몰 질량 of Camphorsultam (C10H17NO2S) is 215.3125 g/mol
C10H17NO2S 중량과 몰 사이의 변환
다음 물질의 원소 조성 C10H17NO2S
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 10 | 55.7826 | 수소 | H | 1.00794 | 17 | 7.9582 | 질소 | N | 14.0067 | 1 | 6.5053 | 산소 | O | 15.9994 | 2 | 14.8616 | 황 | S | 32.065 | 1 | 14.8923 |
몰질량을 단계별로 계산하기 |
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먼저 C10H17NO2S에 있는 각 원자의 수를 계산합니다.
C: 10, H: 17, N: 1, O: 2, S: 1
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994, S: 32.065
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C10H17NO2S) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
10 * 12.0107 + 17 * 1.00794 + 1 * 14.0067 + 2 * 15.9994 + 1 * 32.065 =
215.3125 g/mol
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화학 구조 |
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![C10H17NO2S - 화학 구조](data:images/png;base64,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) 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모습 |
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Camphorsultam은 결정질 고체입니다. |
관련 화합물
힐 시스템의 공식은 C10H17NO2S
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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 |