몰 질량 of Ferrioxalate (FeC6O12{3-}) is 319.9036 g/mol
FeC6O12{3-} 중량과 몰 사이의 변환
다음 물질의 원소 조성 FeC6O12{3-}
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
---|
철 | Fe | 55.845 | 1 | 17.4568 | 탄소 | C | 12.0107 | 6 | 22.5268 | 산소 | O | 15.9994 | 12 | 60.0158 |
몰질량을 단계별로 계산하기 |
---|
먼저 FeC6O12{3-}에 있는 각 원자의 수를 계산합니다.
Fe: 1, C: 6, O: 12
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
Fe: 55.845, C: 12.0107, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (FeC6O12{3-}) = ∑ Counti * Weighti =
Count(Fe) * Weight(Fe) + Count(C) * Weight(C) + Count(O) * Weight(O) =
1 * 55.845 + 6 * 12.0107 + 12 * 15.9994 =
319.9036 g/mol
|
화학 구조 |
---|
![FeC6O12{3-} - 화학 구조](data:images/png;base64,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) |
모습 |
---|
Ferrioxalate는 소금에 연두색을 띠고 용액에서는 형광성을 띕니다. |
힐 시스템의 공식은 C6*FeO12
|
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 |