몰 질량 of C20H28N10O19P4 (Ap4A) is 836.3870 g/mol
C20H28N10O19P4 중량과 몰 사이의 변환
다음 물질의 원소 조성 C20H28N10O19P4
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
---|
탄소 | C | 12.0107 | 20 | 28.7204 | 수소 | H | 1.00794 | 28 | 3.3743 | 질소 | N | 14.0067 | 10 | 16.7467 | 산소 | O | 15.9994 | 19 | 36.3454 | 인 | P | 30.973762 | 4 | 14.8131 |
몰질량을 단계별로 계산하기 |
---|
먼저 C20H28N10O19P4에 있는 각 원자의 수를 계산합니다.
C: 20, H: 28, N: 10, O: 19, P: 4
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994, P: 30.973762
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C20H28N10O19P4) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(P) * Weight(P) =
20 * 12.0107 + 28 * 1.00794 + 10 * 14.0067 + 19 * 15.9994 + 4 * 30.973762 =
836.3870 g/mol
|
화학 구조 |
---|
![C20H28N10O19P4 - 화학 구조](data:images/png;base64,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) |
모습 |
---|
다이아데노신 테트라포스페이트(Ap4A)는 무색 고체로 나타납니다. |
관련 화합물
힐 시스템의 공식은 C20H28N10O19P4
|
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 |