuIakZOrYRs8e4mcymyRrbyVnsUFW20trGY1Z22zRvI6MIkYAzxwpIoF6w1m6TYketOVZPm2eghXakG5lMK04G6di3kbEDocRh0hRqK302pVWdAah3g6ev6WxHVIBYdy1xyaMprLHwS5L2TMuQ/pLQRMATqrwcu2NaGixfnz8vyU6pw00k4wAAAABJRU5ErkJggg==) 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모습 |
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퍼플루오로(2-메틸-3-펜타논)은 표면 장력이 낮고 밀도가 높은 무색, 무취의 액체입니다. |
관련 화합물
힐 시스템의 공식은 C6F12O
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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 |