몰 질량 of Sibiricine (C20H17NO6) is 367.3521 g/mol
C20H17NO6 중량과 몰 사이의 변환
다음 물질의 원소 조성 C20H17NO6
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 20 | 65.3907 | 수소 | H | 1.00794 | 17 | 4.6645 | 질소 | N | 14.0067 | 1 | 3.8129 | 산소 | O | 15.9994 | 6 | 26.1320 |
몰질량을 단계별로 계산하기 |
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먼저 C20H17NO6에 있는 각 원자의 수를 계산합니다.
C: 20, H: 17, N: 1, O: 6
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 (C20H17NO6) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
20 * 12.0107 + 17 * 1.00794 + 1 * 14.0067 + 6 * 15.9994 =
367.3521 g/mol
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화학 구조 |
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![C20H17NO6 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C20H17NO6
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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 |