몰 질량 of Cycloclavine (C16H18N2) is 238.3275 g/mol
C16H18N2 중량과 몰 사이의 변환
다음 물질의 원소 조성 C16H18N2
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 16 | 80.6332 | 수소 | H | 1.00794 | 18 | 7.6126 | 질소 | N | 14.0067 | 2 | 11.7542 |
몰질량을 단계별로 계산하기 |
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먼저 C16H18N2에 있는 각 원자의 수를 계산합니다.
C: 16, H: 18, N: 2
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C16H18N2) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) =
16 * 12.0107 + 18 * 1.00794 + 2 * 14.0067 =
238.3275 g/mol
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화학 구조 |
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![C16H18N2 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C16H18N2
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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 |