몰 질량 of C13H19NO2S (2C-T-15) is 253.3605 g/mol
C13H19NO2S 중량과 몰 사이의 변환
다음 물질의 원소 조성 C13H19NO2S
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
---|
탄소 | C | 12.0107 | 13 | 61.6273 | 수소 | H | 1.00794 | 19 | 7.5587 | 질소 | N | 14.0067 | 1 | 5.5284 | 산소 | O | 15.9994 | 2 | 12.6298 | 황 | S | 32.065 | 1 | 12.6559 |
몰질량을 단계별로 계산하기 |
---|
먼저 C13H19NO2S에 있는 각 원자의 수를 계산합니다.
C: 13, H: 19, 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 (C13H19NO2S) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
13 * 12.0107 + 19 * 1.00794 + 1 * 14.0067 + 2 * 15.9994 + 1 * 32.065 =
253.3605 g/mol
|
화학 구조 |
---|
![C13H19NO2S - 화학 구조](data:images/png;base64,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) |
관련 화합물
힐 시스템의 공식은 C13H19NO2S
|
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 |