몰 질량 of C25H27N5O2S (GSK 299423) is 461.5792 g/mol
C25H27N5O2S 중량과 몰 사이의 변환
다음 물질의 원소 조성 C25H27N5O2S
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 25 | 65.0522 | 수소 | H | 1.00794 | 27 | 5.8959 | 질소 | N | 14.0067 | 5 | 15.1726 | 산소 | O | 15.9994 | 2 | 6.9325 | 황 | S | 32.065 | 1 | 6.9468 |
몰질량을 단계별로 계산하기 |
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먼저 C25H27N5O2S에 있는 각 원자의 수를 계산합니다.
C: 25, H: 27, N: 5, 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 (C25H27N5O2S) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
25 * 12.0107 + 27 * 1.00794 + 5 * 14.0067 + 2 * 15.9994 + 1 * 32.065 =
461.5792 g/mol
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화학 구조 |
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![C25H27N5O2S - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C25H27N5O2S
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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 |