몰 질량 of C46H83N13O11 (ABT-510) is 994.2317 g/mol
C46H83N13O11 중량과 몰 사이의 변환
다음 물질의 원소 조성 C46H83N13O11
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 46 | 55.5698 | 수소 | H | 1.00794 | 83 | 8.4144 | 질소 | N | 14.0067 | 13 | 18.3144 | 산소 | O | 15.9994 | 11 | 17.7014 |
몰질량을 단계별로 계산하기 |
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먼저 C46H83N13O11에 있는 각 원자의 수를 계산합니다.
C: 46, H: 83, N: 13, O: 11
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 (C46H83N13O11) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
46 * 12.0107 + 83 * 1.00794 + 13 * 14.0067 + 11 * 15.9994 =
994.2317 g/mol
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화학 구조 |
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![C46H83N13O11 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C46H83N13O11
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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 |