몰 질량 of Codeine-6-glucuronide (C24H29NO9) is 475.4884 g/mol
C24H29NO9 중량과 몰 사이의 변환
다음 물질의 원소 조성 C24H29NO9
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 24 | 60.6233 | 수소 | H | 1.00794 | 29 | 6.1474 | 질소 | N | 14.0067 | 1 | 2.9458 | 산소 | O | 15.9994 | 9 | 30.2835 |
몰질량을 단계별로 계산하기 |
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먼저 C24H29NO9에 있는 각 원자의 수를 계산합니다.
C: 24, H: 29, N: 1, O: 9
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 (C24H29NO9) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
24 * 12.0107 + 29 * 1.00794 + 1 * 14.0067 + 9 * 15.9994 =
475.4884 g/mol
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화학 구조 |
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![C24H29NO9 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C24H29NO9
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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 |