몰 질량 of Limonin (C26H30O8) is 470.5116 g/mol
C26H30O8 중량과 몰 사이의 변환
다음 물질의 원소 조성 C26H30O8
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 26 | 66.3699 | 수소 | H | 1.00794 | 30 | 6.4267 | 산소 | O | 15.9994 | 8 | 27.2034 |
몰질량을 단계별로 계산하기 |
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먼저 C26H30O8에 있는 각 원자의 수를 계산합니다.
C: 26, H: 30, O: 8
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C26H30O8) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(O) * Weight(O) =
26 * 12.0107 + 30 * 1.00794 + 8 * 15.9994 =
470.5116 g/mol
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화학 구조 |
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![C26H30O8 - 화학 구조](data:images/png;base64,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) 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모습 |
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리모닌은 감귤류 및 기타 식물에서 발견되는 쓴맛이 나는 흰색의 결정질 물질입니다. |
관련 화합물
힐 시스템의 공식은 C26H30O8
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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 |