몰 질량 of Pb9CuP6O25 (LK-99) is 2514.1736 g/mol
Pb9CuP6O25 중량과 몰 사이의 변환
다음 물질의 원소 조성 Pb9CuP6O25
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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납 | Pb | 207.2 | 9 | 74.1715 | 구리 | Cu | 63.546 | 1 | 2.5275 | 인 | P | 30.973762 | 6 | 7.3918 | 산소 | O | 15.9994 | 25 | 15.9092 |
몰질량을 단계별로 계산하기 |
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먼저 Pb9CuP6O25에 있는 각 원자의 수를 계산합니다.
Pb: 9, Cu: 1, P: 6, O: 25
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
Pb: 207.2, Cu: 63.546, P: 30.973762, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (Pb9CuP6O25) = ∑ Counti * Weighti =
Count(Pb) * Weight(Pb) + Count(Cu) * Weight(Cu) + Count(P) * Weight(P) + Count(O) * Weight(O) =
9 * 207.2 + 1 * 63.546 + 6 * 30.973762 + 25 * 15.9994 =
2514.1736 g/mol
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화학 구조 |
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![Pb9CuP6O25 - 화학 구조](data:images/png;base64,iVBORw0KGgoAAAANSUhEUgAAATwAAAEwCAYAAAAqx819AAAABGdBTUEAALGPC/xhBQAAACBjSFJNAAB6JgAAgIQAAPoAAACA6AAAdTAAAOpgAAA6mAAAF3CculE8AAAAB3RJTUUH5wwYEhgnr3tJxwAAAAZiS0dEAP8A/wD/oL2nkwAAJxlJREFUGBntwQm8J/S8P/7nObMvbVPNtEiZFi3qqKSFSgspFWKQJVxpLJEsLVp8zplkKJmJ33XHmshl3GuLRO4tF7mlkRK5lMiUwkWkkprX//t4fOfx6PxnzG2bczrn9H4+jUC9SillDJmKSVZ2LM7AFzFLKaWMIhtiPubjzdhK1wLMtbKpul6Lg3W9CFsopZQRrg+/wBy8Fr/BNliAuf6x8ViMGXgBvoz3Y0+llDKC9WGJ+3wYr8cC9ONdGMAsXdOxANu7z1xsp+vpeI5SShmB+nAV1sHW+CmehgX4IXbHUbgG47AQn8B87KFrc6ypaxPMVkopI1Af/oor8BUcoWsBXuc+12Br929PHKCUUkagPiyxsgWY6z5XY2v3bwtsp5RSRqA+LLGyBXidrgNwLcYrpZRRbEt8ysoOxAX4Lj6DLZRSSimllFJKKaWUUkoppZRSSimllFJKKaWUUsoDNAdn4CNYQymljCJrYw7m4ECsqesUHG5lW+l6PQ7WdQA2UUopI1wfluJ4nI1fYWMswFyrdg4eg6fiw3grtlVKKSNYH5a4zzl4LRbgTXg5XohJunrxdhyka0OcggMxAztiD6WUMgL1YYmuKfgenoMFuA6vwlm4SNe5+CbmYw9dO2N9XTtiD6WUMgL14a+4Aj/CfPRgAY5xn+sx2/3bFjsppZQRqA9LrGwB5rrPEmzv/u2GfZVSygjUhyVWtgBzdW2DGzFZKaWMYk/AJVb2Cvw3voP/xl5KKaWUUkoppZRSSimllFJKKaWUUkoppZRSSinlAdoV78EAxiullFFkCnbGztgUPbpeh2dZ2f4Yh7fgQF1PxkyllDLC9eF3WIRv4jKsiQWYa9UWYGtsigE8FzOVUsoI1ocl7vNveBUW4DV4Enbw//diHK3ryfhnHI2tsAlmK6WUEagPS9znArwMC/BznIkL8C+6BnAhjsJ2uvbHY3Q9Hc9RSikjUB/+jIvwI3wJk7AAJ+oaj5uwER6D2ZiNNa1sJjZSSikjUB+uwWxMcZ8FmOs+l+OJ7t+z8CKllDIC9WGJlS3AXF3r4RasoZRSRrE+LLGyE7AEH8M1eKlSShnlJmJj/9haeDwmKaWUUkoppZRSSimllFJKKaWUUkoppZRSyurwWByHVyillDHiEOxqZS/D+jgde+vaCmsppZQRrg9/xRX4H3wCE7AAc63aO7ALevFa7IAepZQygvVhia5e/CcOxwLMxRqY7P9vd5yh63n4At6Hp2A61lJKKSNQH5a4z7/i1ViAJfgqfoS36Ho5PoOdMVPXHGyu6wU4UimljEB9uAXz8Tn8CDOwAPN1TcetWBdPxxzMwRZWNglTlFLKCNSHn2F/7IgJuhZgrvtchh3dvxfjtUopZQTqwxIrW4C5uqbgVqyrlFJGsT4ssbL34mt4Gy7BqUopZZSbjl2trBc74bnYWimllFJKKaWUUkoppZRSSimllFJKKaWUUlaHqTgUuyqllDFiD2xjZW/C03AOdtK1PiYrpZQRbhv8DFfgcpygawHmWrW3YB9dc7GdUkoZ4fqwRNc6+AGehQWY6x97HD6BXrwAX8b7sadSShnB+rDEfT6K12EBLsDFWILDdO2Fj2EDTNJ1FLbV9Uq8WSmljEB9+BWOQsNSbIoF+Dh6sDFuwRp4JY7H8dhZKaWMIn34FY7CSzBT1wLMdZ/LsaP793K8USmljEB9WGJlCzBX1zgsxUbuXy/GK6WUEagPS6xsAT6GZ+Fj+KRSShnl1sVhVjYTR+BEPBu9SimllFJKKaWUUkoppZRSSimllFJKKaWUUkoppZRSRo0wKSwMV4drwqVhP6WUMtaE/vDZMElHeHK4JcwKTwxnhjPDekopZTQLt4TNDBIWhWOVUspYEaaGu0OPQcJbwvuVUspYEXrCHWG6QcJAaEopZSwJ3wiHWy70hh+GfZVSylgS+sLSMC8cFb4R/lUppYxFYWZ4YXhD2Cv0hMlKKWWsC68Kt4YnK6WUsSycHhK+F3oMo7BxeH14T3h1WEcppQyVMD3cFBJeapiEx4Vfh+PDQWF+uC6sFdYJR4Yjw6ZKKWV1CS8PCUvDdMMgfCy8xSDhn8MpYWJ4fHh8mK6UUlaX0BMuCwnzDIPwo/BEg4TDwpeUUspQCruFZeHO8DhDLPw8bGuQ8KzwDaWUMtTCJ8Pt2d37DJEwW0f4SnihQcKJ4WyllDLUsq6Nc6xfpEmap1mNwoZhUbgn7Bn2C9eGx+sIu4alYSullDIc0pycJmmuSTPewxQmhePDn0PCXeE1OsILwzfD1eGCsK9SShkuaSanuSFN0m+uhyEcEq4LCQnnh82VUspIkX5z0iTN/6aZ4UEKW4cLQkLCT8OBSillJEpzcZqkOcsDlHdZJ83C7O7ikPCHcEwYr5RSRqoM6EtzT5q/Z8B2/g9pxqc5Os3/pklOdVemmR9mKKWU0SDNgjQDOcM0q5Bm3zRXp0mapPmPDNheKaWMNjnNpmkWp1mcZlH6HaAjzRZpFqdJmqT5efrNUUopo1UG9KW5Js3s9NsvzS8zYO80v0+TNH9Oc1zONkkppYxmGdCXZonl0nwozdHpd3yaj6XZQCmljFZptk2/Y3VkQF+aazNg5zSHpvl1BuyolFJGs7zLOmnmp/lbmmUZsGsG9KX5XZpFad6bZg+llDJapelNc0SaW9Mkzb1pzk0zMwP60ixRSimjXfrtk+aqNEmTNP+ZZgcdacan37PTLFFKKaNV2Dwn+VSapEma69PvuZZLs2+aq/MOv0nTr5RSRpswLbRwZw50SZrb07Q0k3Wk2SLNF9MkTdJclwHbWS5Nb5oj0lyeZqpSShlpQm94Rbg5JNybCT6aZiMdOcO0NC3NnWmS5vY0Lc1kg6TpTXNFmqTfKUopZSQJu4RLQ0LC5WEPHaE3/V6Z5jdpkubeNB9Ls4FVyICnpFmW5o40j1VKKY+0sEE4LywLCUvDS0KPjrBLuDTHuixN0lyeAbt7ANJ8Lk3SfFIppTzSwsbh9nBHmB/W0BE2CZ8Oy0Kyge+leXHo8QDlNJuk+WuaZWmeqpRShkvYMLw/fDd8I7wtjAuHhU11hCnh+PDnkHBHmB/W8BCkmZcmaZak6VVKKUMtjAtXhWPDmmGT8JXwTsuFQ8INISHh/PA4D0POMC3N0pzi7uzvBUopZaiFg8J/GSTMCn8OE8IBISHhB2FPq0leZk7GuT7cHNZQSilDKbw5vN8Kwq/CFjrC58KRoddqFHrCt0PC6UopZSiF14UPWUG4NWxsiIWdw73hb2FLpZQyVMJu4Seh13Jh27A09BgG4ZyQ8HmllDKUwufDJ8Pe4ZBwTTjCMAmzwm0h4RlKKWWohInh5eH/hflhb8MsvD0k/DiMV0opY1WYHK4P/x7WUUopY1lYW0fYJDw/zAmbKqWUsSi8OPwytPCOcEN4hY4wO+wedlJKKaNZmB5uDptbLjwu3BrWDjuGw8KBSillNAu7h8usIHw7PE0ppYwV4VnhIisI54fDlFLKWBG2DdeHHoOEa8MTlVLKWBF6wqXhSMuFl4fvhx6llDKWhNnhm+Gq8MPwn2FLpZQyVoXxYbxSSimllFJKKaWUUkoppZRSSimllFJKKaWUUsroEnrCZmGnMF0ppYxFYcPwg3BR+ET4RThOR5gQ1gprhV6llDKahU+GkywX1gm/Cn1h23ByODnMUEopo1m4LcwwSHh3OEkppYwVYVq42wrCseEDSillLAl/DOsbJLw3nKCUUsaS8JEwYLmwXvh12FoppYwlYWb4XvhW+FT4RXiDUkoZq8JGYYcwWUfYKfQopZSxLCwMy8LhSillLAuvCgm/DtMMo3Bg+Fz4Xjgv7KaUUoZK6A2Xh4RmmIQ9w/Vh9zA1HBhuDpuHDcIZ4YywnVJKWV3C7mFZuCNsZhiEL4cXGyScEhYqpZShFD4dEj5jGISfhW0NEp4VvqGUUoZSeEy4PSTsZYiFH4UnGiQcFr6klFKGWnhHJvpJXuLzaXqtZmFCOCL0hE+EYwwSFoZ3KKWUoZadTc2pfpkmaY60GoX9wzUh4YiwVVgajgq7huPCDWEdpZQyHNK8KE3S3Jr51vIwha3DBSEh4adhPx1hy3Bq+Gg4LmyglFKGU5pvpUmaMzxEYe0wP9wVEv4Yjg+TlFLKSJEBO6a5N83f0mzlQchi47KuV4TfhoR7wqKwvlJKGYnSfCRN0nzZA5QBe6f5YV7oByHhkvBEpZQykuWdZqW5LU3S7OT/kGazNJ9LkzRJc0M2cahSShkt0u9lafa3Cmmmpmlp7kyTNH9N03KWKUopZbRJ84Q0v0tzfZqr0rwz9KbfnDS/TJM0y9Iszmk2VUopo1UG9KVZoiNnmJbm8vSbk+aGNElzRZqnKqWU0S4D+tIssVyac9LvtWkOTr+Xp+lVSimjUZreNEek+ULoyYC+NEvT7/g0703zq5xmY6WUMpql2SvND9IkTdLvwAzoS/OrNEel37PTrK2UUkarNI9Jc26aZWmS5tdpjgg9GdCXZolSShnN0kxNv+PT/CVN0vw1zfw003Wk2SzNW9MsUUopo1HoCS/OiS5NkzTL0nw6zWN0pJmapqW5I82d6TfXCtLMVEopI1nYKXw7JE+wJM2SNE/VEXrSvDTN0jRJsyzNp9JsYLksMiHNuWluS7ORUkoZacIG4WPh3pDwm/DK0KMjA3ZO8500SZM0V6R5qn8gzefTJM05SillpAgTwjHhtpBwd1gY1tQRNsw7fDTNvWmS5uY0r0jTaxXSzE5zZ5plGbCrUkp5pIVtw3UhIeGLYQsdYUI4JtyWI1yS5u40C9Os6QFIc3qapPle6FFKKcMtTA69OsKU8Mvw03CQ5cJzw/UhIZnuvMyzuQchzfQ0N6VJmpcqpZThEvYOPwiXhx+H88PMsFUYryNsHb4WEhKuDQd6iNK8Ik3SLE0zXSmlDLWwZlgadrNceGf4rI4wIywMfw8JfwjHhPEehjS9aS7P0W7Mpt6qlFKGWnhR+IJBwuRwR5gadgz3hr+HRWF9q0n29ORwR7gjbKaUUoZSOC68zwrC9WFrHeGYsK0hED4VEhYrpZShFF4ZPmEF4U9hhiEWNg63h4SnKaWUoRI2DzeHNS0XDgpLDJNwSkj4YRinlFKGSjgp/DicHN4blobdDJMwOdwQEo5SSilDKWwRXhgODOsYZmFOSPhtWFsppYxl4QvhjWGCUkoZ60JPeGE4O3wgHB56lVLKWBPeHS4K+4Z9wtfDQh3hgHBCeL1SShnNwqzw27Cm5cIa4dbwmDAtrBvWVkopo1nYN3zLCsI3w4FKKWWsCE8PF1tBuDAcrJRSxoqwSbglTLJcmBhuCrOVUspYEs4NHwkbhFnhX8JnlFLKWBOmhFPDN8M3QwtTlVJKKaWUUkoppZRSSimllFJKKaWUUkoppZRSSimljChho/CycGx4euhVSiljTXhSuCmcEl4Zvhq+pCNsFA4Nh4ZpSillNAuXhOdZLvSE74eDwnphz7BnmKKUUkar0BvuDFMMElqYp5RSxoowJdwdeg0S3hoWKqWUsSQsDVsaJHw0vEEppYwl4e3hi2GKjrBHuDnMUEopY0mYEN4Vrg7XhEvCHkop5dEgTA5vClOUUspYFr4QEk7xCAmTlVLKUAtPCcvCHeGxhknoDaeH/wlXhGvDMUopZSiFxSHhU4ZJeHm4JEzXEWaFn4anhQ3CGeGMsJ1SSlldwibhr2FZ2NMwCJeEAwwSXhs+rpRShlIYCAlLQq8hFm4IjzdIOCBcrJRShlKYFpaGZJyXG2Lh8rCbQcLh4bNKKWWoZZwX53EuyXH+J++2htUsbB4+EqaF+eEsg4QvhlcrpZShFnrSfDtN0rzLahLWCPPDXSHhHWGdcHU4L7w1fDX8RxivlFKGQ5qd0tyb5m+ZZ0sPQ+gJR4TfhIRlYXHYREeYEPYOR4TdQo9SShlOaT6eJmm+4CEKu4RLQ0LC5WF3pZQykuSdZqW5LU3SPMODkNNskg29LywLCb8OLw49SillJEpzQpqk+XGa8e5HzjIl/Y5P8+e83i/DH8P8sIZSShnJcrZJaa5P88cM6LMKoSf9XpjmV2mSJmk+m0M8VimljBZpdsppNk4zO83sNBsYJAN2TPOtNEmTND9Is5dSShmNMqAvzR/SLE7znTTfzunWT/PhNPemSZpb0+/VaXqVUspolQF9aZZYLs0X0u+Vab6V5u40CzPfWkopZbRKs6aODOhLs8Ryab6c5ojMs02arZRSymiVZqM0i9L8Ms3UDOhL84c0i9N8P803cpYpSilltMpZpqQ5Oc3taZLmzvTbJwP60lyTZnaatZVSymiWfoek+UWapEma8zPP43RkQF+aJUopZTTLPNukuTBN0iTNT9LvAMuleUH6nZNmiVJKGY3C+mFR3ur7aZLmt+k3N4uN05EBO6b5VpqkWZZ+BxokzcT0O1AppYxUYUI4NvwxJBv6aZqz0qytI6dbN83CNPekSZrfp98xWWyc5bLIhDTXpLk3A3ZWSikjTdg/XBMSEi4K2+nIIhPS75g0f0qTNHenWZj51vIPpHl3mqS5NPQopZSRIGwZzg8JCT8LcywXDs4pLk+TNEnzlTRb+T/k3dZIc3OapN/hSinlkRZ2DneHhD+GN4cJOsJW4SsheYZvpfmfNAd7gNLvVWmS5tc5wzSllDKcwszw9LBrmBp6wn+Fc8MsHWGdsCDcHRL+mAmOySITPAhpetNcniZpmlJKGS7hmHBdWBg+Hm4MO4UJOkJvOCLcGhLuDeeGmR6iDNg9zbI0d+Q0myqllKEWNgu/CetZLjwvXK4jbB+uCgkJF4c+q0GaT+cZvpupFimllKEWXhnONUjoCbeFGWFWuC3cGI4IPVaTrOOx4a9hWXiqUkoZSuG48D4rCNeHrXWEp4TJhkBoIeEHYZxSShkq4fDw7wYJE8Nfw1RDLEwJvwwJr/IQhQPD98NV4SfhX8JkY1x4W/hRuDr8KBxjjAvTwkfDT8JV4bKwv1LuT1gn3By2t1w4PvybYRJeFBJuDWt5kMLG4eawvY4wMXwmnKYjnBzODHOMIeHZYUlYV0eYFX4cnhFmhDPDmWEnY0h4b/hoGK8j7BJ+E2aGJ4Uzw5lhbaWsKBwY/id8I1wevhU2MozCt0LCezxI4a3hAwYJjwu/MYaFL4c5BgmvCIuNYeG2MNMg4WPh9Up5oMKsMN0jIOwc7g13hvU8COED4c0GCT3h7jDFGBWuDjsbJDwlXG6MCjPCX6wgvD2coZTRIrw57ORBCv2h3yBhjXB76DFGhYvDfgYJB4cLjFFhfLgrTDRIOCOcoJTRJKwT/jl8P1wRFoX1/B/CPuGHoddy4ZXhK8aw0MIHDBI+Ht5mDAsXhxdYLowP/xN2VcpoEs4P7wqTwqTwzvANHeF54cxwihWEc8Ml4Y3hjHBj2NYYFtYMV4dzwhvCeeGKMNUYFnYMS8P88Kbw3fBBpYwmYYvw6zDOcmFcuCFs536EXcOrw7PD2jrCdGNYmBieHl4T9gvjw6QwwRgWZoTDwpFhZx1hulJGi3Bg+KYVhK+G53gQwubh4vAFjyJh/3BdeJNHkXBM+GPYWSmjQdgzXGoF4ZKwnwchzAq3hYRnGEZhXHhBeE+YF/YxTMLBIeGPYX3DKKwVXhMWhhPC1oZJeE9IuDT0GEZh83BcWBiODusq5f6EdcJvw0zLhXXDb8P6HqRwYkj4cRhvmISPhy+FZ4bnh6vD63SEQ8LR4XmGSLggJHzQMAmTwzXhPWG/MDcsDU/SEeaGo8PuhkBYI9wcEg43TMI2YWk4OuwbTgvXhTXCzHB0ODo8VikrCseFK8ILwpxwWTjJQxAmhp+FhNcbBuEJ4YYwwXLhceG3YVKYGTYNGxgiYetwd7g37GwYhNeFfzVIeGn4mo6wSdg0rG2IhFeFhF+HaYZB+Gx4jUHCh8IJYWLYNGwaJivlHwl7h1PCqWEfD0N4bkj4Q1jXEAtHhPOsIPw8bGOYhPeFhG+HHkMsfDQcZZCwcbjVMAm94fKQ0AyDcF14vEHCi8NipTwSwtdDwtmGWDgynGMF4cfhiYZJWDv8NiQ83xALnwz/ZJCwXviTYRR2D8vCHWEzQyzcGDY3SHhe+JJSHglh+/D3rOm/c4rtDIGwZtgo7BmuNEhYK/wpTDeMwmvC3dna59NMNgTC7DAxnBQWGCQ8PXzPMAv/mh5/yN7ea4iErXWEb4TDDBJOC/OV8kjJC52WJmm+bjUKveGIcEs4P/SE74Xjw5QwI3w6LDTMwrgc6Wtpkn4nWY3CtNDCneFtYWa4KRwUxoetwg/D8wyzbG6THOemNMsyYE+rUXhMODcsC08NzwjXhieEcWG/cFPYRCmPlDQz0vw+TdIcajUITw1LQkLCt8P0MDP8v3B5+E54R5joEZB++6RJmr+meayHKfSGV4SbQ8Ky8H4dYcfwmfDD8PXwEo+QNC1N0vwgi43zMIVp4bRwZ0i4PbxMR3h+uCBcFT4XdlPKIy3NG9MkzXU52yQPUdg4nBuWhYSl4YjQYwRK829pkuZcD0PYJXw3JCRcHvYwAuUsU9L8Mk3SHOkhCj1hTvhlSFgWFodNlTKSpRmf5uo0Sb+3eZDC1NDCX0PCX8M7wlQjWOZ5XJo70yxL81QPUtg4fCosCwlLw0tDjxEszYvSJM2tmW8tD1J4cvheSEi4LOymlNEi/fZLkzR/zjtt6AFKv0Pydtem100h4fywmVEizTvTJM0VaXo9AGkmpt8x+SdLwj3hb2FhWMMokeZbaZLmPR6gvNOGaRZlVxeHhJvDUaFXKaNNmi+nSZqPuB8ZsHOa76RJmuSZPh2eapRJMz3NTWmSfi9zP9JvTpob0iRNsqX3hc2MMhmwc5p70/wtzRb+D2kmp9+Jaf6SJjnVXzLVqWG6Uh6O8ISwKJwTDjSMMs+WaS5Ms4NVyOnWTbMwzT1pkub36XdMFhtnlErz0jQfSjPTKqR5YppL0iRN0vwk/Q4wiqV5X5rjcrZJViH9DklzfZqkSZrzM8/mxq6p+Ge8D2/30M3HGfiAh+7NeDc+iSkemhfgffg0NvFICD3hiPCJ8O/hpLCmjjA9TA7rh094BKQ5Oc3iNJ9NMy/NjCwyIf2OSfOnNElzd5qFmW8tY0Sa89IsTnNe+r0+i41LMyPNwjT3pEma/02/Y7LYOGNA5tkyzeI0i9Ock+YgHWm2TvO1NEmTNNemeabhNw5z8Wl8Bq9Ej1WbizNwDqbqOgDH4014Fnp1/cbKxmE9XRe4z3txPN6COZii61vY0spm6foM1tR1Go7HcXgp1tX1IRxsZbN0vQO76noNGo7HK7CZrrfgzVY2S9ccvFLX3tjRcAknhEvCLmGrsCBcYpDwT+Gl4QnhjHBG2MAwSPP1NC9Ns1Wa96b5Ypr+NEmTNF/OPFsaY9LclWarDNg+zTfT79g0F6dJmrvTnJVmbWNIBuyaZkma2RmwZ5pf5TR7pbktTdL8Ps3r0oz3yHg3LsGu2AnnYrZV20TXCdhL19fxOczFF/Fvuu60alvgQ5iKN+Dn+Clej3/BDzEBV2Jr/9g6+LyuV+Nq/AbH4TQsxUych8P8Y+PxeUzH8/BN3IGGE3AzdsTJOMmqfQhbYB98BAuxl6EWJoQ/hI0sF3rClWFvHWFOeLNHSJqvp99+OjLPlmluTDMjzbfTPMMYleauLDJBR5oj03wyzV5pvpp5Hm8MyoBd03zXcmnOTXNkmhPSLMy7rOORMx1/wYZWdiKeoGtTnO4+vfgc1sEzcR3+HU/AZPwdE3EnnoJTcKD7bIv3Yxp6sDa+g/+HHl0/xxNwJZ6Lt+PF6NU1C/+MDXWtia/gmxin68t4Ac7D63E85mKKrql4H3bQNR0LcRMm6no3Gk7G6TgGx2I9XeNwMp6pawpeioMxBX04zFAJW4QbrCAsCkeHQ8KlYX6YaxjkLFPS75TMs7mONF9P85o0e6X5VJqPG4PSbJTmPVlkgo40d2XArmmemeaKNK8wBqV5Uvq9TUcG7JrmqjRPSvPiNDen2drIsAN+7h/7KvbVtQMu0zUR87Gbrhm4HKdjGg7BDbr+hn/GAfg2/gmb4Rf4KBZhnK6FOEvX9vg9ZuBKnI9n4F9xBibjGnwGi7CxrmNxoa6N8As8CedhCQ7Ce/BVXV/FBViEXXQdiBt1rYlL8DKcjBvxfLwB12IizsJ3sAiH6pqNjXU9FrsYKmF2uNEKwofCaw2z9DskzS/SJM0XdKT5epqvpHl/+r06Z5tkDEkzMf2OSXNbmqR5k440d6X5cJoz0+8QY0ya9dIsTHNPmnszYJcM2DXNLWkWpTktzRONHNvjF/6xr2JfXTvgMl2fxb9jPnbS9W+4EVfiK9hJ112YoOtp+KZVeyNuwZX4Txyo60psr2sWbrJq++M2/ACX4khd5+GFunrxO6ztH9sYf8MV+D4aenEymvt8G3u4f9vgmYZKGB/+N2xiudATrg5PMUwyYMc030qTNEnzgzR76Ujz9fTbzxiUfoekuT5N0iTN+Wlm60hzVxaZYIzJIhPS75g0t6VJmrvTLEyzZgbsmua7Rqap+DMeY2Vfxb66dsBlVu2DeLWV3ek+u+G/rNobcZaVXYmtda2F31m1/XGhlZ2Hw9xnKWb6xzbGr6zsZJzkPt/A09y/LbC3oRTeGv4r7BK2DAvDNwyDnG7dNAvT3JMmaX6ffsdksXE6MqAv/b6RfvsZQzLPNmkuTJM0SXNtmmdaLs1Oae7KIhOMIel3SJrr0iRN0lyUebbRkbNNSr/D03zXyHUavoM9sDXmYhL+BSfhMfgALrNqH8SrrexOXT34EE61am/EWVZ2JbbW9WZ8xqrtjwut7DwcputAXGXVNsavrOxknKRra/waaxkpwkvCJ8K/h+PDdEMoTMyhjkrzpzRJc3ea92a+tXTkdOumWZjmnjSfS7O1FYQeo0xYL693epp70iTN79K8JouN05F5tklzYZp7029xFhtnkNBjFApPyCm+mCZpkuaaNPtbLv0OSXN9mt+kOdkKQo+RoRf/hE/g33AipmEjfASfxD440arNwwut7OP4Hi7FAky2ai/HSVbW8F1cik9hfav2FJxjZa/Cf+FSnI+trNosfNvKDsB/4ju4GE/1aBX2D9dkottzqlvSXJQB2+lIMzH93pbmtjRJ87f0O8kgGbBdmovS/JNRIowPR4Xf5bGuTXNXmkVp1tOR062fZlGae9IkzW/THGyQ9HtWmmsyzzZGibBOWBj+noNdkuYP6Xd8mok6MmD7NP+RJmmS5urMs6Xl0oxP86Y0S9JMNnJ8H5M9dB/AY/FubOuheSv2wmtwkIfmeXg5DsDRyuoTtgkXhoSEa7O9/S2XZv80P06TNElzUZptrSD9Dk+TNLdmvrWMcOGZ4dqQkHBhDvV4HVlkQpqj0vwuTdLcnWZRmvWsIM0H0yTNRUa4MD4cHf43JPw9EyxIM0NHmhlpFqb5e5qk+d/0OybNeINksXFprkqT9DvR2LEperEJxntoZmEq1sMaHpq1MAPTsb7y8IW1w/zwt5Dwx3B8mKQjx9kmzdfTJE3S/CT9DvB/SPNfaZLm3UaosGVYHBISfhbmWC4ne2aan6ZJmqS5IM3WViHNjDS/T5M0Bxuhwr7h6pCQ8B9hBx1hfJo3pvlDmqT5e5qz08ywCmn2TZM0f0mzkVJGqnBU+F1IuCd8MKynI6wT5me2K9MsS/PH9Ds+zUT3IwN2THNvmr+l2coIEqaE94a7Q8KfwlvCRB1hy3B+nuOSNEnzs/Sb4wFI86Y0SXNdzjbJCBIeG74UEhJ+Hp5tubBfuDpv9v00SfMfGbC9ByDN59MkzTlKGanCB0PCxaFPRxgfXhd+HxLuySsMpFnPg5Dmo2mS5ktGkDAuXBXuDeeGWTrC2uGscHdIxrs1J3pjFpngAUozPs2P0iT93mIECY8Jt4fbQwuTdYQtw5dDQrKxi9Mc6kFIMzvNnWmWpXmyUh5p4bXhonBl+NfQF9YPh1ku7BOuCgkJ/xl28BCkmZnmT2mS5pkeAWFqmB8uDZeFD4T1wi5hRx2hNxwRbgkJ94ZzwywPQZr90yTNn9Ns4BEQHhc+HpaEi8Pbw/hwaNhAR5gWWrgrJNweWpjkIUjzrjRJ873Qo5RHSjgyXBoeFyaEw8LNYYaOsEk4NyQk3BiO8DCl39vSJC/z1TDeMAvnhn8Ja4VpYSBcYrnwtPDDkJBwSXiihynNV3KqZTnY6YZZmBh+Fo4Mk8IG4SthQEfoDUeEW0LCsnBu2MDDkHdbI83NOdmd2dPzlfJICdeGJxkkfDi8RUe4MiT8JZwYJlsN0kzMZj4f7g1vMIzCrPC7MNlyoSf8NDwpzAp3hoQbwhyrSU60VaZaEu4NOxpG4fnhawYJG4U/h95waEhI+HbYyWqS53tRev06LA3TlDLcwrjwtzDZIOHosEhHeGY4J2xoNQuHhoQ/hPUMk/DU8N9WEBaHl+gIp4STwxSrWTgzJHw39Bgm4aTwHisIt4RNQk/4THhh6LEahZ5wWUiYp5RHQvhzWNsg4W3hLMMgXBgSPmCYhJ3DD60gnB+eY4iFNcJvQsILDJNwbDjbCsJtYYYhFnYLy8KdYTOlDLdwcXiuQcLXwuGGQdgm3B3uCTsYBmF6+G3YyHJhWrg5bGoYhKNCwo1hqmEQ9gxXhx7LhV3Czw2T8KmQsFgpwy3sEW4Mrwr7hfeHy8I4wyScHRL+wzAJbw5XhOeEg8JF4SzDJPSG74eEUw2T8MXw6fD0cHj4eXiuYRI2DreHhKcpZbiF7cIJYWF4VZhqGIV1wu9CwnMMk7BfOC28Ozw79BhG4SlhWbgjPNYwCBPCS8J7w6lhF8MsnBISfhjGKeXRJrw+/DIc6FEkLA7fCY/3KBGmhF+Ec8IaSnm0CePDlDA5HBDmhv3DBGNYmB56wnrheeFVYRdjXFhDR9gyvCy8JGyulEeLsHb4SfhYeEP4dLgyTAtTwj5hnzDLGBJ2CTeF08ObwnfDh3WEDcM+YZ8wyRgS5oafh+PDieGG8HIdYZuwT9hNKWNReFc4yyDh4+GEMDUcFA4KGxlDwnfDsy0XJoSfhj3CY8JB4aAw2RgRZoRbw0aWC7PDLWGNsEM4KOytlLEofCfsaZBwSPiqMSpMDHeGcQYJZ4bjjVFh33CJFYTvh92VMtaFa8KOBgl7hUuNUWHdcJsVhFPCfGNUOCycbwXhonCQUsa6cH6YY5BwZPikMSzcFmYaJHwyvNoYFXYM1xok9IRfhscrZawLh4YlYV0dYcNwbdjTGBbODB8L43WEXcPNYR1jVOgJl4dXWS68MVyilEeL8JZwdbgqXBXmGuPC1PDh8ONwVbg07GWMC7PDheHqcHU4P2yilEeb0OtRKPR6lAk9oUcZ9f4/Wad5svQj6QgAAAAldEVYdGRhdGU6Y3JlYXRlADIwMjMtMTItMjRUMTg6MjQ6MzkrMDA6MDCppkPVAAAAJXRFWHRkYXRlOm1vZGlmeQAyMDIzLTEyLTI0VDE4OjI0OjM5KzAwOjAw2Pv7aQAAAmZ6VFh0TU9MIHJka2l0IDIwMjMuMDkuMwAASImVlkFy2zAMRfc6BS9gDgGSkrjIwo4zaaeN3WndHKC77pv7ByAtULRZipazsBF84kNPIjgovn4ev/39p+TC4zAoZRp/IQT1bo0xw5viL+rw8vr1pJ4v+8MSeT7/Pl1+KQcKHWnoU+buL+e3JQLqxx9ltImXAtBTcIghh2i5L69PqN733592sMiQZYD32W2ZLatV9FWZi9Xso9V8Wa2ir8rGWM09Wm0qq1X0Vdkcq/lHq4WyWkVflQGFP6qYN3SgzgqWnJ3Rk7+RSSY9Ggo1hmDszJl3BSTT0ppW+zCbaVSVJaOTHUQr2YmLKuPS+rBU2pL52IBPsm7VSKpcQ/SVZgh/DuP9+pI4RyPX/0sjW0YCqeQWwX+o3arQsH2Rre51W8aw3ZLcgo0M2+s5TEBcWrCRYU8awggeu2Ejwx716NL6vdiQYXsNSdatKmGLvtJMAVv6ryQWsKWRLSMFbNdJzZawV/e6LWPY85Lcgm0ZdtAueAjQhG0ZNpi8yfTRti7J0KUKveCsjy1MSdatKnGLvtJOgVvuQCWxwJ072XJS8J47wbmS9/p2t3UQq93Bu1HdToCX07E4OKSjxOF8OuajBPKcAMyHBP5F+3we/yng8mBPAZ9HNvKmC1MexsB7K8x5zKZAyAM0BlAoBFqDtjAUHxC9UVCMsM0YESfsIkbECo0n5D0BxQvvJfzuo5ihqZIi4obNc8SuJwPyW2azH7ZMb5PNfsI1In7QXCPih1vih9aKH2TP9HBa8YP2GhE/6FLEmTXINTb+vZwe6fvwCe4hCayv73znAAAAHXRFWHRyZGtpdFBLTCByZGtpdCAyMDIzLjA5LjMA776t3gB/YpoAAAEXelRYdFNNSUxFUyByZGtpdCAyMDIzLjA5LjMAACiRvZE9jgIxDIWvsiUIjxXHziQh2ooDDD2CYu+wHYff/NhDJDqKbRz7veT5k7J9Xw+3bbkfR20Ft3/Qbpffk6/HtrR6/Tl9fnw9DwSLwxigePQ5OwEHhTHk5BIMg9FJMxbSG4UwdGUXdsuc4sC/bo/GckqPpfqqN7asiDbKEzDlSNR4IlJeKSjPiqs048UTkLryzmNO5bG8ncdyBo9tVypbWZI2SpVRcqDcqKgqWbxS1clL8BNVwijt6juVOZXK8nYqyxlUtl2pbGUh0t0toxdTCvnJsqEQzyqbKrMqpoZZ1eEIDzqzg4c/swdm4Pqj9fdW4AicgDOIe/4BU8OqdJnl7IkAAAAASUVORK5CYII=) 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모습 |
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LK-99는 회색-검정색의 다결정 화합물로 구리 도핑된 납-옥시인회석으로 식별됩니다. |
힐 시스템의 공식은 CuO25P6Pb9
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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 |