몰 질량 of C8H17N2O3PS (R-16661) is 252.2709 g/mol
C8H17N2O3PS 중량과 몰 사이의 변환
다음 물질의 원소 조성 C8H17N2O3PS
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 8 | 38.0883 | 수소 | H | 1.00794 | 17 | 6.7923 | 질소 | N | 14.0067 | 2 | 11.1045 | 산소 | O | 15.9994 | 3 | 19.0264 | 인 | P | 30.973762 | 1 | 12.2780 | 황 | S | 32.065 | 1 | 12.7105 |
몰질량을 단계별로 계산하기 |
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먼저 C8H17N2O3PS에 있는 각 원자의 수를 계산합니다.
C: 8, H: 17, N: 2, O: 3, P: 1, S: 1
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994, P: 30.973762, S: 32.065
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C8H17N2O3PS) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(P) * Weight(P) + Count(S) * Weight(S) =
8 * 12.0107 + 17 * 1.00794 + 2 * 14.0067 + 3 * 15.9994 + 1 * 30.973762 + 1 * 32.065 =
252.2709 g/mol
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화학 구조 |
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![C8H17N2O3PS - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C8H17N2O3PS
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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 |