몰 질량 of C4H8N8O8 (HMX) is 296.1551 g/mol
C4H8N8O8 중량과 몰 사이의 변환
다음 물질의 원소 조성 C4H8N8O8
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 4 | 16.2222 | 수소 | H | 1.00794 | 8 | 2.7227 | 질소 | N | 14.0067 | 8 | 37.8361 | 산소 | O | 15.9994 | 8 | 43.2190 |
몰질량을 단계별로 계산하기 |
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먼저 C4H8N8O8에 있는 각 원자의 수를 계산합니다.
C: 4, H: 8, N: 8, O: 8
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C4H8N8O8) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
4 * 12.0107 + 8 * 1.00794 + 8 * 14.0067 + 8 * 15.9994 =
296.1551 g/mol
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화학 구조 |
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![C4H8N8O8 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C4H8N8O8
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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 |