몰 질량 of C8H12N2O3S (6-APA) is 216.2575 g/mol
C8H12N2O3S 중량과 몰 사이의 변환
다음 물질의 원소 조성 C8H12N2O3S
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
---|
탄소 | C | 12.0107 | 8 | 44.4311 | 수소 | H | 1.00794 | 12 | 5.5930 | 질소 | N | 14.0067 | 2 | 12.9537 | 산소 | O | 15.9994 | 3 | 22.1949 | 황 | S | 32.065 | 1 | 14.8272 |
몰질량을 단계별로 계산하기 |
---|
먼저 C8H12N2O3S에 있는 각 원자의 수를 계산합니다.
C: 8, H: 12, N: 2, 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 (C8H12N2O3S) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
8 * 12.0107 + 12 * 1.00794 + 2 * 14.0067 + 3 * 15.9994 + 1 * 32.065 =
216.2575 g/mol
|
화학 구조 |
---|
![C8H12N2O3S - 화학 구조](data:images/png;base64,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) |
관련 화합물
힐 시스템의 공식은 C8H12N2O3S
|
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 |