몰 질량 of Ailanthone (C20H24O7) is 376.4004 g/mol
C20H24O7 중량과 몰 사이의 변환
다음 물질의 원소 조성 C20H24O7
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 20 | 63.8187 | 수소 | H | 1.00794 | 24 | 6.4268 | 산소 | O | 15.9994 | 7 | 29.7544 |
몰질량을 단계별로 계산하기 |
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먼저 C20H24O7에 있는 각 원자의 수를 계산합니다.
C: 20, H: 24, O: 7
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C20H24O7) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(O) * Weight(O) =
20 * 12.0107 + 24 * 1.00794 + 7 * 15.9994 =
376.4004 g/mol
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화학 구조 |
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![C20H24O7 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C20H24O7
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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 |