몰 질량 of Gastrodin (C13H18O7) is 286.2778 g/mol
C13H18O7 중량과 몰 사이의 변환
다음 물질의 원소 조성 C13H18O7
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
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탄소 | C | 12.0107 | 13 | 54.5411 | 수소 | H | 1.00794 | 18 | 6.3375 | 산소 | O | 15.9994 | 7 | 39.1214 |
몰질량을 단계별로 계산하기 |
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먼저 C13H18O7에 있는 각 원자의 수를 계산합니다.
C: 13, H: 18, O: 7
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 (C13H18O7) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(O) * Weight(O) =
13 * 12.0107 + 18 * 1.00794 + 7 * 15.9994 =
286.2778 g/mol
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화학 구조 |
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![C13H18O7 - 화학 구조](data:images/png;base64,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) 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관련 화합물
힐 시스템의 공식은 C13H18O7
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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 |