몰 질량 of Alloxan (C4H4N2O5) is 160.0850 g/mol
C4H4N2O5 중량과 몰 사이의 변환
다음 물질의 원소 조성 C4H4N2O5
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 4 | 30.0108 | 수소 | H | 1.00794 | 4 | 2.5185 | 질소 | N | 14.0067 | 2 | 17.4991 | 산소 | O | 15.9994 | 5 | 49.9716 |
몰질량을 단계별로 계산하기 |
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먼저 C4H4N2O5에 있는 각 원자의 수를 계산합니다.
C: 4, H: 4, N: 2, O: 5
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 (C4H4N2O5) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
4 * 12.0107 + 4 * 1.00794 + 2 * 14.0067 + 5 * 15.9994 =
160.0850 g/mol
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화학 구조 |
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![C4H4N2O5 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C4H4N2O5
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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 |