몰 질량 of 8-Methoxymethyl-3-isobutyl-1-methylxanthine (C12H18N4O3) is 266.2963 g/mol
C12H18N4O3 중량과 몰 사이의 변환
다음 물질의 원소 조성 C12H18N4O3
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 12 | 54.1233 | 수소 | H | 1.00794 | 18 | 6.8131 | 질소 | N | 14.0067 | 4 | 21.0393 | 산소 | O | 15.9994 | 3 | 18.0244 |
몰질량을 단계별로 계산하기 |
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먼저 C12H18N4O3에 있는 각 원자의 수를 계산합니다.
C: 12, H: 18, N: 4, O: 3
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 (C12H18N4O3) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
12 * 12.0107 + 18 * 1.00794 + 4 * 14.0067 + 3 * 15.9994 =
266.2963 g/mol
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화학 구조 |
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![C12H18N4O3 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C12H18N4O3
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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 |