몰 질량 of C20H21N5O3S (L-694247) is 411.4774 g/mol
C20H21N5O3S 중량과 몰 사이의 변환
다음 물질의 원소 조성 C20H21N5O3S
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 20 | 58.3784 | 수소 | H | 1.00794 | 21 | 5.1441 | 질소 | N | 14.0067 | 5 | 17.0200 | 산소 | O | 15.9994 | 3 | 11.6648 | 황 | S | 32.065 | 1 | 7.7927 |
몰질량을 단계별로 계산하기 |
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먼저 C20H21N5O3S에 있는 각 원자의 수를 계산합니다.
C: 20, H: 21, N: 5, O: 3, 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 (C20H21N5O3S) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
20 * 12.0107 + 21 * 1.00794 + 5 * 14.0067 + 3 * 15.9994 + 1 * 32.065 =
411.4774 g/mol
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화학 구조 |
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![C20H21N5O3S - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C20H21N5O3S
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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 |