몰 질량 of Polyvinylpyrrolidone ((C6H9NO)n) is n * 111.1418 g/mol
(C6H9NO)n 중량과 몰 사이의 변환
다음 물질의 원소 조성 (C6H9NO)n
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 6 | 64.8399 | 수소 | H | 1.00794 | 9 | 8.1621 | 질소 | N | 14.0067 | 1 | 12.6026 | 산소 | O | 15.9994 | 1 | 14.3955 |
몰질량을 단계별로 계산하기 |
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먼저 (C6H9NO)n에 있는 각 원자의 수를 계산합니다.
C: 6n, H: 9n, N: 1n, O: 1n
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 ((C6H9NO)n) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
6n * 12.0107 + 9n * 1.00794 + 1n * 14.0067 + 1n * 15.9994 =
n * 111.1418 g/mol
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화학 구조 |
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![(C6H9NO)n - 화학 구조](data:images/png;base64,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) 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힐 시스템의 공식은 C6nH9nNnOn
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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 |